tag:blogger.com,1999:blog-64092125937556039842024-03-13T12:01:29.775-07:00Géographie économiqueIntroduction à la géographie économique.
Par Jean-François TardieuJean-François Tardieuhttp://www.blogger.com/profile/01025349732771545315noreply@blogger.comBlogger33125tag:blogger.com,1999:blog-6409212593755603984.post-62243983519492873592021-08-14T17:13:00.007-07:002021-08-14T20:40:58.318-07:00 Sekous sismik nan depatman Nip 14 dawout 2021<h3 style="text-align: left;"><span style="font-size: small;"><span><img alt="" height="51" 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" width="640" /></span></span></h3><h3 style="text-align: left;"><span style="font-size: small;"><span></span> </span></h3><h3 style="text-align: center;"><span style="font-size: small;">Pou optimize resous limite nou genyen yo pou pote sekou</span></h3><p><span style="font-size: small;">Jou 14 dawout 2021 an, yon tranbleman tè ravaje penensil Sid peyi Ayiti. M ap prezante nou yon tablo ak yon kat ki rezime seri sekous ki frape nan jounen an. Done yo soti nan USGS.</span></p><p>
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<tbody><tr>
<td align="center" bgcolor="#000000" colspan="7" height="23" valign="middle"><b><span style="color: white; font-size: medium;">Sekous sismik nan depatman Nip ak Sid, jou 14 dawout 2021</span></b></td>
</tr>
<tr>
<td align="center" height="17" style="border-bottom: 4px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px 1px 4px;"><b>id</b></td>
<td align="center" style="border-bottom: 4px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px 1px 4px;"><b>Latitid</b></td>
<td align="center" style="border-bottom: 4px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px 1px 4px;"><b>Lonjitid</b></td>
<td align="center" style="border-bottom: 4px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px 1px 4px;"><b>Lè sekous</b></td>
<td align="center" style="border-bottom: 4px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px 1px 4px;"><b>Pwofondè km</b></td>
<td align="center" style="border-bottom: 4px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px 1px 4px;"><b>Mayitid</b></td>
<td align="center" style="border-bottom: 4px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px 1px 4px;"><b>Lokalizasyon episant</b></td>
</tr>
<tr>
<td align="right" height="20" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;"><b><span style="color: #c9211e; font-size: small;">1</span></b></td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;"><b><span style="color: #c9211e; font-size: small;">18.4079</span></b></td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;"><b><span style="color: #c9211e; font-size: small;">-73.4753</span></b></td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;"><b><span style="color: #c9211e; font-size: small;">08:29</span></b></td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;"><b><span style="color: #c9211e; font-size: small;">10.0</span></b></td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;"><b><span style="color: #c9211e; font-size: small;">7.2</span></b></td>
<td align="left" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;"><b><span style="color: #c9211e; font-size: small;">4 km Nò ant Chanjye ak Lazil</span></b></td>
</tr>
<tr>
<td align="right" height="17" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;"><span style="color: #c9211e;">2</span></td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;"><span style="color: #c9211e;">18.3887</span></td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;"><span style="color: #c9211e;">-73.8245</span></td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;"><span style="color: #c9211e;">08:49</span></td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;"><span style="color: #c9211e;">10.8</span></td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;"><span style="color: #c9211e;">5.2</span></td>
<td align="left" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;"><span style="color: #c9211e;">3 km Nò So Matirin</span></td>
</tr>
<tr>
<td align="right" height="17" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">3</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">18.4531</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">-73.4612</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">09:14</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">11.0</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">4.1</td>
<td align="left" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">1 km Nò Tomaren & 5 km Lwès Arno</td>
</tr>
<tr>
<td align="right" height="17" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">4</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">18.2706</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">-73.4310</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">09:14</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">10.0</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">4.4</td>
<td align="left" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">Ant Zanglè ak Aken<br /></td>
</tr>
<tr>
<td align="right" height="17" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">5</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">18.4506</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">-73.5952</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">10:02</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">10.0</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">4.2</td>
<td align="left" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">1 km Nò Plezans Sid</td>
</tr>
<tr>
<td align="right" height="17" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">6</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">18.4851</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">-73.5484</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">10:28</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">10.0</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">4.6</td>
<td align="left" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">6 km Sidwès Ti Twou Nip</td>
</tr>
<tr>
<td align="right" height="17" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">7</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">18.4906</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">-73.7093</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">10:40</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">10.0</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">4.2</td>
<td align="left" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">5 km Nòdwès Baradè</td>
</tr>
<tr>
<td align="right" height="17" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">8</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">18.4760</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">-73.6736</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">10:57</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">10.0</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">4.6</td>
<td align="left" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">1 km Nòdwès Baradè</td>
</tr>
<tr>
<td align="right" height="17" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">9</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">18.4932</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">-73.5949</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">11:08</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">10.0</td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">4.2</td>
<td align="left" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;">5 km Ès Nòdès Baradè</td>
</tr>
<tr>
<td align="right" height="18" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;"><span style="color: #c9211e;">10</span></td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;"><span style="color: #c9211e;">18.5398</span></td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;"><span style="color: #c9211e;">-73.7125</span></td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;"><span style="color: #c9211e;">12:08</span></td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;"><span style="color: #c9211e;">10.0</span></td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;"><span style="color: #c9211e;">5.1</span></td>
<td align="left" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;"><span style="color: #c9211e;">9 km Ès Pestèl (Gran Boukan)</span></td>
</tr>
<tr>
<td align="right" height="18" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;"><span style="color: #c9211e;">11</span></td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;"><span style="color: #c9211e;">18.4743</span></td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;"><span style="color: #c9211e;">-73.6174</span></td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;"><span style="color: #c9211e;">13:05</span></td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;"><span style="color: #c9211e;">7.2</span></td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;"><span style="color: #c9211e;">5.2</span></td>
<td align="left" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;"><span style="color: #c9211e;">4 km Ès Baradè & 4 km Nò Plezans Sid</span></td>
</tr>
<tr>
<td align="left" height="36" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;" valign="middle"><span style="color: #c9211e;">12</span></td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;" valign="middle"><span style="color: #c9211e;">18.5910</span></td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;" valign="middle"><span style="color: #c9211e;">-73.6128</span></td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;" valign="middle"><span style="color: #c9211e;">14:11</span></td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;" valign="middle"><span style="color: #c9211e;">10.0</span></td>
<td align="right" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;" valign="middle"><span style="color: #c9211e;">5.1</span></td>
<td align="left" style="border-bottom: 1px solid #000000; border-color: rgb(0, 0, 0); border-left: 1px solid #000000; border-right: 1px solid #000000; border-style: solid; border-top: 1px solid #000000; border-width: 1px;" valign="middle"><span style="color: #c9211e;">Nan lanmè mwens pase 1 km Nò prèskil Gran Boukan</span></td>
</tr>
</tbody></table>
<p><style type="text/css">body,div,table,thead,tbody,tfoot,tr,th,td,p { font-family:"Liberation Sans"; font-size:x-small }a.comment-indicator:hover + comment { background:#ffd; position:absolute; display:block; border:1px solid black; padding:0.5em; }a.comment-indicator { background:red; display:inline-block; border:1px solid black; width:0.5em; height:0.5em; }comment { display:none; }</style></p><p>J.F. Tardieu dapre done USGS</p><p><br /></p><div class="separator" style="clear: both; text-align: center;"><a href="https://1.bp.blogspot.com/-0lbZjSJ-I-g/YRhSLIqYiWI/AAAAAAAAB5g/r0SJ9aLsv0Mbzeg1lnWXYHqrYHtsKww9wCLcBGAsYHQ/s2048/Sekous2021.png" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="1448" data-original-width="2048" height="452" src="https://1.bp.blogspot.com/-0lbZjSJ-I-g/YRhSLIqYiWI/AAAAAAAAB5g/r0SJ9aLsv0Mbzeg1lnWXYHqrYHtsKww9wCLcBGAsYHQ/w640-h452/Sekous2021.png" width="640" /></a></div><p></p><p style="text-align: left;"><span style="font-size: small;">Menm lè nou pa ko gen rapò sou dega yo, done sa yo pèmèt nou evalye ki kote ki pi afekte epi k ap bezwen plis èd.</span></p><p style="text-align: justify;"><span style="font-size: small;">Nou wè sekous prensipal la, ki parèt nan 8è29, frape nan zòn Chanjye ak Lazil. Li lokalize pratikman sou fay Tibiwon an (menm jan ak goudougoudou 2010 la). Touswita </span><span style="font-size: small;">pre, yon bèl replik frape So Matirin. Nan 9è14, gen yon replik modere ant Zanglè ak Aken. Ant 9è14 la ak 14è11, nan yon entèval 5è dtan, gen 9 lòt replik ki souke nan menm zòn: Baradè, Plezans, Ti Twou.</span></p><p style="text-align: justify;"><span style="font-size: small;">Premye evalyasyon an ap konsidere lokalizasyon sekous yo epi konsantrasyon popilasyon yo.</span></p><p style="text-align: justify;"><span style="font-size: small;">Konsantrasyon sekous yo fè nou konprann gen anpil dega nan nò prèskil la nan nivo Ti Twou: komin Baradè, Gran Boukan, Plezans, Lazil, Ansavo, Ano, Fondènèg. Apre sa, Aken e sitou Kan Peren ak Manich ka gen bon kou dega tou.</span></p><p style="text-align: justify;"><span style="font-size: small;">Pou sa ki gen pou wè ak konsantrasyon popilasyon, 2 gwo moso ki genyen nan rejyon sa a, se Okay ak apeprè 200 mil abitan epi Fondènèg ak apeprè 100 mil abitan. Nou ka atann pou n jwenn yon volim dega ak sinistre nan Okay (tou pre replik Kan Peren an) epi Nan Fondènèg ki kole ak Lazil ki resevwa gwo sekous la.</span></p><p style="text-align: justify;"><span style="font-size: small;">Kidi, si bridsoukou n ap pote sekou, san nou pa ko gen yon evalyasyon fen, se pou n kouri nan zòn 1) Baradè/Lazil, 2) Okay/Kan Peren epi 3) Fondènèg.</span></p><p style="text-align: justify;"><span style="font-size: small;">Menm lè nou koumanse jwenn kèk enfòmasyon teren, analiz sa a ka pèmèt nou optimize aksyon nou, yon fason pou nou pa "<i>gaye pay</i>".<br /></span></p><p style="text-align: justify;"><span style="font-size: small;"> </span>
</p><p style="line-height: 100%; margin-bottom: 0in;">
<span style="font-family: TeXGyreChorus; font-size: large;"><span style="font-style: normal;">Jean-François
Tardieu</span></span></p>
<p style="text-align: justify;"><style type="text/css">p { margin-bottom: 0.1in; line-height: 115%; text-align: justify; background: transparent }</style></p><span style="font-size: small;">TNC / Inivèsite Quisqueya</span><p style="text-align: justify;"><span style="font-size: small;">14 dawout 2021</span><br /></p>Jean-François Tardieuhttp://www.blogger.com/profile/01025349732771545315noreply@blogger.com0tag:blogger.com,1999:blog-6409212593755603984.post-89974472124043311122020-10-07T09:10:00.000-07:002020-10-07T09:10:12.926-07:00Loi rang-taille et hiérarchie urbaine : "Nouvelles" données sur les villes haïtiennes.<h2 style="text-align: left;"> Émergence d'une nouveau réseau urbain en Haïti</h2><p>Les données d'identification de bâtis du CNIGS font ressortir une réalité qui jure avec la vision courante du réseau urbain haïtien.</p><p>Voici la population estimée des agglomérations haïtiennes de plus de 5000 habitants en 2010.</p><p>Quelles remarques suscitent ces données?</p><p><a href="https://docs.google.com/spreadsheets/d/1r8vdQDNpprc0tu9KdaCoHSEULYo2ySNkjJAtkpIS51E/edit?usp=sharing">Villes haïtiennes de plus de 5 000 habitants en 2010</a><br /></p>Jean-François Tardieuhttp://www.blogger.com/profile/01025349732771545315noreply@blogger.com1tag:blogger.com,1999:blog-6409212593755603984.post-63613257242507434572020-05-27T00:11:00.000-07:002020-05-27T00:11:12.834-07:00L'ONU demande l'aide de la République Dominicaine pour assurer la sécurité de son personnel en Haïti Kreyòl pi ba a / Español abajo / English below<br />
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<h2>
Un gouvernement qui se déclare incompétent!</h2>
<br />
<div style="text-align: justify;">
Je suis pris d’une colère bleue à lire l’article «<i>ONU pide ayuda de RD para su personal en Haití (l’ONU demande l’aide de la République Dominicaine pour son personnel en Haïti)</i>» sous la plume de Tomás Vidal Rodríguez dans El Nacional le 25 mai 2020.<br />Selon cet article, les Nations Unies ont demandé au gouvernement dominicain une aide pour «<i>garantir la sécurité de son personnel en Haïti</i>» et pour le traitement médical éventuel de ce personnel. La demande aurait été faite parce que «<i>les autorités d’Haïti se sont déclarées incompétentes pour faire face à une possible propagation du coronavirus à Ouanaminthe</i>».<br />Il y a de cela 60 jours, au tout début de l’arrivée de la pandémie en Haïti, le 25 mars 2020, je publiait sur ce blog <a href="https://geographieconomique.blogspot.com/2020/03/previzyon-distribisyon-covid-19-ayiti.html">un article sur la propagation du virus au pays</a>. Mon but était d’attirer l’attention des autorités haïtiennes sur les premiers sites de propagation du virus, pour que ces autorités puissent savoir où concentrer leurs forces pour répondre à la crise sanitaire. Mon modèle indiquait que dans les premiers moments, Ouanaminthe serait, après la région métropolitaine de Port-au-Prince, le principal foyer de propagation du virus. Il aurait fallu dès le mois de mars donner à ces deux agglomérations en priorité des moyens pour faire face à la crise. Deux mois plus tard, cela n’a été fait ni pour Port-au-Prince, ni pour Ouanaminthe, ni pour le territoire national dans son ensemble : «<i>Les autorités d’Haïti se sont déclarées incompétentes</i>» ! Elles publient des statistiques de test effectués essentiellement à Port-au-Prince (donc qui sont biaisées). L'ONU le sait et prend des mesures appropriées pour protéger son personnel; elle ne préoccupe pas de la souveraineté d'Haïti.<br />Si le gouvernement, avec son Ministère de la Santé, son Système National de Gestion du Risque et ses trois Commissions Présidentielles se déclare incompétent pour assurer la sécurité du personnel des Nations Unies, qu’est-ce qu’il peut offrir aux citoyens Haïtiens, particulièrement aux plus démunis? Santé 24/24?<br />Cette incompétence reconnue ne peut que scandaliser alors que des millions de dollars sont sensés être mis à contribution pour gérer la crise. Mais dans un pays classé au 169e rang sur 189 sur l’Indice de Développement Humain, à quoi peut-on s’attendre avec un classement de 168e sur 180 sur l’indice de perception de la corruption de Transparency International? Il n’y a pas de capitaine ni d’équipage à bord. Il n’y a que des pirates qui dévalisent les maigres ressources qui restent encore sur le navire qui prend de l’eau.<br /><br />Incompétents ! Notre peuple ne mérite pas cette humiliation.<br />Il faudra que quelque chose change en Haïti !<br /><br /><i>Jean-François Tardieu</i><br /><span style="font-family: "Trebuchet MS", sans-serif;">CIRUSP (Centro de Estudios para Ciudades y Pueblos Sostenibles Pedernales)<br />CERADD (Centre de Recherche et d’Appui au Développement Durable)</span><br /></div>
<h2>
Yon gouvènman ki deklare tèt li enkonpetan</h2>
<div style="text-align: justify;">
Mwen te sezi avèk yon manman kòlè pou li atik "<i>ONU pide ayuda de RD para su personal en Haití (Nasyonzini ap mande èd nan men Repiblik Dominikèn pou anplwaye li yo an Ayiti)</i>" Tomás Vidal Rodríguez ekri nan El Nacional, 25 Me 2020.<br />Selon atik sa a, Nasyonzini mande gouvènman Dominiken an pou li ede "<i>garanti sekirite pèsonèl li yo an Ayiti</i>" epi, sizoka, pou tretman medikal pou pèsonèl sa yo. Demann lan te fèt paske "<i>otorite ayisyen yo te deklare tèt yo enkonpetan pou fè fas ak yon posib gaye kowonaviris nan Ouanaminthe</i>”.<br />Swasant jou pase, apèn pandemi an te rive an Ayiti, nan dat 25 mas 2020, mwen te pibliye <a href="https://geographieconomique.blogspot.com/2020/03/previzyon-distribisyon-covid-19-ayiti.html">yon atik sou blog sa a sou pwopagasyon viris la nan peyi a</a>. Mwen te vle atire atansyon otorite ayisyen yo sou premye kote viris la ta pral gaye, yon fason pou otorite sa yo kapab konnen ki kote pou konsantre fòs yo pou reponn a kriz sante a. Modèl mwen an endike, nan premye moman yo, Ouanaminthe ta dwe, apre rejyon metwopolitèn Pòtoprens lan, sous prensipal pwopagasyon viris la. Li te nesesè nan mwa mas la pou bay 2 aglomerasyon sa yo priyorite nan mwayen pou fè fas ak kriz la. De mwa pita, sa pa fèt ni pou Port-au-Prince, ni Ouanaminthe, oswa pou teritwa nasyonal la an antye: "Otorite Ayiti yo te deklare tèt yo enkonpetan"! Yo pibliye estatistik tès yo fè, pifò ladan yo, nan Pòtoprens (ki vle di yo byeze). Nasyonzini konnen sa epi li pran mezi apwopriye pou pwoteje pèsonèl li yo; souverènte Ayiti pa gade l.<br />Si gouvènman an, ak Ministè Sante li, Sistèm Nasyonal Jesyon Risk li a ak twa Komisyon Prezidansyèl li deklare tèt li enkonpetan pou asire sekirite pèsonèl Nasyonzini, ki sa li ka bay sitwayen ayisyen yo? Patikilyèman pi pòv yo? Sante 24/24?<br />Lè gouvènman an limenm rekonèt enkonpetans li, se yon eskandal pandan konbyen milyon dola ap depanse swadizan pou jere kriz la. Men, nan yon peyi ki klase 169 sou 189 nan Endis Devlopman Imen an, kisa nou ka atann avèk yon klasman 168 sou 180 sou endis pèsepsyon koripsyon Transparancy Entènasyonal? Pa gen okenn kòmandan oswa ekipaj abò. Gen sèlman pirat k ap devalize ti kal resous ki rete sou bato a k ap pran dlo.<br /><br />Enkonpetan! Pèp nou an pa merite imilyasyon sa a.<br />Yon bagay pral oblije chanje an Ayiti!<br /><br /><i>Jean-François Tardieu</i><br /><span style="font-family: "Trebuchet MS", sans-serif;">CIRUSP (Centro de Estudios para Ciudades y Pueblos Sostenibles Pedernales)<br />CERADD (Centre de Recherche et d’Appui au Développement Durable)</span></div>
<h2>
Un gobierno que se declara incompetente</h2>
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Me invade una rabia azul al leer el artículo "<i>ONU pide ayuda de RD para su personal en Haití</i>" de Tomás Vidal Rodríguez en El Nacional el 25 de mayo de 2020.<br />Según este artículo, las Naciones Unidas pidieron ayuda al gobierno dominicano para "<i>garantizar la seguridad de su personal</i>” en Haití y para el posible tratamiento médico de este personal. La solicitud se hizo porque "<i>las autoridades de Haití se han declarado incompetentes para contrarrestar una posible propagación del coronavirus en Ouanaminte</i>".<br />Hace sesenta días, al comienzo de la llegada de la pandemia a Haití, el 25 de marzo de 2020, publiqué <a href="https://geographieconomique.blogspot.com/2020/03/previzyon-distribisyon-covid-19-ayiti.html">un artículo en este blog sobre la propagación del virus en el país</a>. Mi objetivo era llamar la atención de las autoridades haitianas sobre los primeros sitios de propagación del virus para que estas autoridades puedan saber dónde concentrar sus fuerzas para responder a la crisis de salud. Mi modelo indicó que en los primeros momentos, Ouanaminte sería, después de la región metropolitana de Puerto Príncipe, la principal fuente de propagación del virus. Hubiera sido necesario en marzo dar a estas dos aglomeraciones en forma prioritaria recursos necesarias para enfrentar la crisis. Dos meses después, esto no se hizo para Puerto Príncipe, Ouanaminthe, o para el territorio nacional en su conjunto: ¡“<i>Las autoridades de Haití se han declarado incompetentes</i>"! Publican estadísticas de prueba realizadas mayormente en Puerto Príncipe <span class="tlid-translation translation" lang="es"><span class="" title="">(por lo tanto, que están sesgados)</span></span>. La ONU lo sabe y está tomando las medidas apropiadas para proteger a su personal; a ella no le importa la soberanía de Haití.<br />Si el gobierno, con su Ministerio de Salud, su Sistema Nacional de Gestión de Riesgos y sus tres Comisiones Presidenciales se declara incompetente para garantizar la seguridad del personal de las Naciones Unidas, ¿qué puede ofrecer a los ciudadanos haitianos? particularmente a los más pobres? Salud 24/24?<br />Esta incompetencia reconocida, solo puede uno escandalizarse cuando se supone que se usarán millones de dólares para manejar la crisis. Pero en un país que ocupa el puesto 169 de 189 en el Índice de Desarrollo Humano, ¿qué podemos esperar con un ranking de 168 de 180 en el índice de percepción de corrupción de Transparencia Internacional? No hay capitán o tripulación a bordo. Solo hay piratas que roban los escasos recursos que quedan en el barco que toma agua.<br /><br />¡Incompetente! Nuestro pueblo no merece esta humillación.<br />¡Algo tendrá que cambiar en Haití!<br /><br /><i>Jean-François Tardieu</i><br /><span style="font-family: "Trebuchet MS", sans-serif;">CIRUSP (Centro de Estudios para Ciudades y Pueblos Sostenibles Pedernales)<br />CERADD (Centre de Recherche et d’Appui au Développement Durable)</span><br /></div>
<h2>
A government that declares itself incompetent</h2>
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I am seized with a blue anger to read the article "<i>ONU pide ayuda de RD para su personal en Haití (the UN is asking for help from the Dominican Republic for its staff in Haiti)</i>" from Tomás Vidal Rodríguez in El Nacional on May 25, 2020.<br />According to this article, the United Nations asked the Dominican government for help to "<i>guarantee the safety of its personnel in Haiti</i>" and for the possible medical treatment of these personnel. The request was made because "<i>the Haitian authorities have declared themselves incompetent to deal with a possible spread of the coronavirus in Ouanaminthe</i>”.<br />Sixty days ago, at the very beginning of the pandemic's arrival in Haiti, on March 25, 2020, I published <a href="https://geographieconomique.blogspot.com/2020/03/previzyon-distribisyon-covid-19-ayiti.html">an article on this blog on the spread of the virus in the country</a>. My aim was to draw the attention of the Haitian authorities to the first sites of the spread of the virus so that these authorities could know where to first concentrate their forces to respond to the health crisis. My model indicated that in the first moments, Ouanaminthe would be, after the metropolitan region of Port-au-Prince, the main source of the virus's spread. It would have been necessary in March to give these two agglomerations in priority means to face the crisis. Two months later, this was not done for Port-au-Prince, Ouanaminthe, or for the national territory as a whole: "<i>The Haitian authorities have declared themselves incompetent</i>"! They publish statistics of tests carried out mainly in Port-au-Prince <span class="tlid-translation translation" lang="en"><span class="" title="">(therefore which are biased)</span></span>. The UN knows this and is taking appropriate measures to protect its personnel; it does not care about the sovereignty of Haiti.<br />If the government, with its Ministry of Health, its National Risk Management System and its three Presidential Commissions declares itself incompetent to ensure the security of United Nations personnel, what can it offer to Haitian citizens, particularly to the poorest? Health 24/24?<br />This recognized incompetence can only scandalize when millions of dollars are supposed to be used to manage the crisis. But in a country ranked 169th out of 189 on the Human Development Index, what can we expect with a ranking of 168th out of 180 on the corruption perception index of Transparency International? There is no captain or crew on board. There are only pirates who rob the scarce resources that remain on the ship that takes water.<br /><br />Incompetent! Our people do not deserve this humiliation.<br />Something will have to change in Haiti!<br /><br /><i>Jean-François Tardieu</i><br /><span style="font-family: "Trebuchet MS", sans-serif;">CIRUSP (Centro de Estudios para Ciudades y Pueblos Sostenibles Pedernales)<br />CERADD (Centre de Recherche et d’Appui au Développement Durable)</span></div>
Jean-François Tardieuhttp://www.blogger.com/profile/01025349732771545315noreply@blogger.com3tag:blogger.com,1999:blog-6409212593755603984.post-8999987291043237262020-04-10T10:20:00.001-07:002020-04-11T05:08:28.816-07:00Analyse territoriale pour répondre au Covid-19<h2 style="text-align: center;">
Plaidoyer pour une cellule haïtienne d’analyse territoriale pour faire face à la pandémie du Covid-19</h2>
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L’État haïtien fait montre d’une légèreté effrayante vis-à-vis de cette terrible menace pour le pays.<br />
<br />
Trois points peuvent retenir l’attention :<br />
<ol>
<li><b>Le manque de rigueur</b> qui se manifeste par des décisions fantaisistes parfois cacophoniques. Un exemple est la décision de mettre Saint-Michel de l’Attalaye en quarantaine après la découverte d’une personne atteinte du corona-virus dans la zone. À l’annonce de la décision, certains responsables du MSPP croyaient qu’il s’agissait de la ville de St-Michel, d’autres pensaient que c’était plutôt la commune de St-Michel. Résultat : la décision n’a jamais été appliquée.</li>
<li><b>Le manque de transparence</b>. Une ses manifestations est le refus de divulgation précise de la localisation des cas détectés positifs. Avec une localisation par département géographique comme le fait le MSPP, il est quasi impossible de produire une analyse territoriale utile pour prévoir la diffusion de la pandémie, et ainsi se préparer valablement pour répondre au défi auquel nous faisons face.</li>
<li><b>La «<i>commissionnite</i>»</b> qui conduit à affaiblir les institutions. En effet, il existe un Système National de Gestion du Risque prévu pour répondre à ce genre de catastrophe. Cette structure prévoit entre autres :</li>
</ol>
<ul><ul>
<li>un Conseil National de Gestion du Risque,</li>
<li>des comités scientifiques et techniques ainsi que sectoriels pour la gestion du risque,</li>
<li>des comités techniques des opérations d’urgence et de réponse,</li>
<li>un Centre d’Opérations d'Urgence National avec des ramifications aux échelles départementale et locale.</li>
</ul>
</ul>
<ul>
<li>Au lieu de renforcer, d’orienter (éventuellement réviser) et <b>dynamiser</b> cette structure, l’Exécutif a préféré la doubler par 3 <b>commissions présidentielles</b> (commission scientifique, commission de communication, commission multisectorielle). </li>
</ul>
L’approche gouvernementale de désinstitutionnalisation fait courir au pays un risque énorme.<b> Elle portera la responsabilité des dégâts en vies humaines</b> qu’elle a le devoir d'éviter en capitalisant sur les institutions conçues pour répondre à ce genre de défi.<br />
<br />
Les chiffres officiels de 31 cas positifs et 2 morts sont certainement très en deçà de la réalité. Quand la République Dominicaine a recensé 2620 cas et 126 morts, nous avons, aujourd'hui 11 avril 2020, très certainement largement dépassé le cap de 100 malades. <br />
<br />
La présentation qui suit fait ressortir l’importance capitale de la mise sur pied d’une cellule d’analyse territoriale qui devrait intégrer la structure scientifique du Secrétariat Permanent de la Gestion du Risque.<br />
<br />
Des sous-titres français et anglais (bientôt espagnol) sont disponibles.<br />
<br />
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<br />Jean-François Tardieuhttp://www.blogger.com/profile/01025349732771545315noreply@blogger.com0tag:blogger.com,1999:blog-6409212593755603984.post-2316471995652820612020-03-25T08:37:00.001-07:002020-03-25T08:37:23.956-07:00Previzyon distribisyon COVID-19 an Ayiti<h3 style="text-align: center;">
Dirije se prevwa</h3>
Nou ka obsève jesyon kriz Korona viris la an Ayiti pa koresponn ak gravite sitiyasyon an. Manke yon jesyon syantifik kesyon an. Sistèm kolèk done yo debil. Pa gen yon evalyasyon resous k ap nesesè pou reponn ak enpak pandemi a nan peyi a demen, lòt semèn, mwa k ap vini an, nan 6 mwa...<br />
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Avèk minimòm done ki disponib yo, li posib pou modelize kesyon an. Se sa m eseye fè. Se kontribisyon pa m nan endike ki kote pandemi an riske chita. Se sa ki endike ki kote n ap bezwen resous.<br />
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Rezilta yo apwoksimatif. Pou yon rezilta pi fen, se yon ekip ki pou ta chita ap travay tout jounen. Men mwe kwè modèl mwen an bay yon lide; li ka atire atansyon responsab entèvansyon yo sou kote pou yo mete enèji yo.<br />
<br />
<br />
Kat mwen prezante a montre previzyon distribisyon jewografik 100 premye viktim maladi a. Nou ka di nan premye semèn avril la, n ap gen 100 viktim sa yo. <br />
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Rezilta yo montre se sou liy fwontyè a, Pòtoprens epi nan Latibonit gen ijans pou
konbine resous nesesè pou swen malad yo epi pou limite difizyon viris
la. Sa se nan yon premye tan. Nan yon dezyèm tan, nou ka atann pou gen yon gwo ogmantasyon ka yo nan Pòtoprens, Okap, Gonayiv epi sou fwontyè a. Apre sa, se tout peyi a k ap oblije fè fas. Nan ki mezi? Se yon kesyon ki se pezape li ka jwenn repons...<br />
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<br />Jean-François Tardieuhttp://www.blogger.com/profile/01025349732771545315noreply@blogger.com3tag:blogger.com,1999:blog-6409212593755603984.post-51471311437214900862019-03-29T05:02:00.001-07:002019-03-29T05:09:15.053-07:00<div style="text-align: justify;">
<a href="https://docs.google.com/viewer?a=v&pid=explorer&chrome=true&srcid=0B1Ll7ACjwbSaYmMwOTc0MTAtZTZhNS00ZmY1LWJmNTAtNjAzZDg1NzMxZjdm&hl=en">LA CHANCE QUI PASSE (cliquer pour voir le document)</a></div>
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<br /></div>
<div style="text-align: justify;">
<i>Je reproduis ici cet article publié en 2011 sur mon blog "L'espace haïtien". Toujours d'actualité!</i><br />
<i> </i> <br />
Ce
document est le résultat d'une numérisation de : « La chance qui
passe ». Le texte n'est pas signé mais il est de notoriété qu'il a été
produit par Georges Anglade pour l'« Opération Lavalas » à la veille des
élections générales haïtiennes de décembre 1990.</div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
Après
cinq ans d'une transition difficile depuis la chute de la dictature
duvaliériste, le peuple haïtien se préparait à se rendre aux urnes. Des
groupes politiques inscrits pour participer aux élections, le Front
National pour le Changement et la Démocratie (FNCD) avait la faveur de
la majorité. Il était appuyé par un mouvement qui se développait dès
1986 sous la dénomination LAVALAS. Jean Dominique eut plus tard à
qualifier ce mouvement de « nébuleuse », tant il n'avait pas de
direction. Le FNCD tout comme LAVALAS avaient en mémoire le massacre
perpétré par des paramilitaires néo-duvaliéristes lors des élections
ratées du 29 novembre 1987, ils faisaient face aussi à une opposition
violente de l'extrême droite et des duvaliéristes. Le mouvement adopta
une stratégie pour d'un côté s'attirer la faveur des masses et de
l'autre celle de l'intelligentsia.</div>
<div style="text-align: justify;">
Pour
s'attirer la faveur populaire, le FNCD éjecta Victor Benoit comme
candidat à la présidence en le remplaçant par le prêtre Jean-Bertrand
Aristide.</div>
<div style="text-align: justify;">
Pour
l'intelligentsia, le mouvement réputé sans programme fit appel à George
Anglade pour lui doter d'un manifeste. Ce fut fait avec brio. Il ne
s'agit pas d'un texte accessible au grand public mais tel n'était pas le
but. « La chance qui passe », manifeste politique, devait être la
fondation d'un programme politique opérationnel détaillé ayant pour
titre « La chance à prendre ». </div>
<div style="text-align: justify;">
La
sortie du texte, lors d'une conférence de presse en novembre 1990 à
l'hôtel Montana eut un impact considérable. Aucune autre formation
politique ne pouvait présenter une vision de la société aussi bien
campée, aussi pointue théoriquement et, à la fois, aussi proche des
revendications populaires : La jonction du politique et du scientifique.
Une grande partie des élites intellectuelles et de la classe moyenne
s'identifièrent au mouvement, le manifeste y a été pour quelque chose :
c'était le signal que la matière grise était la bienvenue puisqu'il n'y a
rien de plus pratique qu'une bonne théorie !</div>
<div style="text-align: justify;">
Malheureusement,
« La chance qui passe », dans son contenu, a été vite mis de côté par
la faction populiste du mouvement. Même « La chance à prendre »
(d'ailleurs jamais présentée comme telle) n'a été qu'un amalgame
incohérent de programmes sectoriels sans direction politique.</div>
<div style="text-align: justify;">
Malheureusement
aussi, « La chance qui passe », est, à peu de choses près, d'une
étonnante actualité. Par exemple, combien de nos planificateurs et de
nos spécialistes de l'espace géographique ont pris en compte dans leurs
travaux le concept de bourgs-jardins ?</div>
Jean-François Tardieuhttp://www.blogger.com/profile/01025349732771545315noreply@blogger.com3tag:blogger.com,1999:blog-6409212593755603984.post-82736328652898525742018-10-31T17:53:00.002-07:002019-02-08T14:27:29.027-08:00<h2>
Redécouper le territoite.</h2>
Le document suivant a été publié en 2014. Depuis, de nouvelles données rendent possible une réflexion plus fine. Mais l'essentiel demeure valide.<br />
<br />
Il ne faut pas chercher midi à quatorze heures. En matière de décenttalisation, la constitution de 1987 est plus solide que toutes les propositions d'amendements que j'ai pu consulter. Ce qu'il faut, c'est la préciser et la renforcer avec des lois d'application.<br />
<br />
<a href="https://drive.google.com/file/d/117oLcQk84QvWFXmNn7JJABPuyJ2Bhx9z/view?usp=drivesdk" target="_blank">Redécouper le territoire</a>Jean-François Tardieuhttp://www.blogger.com/profile/01025349732771545315noreply@blogger.com2tag:blogger.com,1999:blog-6409212593755603984.post-10011722509551966032018-03-24T09:04:00.001-07:002018-03-24T09:04:11.323-07:00Classer les villes selon leur population à l'aide de la distribution rang-taille<br />
<br />
<div align="justify" class="western" style="line-height: 100%; margin-bottom: 0in;">
<a href="https://geographieconomique.blogspot.com/2013/06/09-loi-rang-taille-de-villes-haitiennes.html">Dans
un précédent message</a>, les agglomérations urbaines haïtiennes
ont été classées en 5 niveaux selon les données du recensement de
2003 effectuée par l'Institut Haïtien de Statistique et
d'Informatique (IHSI).
</div>
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<br />
</div>
<div align="justify" class="western" style="line-height: 100%; margin-bottom: 0in;">
Ici, une méthodologie plus rigoureuse, <b>en trois étapes</b> est
établie pour déterminer les seuils et les classes (niveaux) de
villes. Les calculs sont effectués à partir du document:
«<i>Population totale, population de 18 ans et plus, ménages et
densités estimés en 2015</i>» de l'IHSI.</div>
<div align="justify" class="western" style="line-height: 100%; margin-bottom: 0in;">
<br />
</div>
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<a href="https://docs.google.com/spreadsheets/d/1G_9RzPDVFHEnNp-6clZ21Pk-yBEpsfFReai6ADS3ZwA/edit?usp=sharing">Le
tableur utilisé pour les calculs peut être consulté.</a></div>
<div align="justify" class="western" style="line-height: 100%; margin-bottom: 0in;">
<br />
</div>
<h2 class="western">
Étape 1 : Calcul des déficits de
population d’une agglomération en fonction de celle qui la précède</h2>
<div align="justify" class="western" style="line-height: 100%; margin-bottom: 0in;">
</div>
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Soit P<sub>r</sub> la population de la ville de rang r. Si la loi
rang-taille était parfaitement respectée, on aurait :</div>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
<img alt="" height="65" src="data:image/png;base64,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" width="400" />
</div>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
</div>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
D’où :</div>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
<br /></div>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
<img alt="" height="56" src="data:image/png;base64,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" width="400" /></div>
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<br /></div>
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</div>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
L’équation
de la régression sur la courbe rang-taille indique une valeur de b :
</div>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
b = 1.16</div>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
<style type="text/css">p { margin-bottom: 0.1in; line-height: 115%; text-align: justify; }p.cjk { font-size: 10pt; }a:link { }</style></div>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
<br /></div>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
</div>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
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" width="640" /></div>
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</div>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
Il
est alors possible d’établir une population théorique pour chaque
ville en fonction de celle qui la précède en rang.</div>
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<br /></div>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
<img alt="" height="55" src="data:image/png;base64,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" width="200" /></div>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
<br /></div>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
</div>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
Ensuite,
il est possible de comparer cette valeur théorique avec la
population observée. Cette comparaison aboutit à un calcul de
pourcentage de déficit de la population observée par rapport à la
population théorique.</div>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
<br />
</div>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
Pour
une ville de rang <i>r</i>, le déficit est ainsi calculé :</div>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
<br />
</div>
<img alt="" height="53" src="data:image/png;base64,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" width="320" /><br />
<br />
<h2 class="western">
Étape 2 : Classement des déficits</h2>
<div class="western">
Les agglomérations sont alors classées en
fonction de leurs déficits, en ordre inverse (du plus grand au plus
petit). Ces déficits indiquent des seuils de rupture possibles pour
classer les agglomérations en 1, 2, 3… niveaux. Ainsi, l’adoption
d’un seuil de 14 % de déficit permet de répartir les
agglomérations en 5 classes (niveaux), tandis que l’adoption d’un
seuil de 9 % aboutit à 6 classes.</div>
<div class="western">
<br />
<br />
</div>
<table cellpadding="2" cellspacing="0" style="width: 371px;">
<colgroup><col width="114"></col>
<col width="51"></col>
<col width="62"></col>
<col width="64"></col>
<col width="61"></col>
</colgroup><tbody>
<tr>
<td bgcolor="#ff99ff" colspan="5" height="17" style="background: #ff99ff;" width="367">
<div align="center" class="western">
<span style="font-family: Liberation Serif;">Étape
2: Classement des déficits</span></div>
</td>
</tr>
<tr>
<td bgcolor="#ff99ff" height="35" style="background: #ff99ff;" width="114">
<div align="center" class="western">
<span style="font-family: Liberation Serif;">Agglomération</span></div>
</td>
<td bgcolor="#ff99ff" style="background: #ff99ff;" width="51">
<div align="center" class="western">
<span style="font-family: Liberation Serif;">Rang</span></div>
</td>
<td bgcolor="#ff99ff" style="background: #ff99ff;" width="62">
<div align="center" class="western">
<span style="font-family: Liberation Serif;">Déficit
(seuil)</span></div>
</td>
<td bgcolor="#ff99ff" style="background: #ff99ff;" width="64">
<div align="center" class="western">
<span style="font-family: Liberation Serif;">Nb.
ruptures</span></div>
</td>
<td bgcolor="#ff99ff" style="background: #ff99ff;" width="61">
<div align="center" class="western">
<span style="font-family: Liberation Serif;">Nb.
Niveaux</span></div>
</td>
</tr>
<tr>
<td height="17" style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="114">
<div align="left" class="western">
Gonaïves</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="51">
<div align="right" class="western">
2</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="62">
<div align="right" class="western">
<span style="font-family: Liberation Serif;">327.5%</span></div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="64">
<div align="center" class="western">
1</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: 1px solid #000000; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0.02in; padding-top: 0in;" width="61">
<div align="center" class="western">
2</div>
</td>
</tr>
</tbody>
<tbody>
<tr>
<td height="17" style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="114">
<div align="left" class="western">
Port de Paix</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="51">
<div align="right" class="western">
4</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="62">
<div align="right" class="western">
<span style="font-family: Liberation Serif;">22.0%</span></div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="64">
<div align="center" class="western">
2</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: 1px solid #000000; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0.02in; padding-top: 0in;" width="61">
<div align="center" class="western">
3</div>
</td>
</tr>
</tbody>
<tbody>
<tr>
<td height="19" style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="114">
<div align="left" class="western">
Cayes</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="51">
<div align="right" class="western">
8</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="62">
<div align="right" class="western">
<span style="font-family: Liberation Serif;">17.6%</span></div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="64">
<div align="center" class="western">
3</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: 1px solid #000000; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0.02in; padding-top: 0in;" width="61">
<div align="center" class="western">
4</div>
</td>
</tr>
</tbody>
<tbody>
<tr>
<td height="19" style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="114">
<div align="left" class="western">
Trou du Nord</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="51">
<div align="right" class="western">
23</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="62">
<div align="right" class="western">
<span style="font-family: Liberation Serif;">14.2%</span></div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="64">
<div align="center" class="western">
4</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: 1px solid #000000; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0.02in; padding-top: 0in;" width="61">
<div align="center" class="western">
<span style="color: #ce181e;"><b>5</b></span></div>
</td>
</tr>
</tbody>
<tbody>
<tr>
<td height="19" style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="114">
<div align="left" class="western">
Ouanaminthe</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="51">
<div align="right" class="western">
9</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="62">
<div align="right" class="western">
<span style="font-family: Liberation Serif;">9.8%</span></div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="64">
<div align="center" class="western">
5</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: 1px solid #000000; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0.02in; padding-top: 0in;" width="61">
<div align="center" class="western">
<span style="color: #ce181e;"><b>6</b></span></div>
</td>
</tr>
</tbody>
<tbody>
<tr>
<td height="19" style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="114">
<div align="left" class="western">
Hinche</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="51">
<div align="right" class="western">
18</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="62">
<div align="right" class="western">
<span style="font-family: Liberation Serif;">6.1%</span></div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="64">
<div align="center" class="western">
6</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: 1px solid #000000; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0.02in; padding-top: 0in;" width="61">
<div align="center" class="western">
7</div>
</td>
</tr>
</tbody>
<tbody>
<tr>
<td height="19" style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="114">
<div align="left" class="western">
Dondon</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="51">
<div align="right" class="western">
48</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="62">
<div align="right" class="western">
<span style="font-family: Liberation Serif;">6.1%</span></div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="64">
<div align="center" class="western">
7</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: 1px solid #000000; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0.02in; padding-top: 0in;" width="61">
<div align="center" class="western">
8</div>
</td>
</tr>
</tbody>
<tbody>
<tr>
<td height="18" style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="114">
<div align="left" class="western">
Desdunes</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="51">
<div align="right" class="western">
21</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="62">
<div align="right" class="western">
<span style="font-family: Liberation Serif;">5.3%</span></div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="64">
<div align="center" class="western">
…</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: 1px solid #000000; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0.02in; padding-top: 0in;" width="61">
<div align="center" class="western">
…</div>
</td>
</tr>
</tbody>
</table>
<div class="western">
<br />
<br />
</div>
<h2 class="western">
Étape 3 : Classement par niveau selon le
seuil</h2>
<div class="western">
Deux seuil ont été retenus pour analyser les
agglomérations : 14 % et 9 %.
</div>
<div class="western">
Le seuil de 14 % répartit les agglomérations
en 5 classes comptant respectivement 1, 2, 4, 15 et 55
agglomérations.</div>
<table cellpadding="2" cellspacing="0" style="width: 282px;">
<colgroup><col width="74"></col>
<col width="200"></col>
</colgroup><tbody>
<tr>
<td bgcolor="#ff99ff" style="background: #ff99ff;" width="74">
<div class="western" style="text-align: center;">
<span style="font-family: Liberation Serif;">Niveau</span></div>
</td>
<td bgcolor="#ff99ff" style="background: #ff99ff;" width="200">
<div class="western" style="text-align: center;">
<span style="font-family: Liberation Serif;">Nombre
d’agglomérations</span></div>
</td>
</tr>
<tr>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="74">
<div class="western" style="text-align: center;">
1</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="200">
<div class="western" style="text-align: center;">
1</div>
</td>
</tr>
</tbody>
<tbody>
<tr>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="74">
<div class="western" style="text-align: center;">
2</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="200">
<div class="western" style="text-align: center;">
2</div>
</td>
</tr>
</tbody>
<tbody>
<tr>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="74">
<div class="western" style="text-align: center;">
3</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="200">
<div class="western" style="text-align: center;">
4</div>
</td>
</tr>
</tbody>
<tbody>
<tr>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="74">
<div class="western" style="text-align: center;">
4</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="200">
<div class="western" style="text-align: center;">
15</div>
</td>
</tr>
</tbody>
<tbody>
<tr>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="74">
<div class="western" style="text-align: center;">
5</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="200">
<div class="western" style="text-align: center;">
55</div>
</td>
</tr>
</tbody>
<tbody>
<tr>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="74">
<div align="center" class="western">
<b>Total</b></div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="200">
<div class="western" style="text-align: center;">
<b>77</b></div>
</td>
</tr>
</tbody>
</table>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
<br />
</div>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
Le
seuil de 9 % répartit les agglomérations en 6 classes comptant
respectivement 1, 2, 4, 1, 14 et 55 agglomérations.</div>
<table cellpadding="2" cellspacing="0" style="page-break-inside: avoid; width: 282px;">
<colgroup><col width="74"></col>
<col width="200"></col>
</colgroup><tbody>
<tr>
<td bgcolor="#ff99ff" style="background: #ff99ff;" width="74">
<div align="center" class="western">
<span style="font-family: Liberation Serif;">Niveau</span></div>
</td>
<td bgcolor="#ff99ff" style="background: #ff99ff;" width="200">
<div align="center" class="western">
<span style="font-family: Liberation Serif;">Nombre
d’agglomérations</span></div>
</td>
</tr>
<tr>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="74">
<div align="center" class="western">
1</div>
</td>
<td style="border-color: currentcolor currentcolor rgb(0, 0, 0) rgb(0, 0, 0); border-style: none none solid solid; border-width: medium medium 1px 1px; padding: 0in 0in 0.02in 0.02in; text-align: center;" width="200">
<div class="western" style="text-align: center;">
1</div>
</td>
</tr>
</tbody>
<tbody>
<tr>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="74">
<div align="center" class="western">
2</div>
</td>
<td style="border-color: currentcolor currentcolor rgb(0, 0, 0) rgb(0, 0, 0); border-style: none none solid solid; border-width: medium medium 1px 1px; padding: 0in 0in 0.02in 0.02in; text-align: center;" width="200">
<div class="western" style="text-align: center;">
2</div>
</td>
</tr>
</tbody>
<tbody>
<tr>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="74">
<div align="center" class="western">
3</div>
</td>
<td style="border-color: currentcolor currentcolor rgb(0, 0, 0) rgb(0, 0, 0); border-style: none none solid solid; border-width: medium medium 1px 1px; padding: 0in 0in 0.02in 0.02in; text-align: center;" width="200">
<div class="western" style="text-align: center;">
4</div>
</td>
</tr>
</tbody>
<tbody>
<tr>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="74">
<div align="center" class="western">
4</div>
</td>
<td style="border-color: currentcolor currentcolor rgb(0, 0, 0) rgb(0, 0, 0); border-style: none none solid solid; border-width: medium medium 1px 1px; padding: 0in 0in 0.02in 0.02in; text-align: center;" width="200">
<div class="western" style="text-align: center;">
1</div>
</td>
</tr>
</tbody>
<tbody>
<tr>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="74">
<div align="center" class="western">
5</div>
</td>
<td style="border-color: currentcolor currentcolor rgb(0, 0, 0) rgb(0, 0, 0); border-style: none none solid solid; border-width: medium medium 1px 1px; padding: 0in 0in 0.02in 0.02in; text-align: center;" width="200">
<div class="western" style="text-align: center;">
14</div>
</td>
</tr>
</tbody>
<tbody>
<tr>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="74">
<div align="center" class="western">
6</div>
</td>
<td style="border-color: currentcolor currentcolor rgb(0, 0, 0) rgb(0, 0, 0); border-style: none none solid solid; border-width: medium medium 1px 1px; padding: 0in 0in 0.02in 0.02in; text-align: center;" width="200">
<div class="western" style="text-align: center;">
55</div>
</td>
</tr>
</tbody>
<tbody>
<tr>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="74">
<div align="center" class="western">
<b>Total</b></div>
</td>
<td style="border-color: currentcolor currentcolor rgb(0, 0, 0) rgb(0, 0, 0); border-style: none none solid solid; border-width: medium medium 1px 1px; padding: 0in 0in 0.02in 0.02in; text-align: center;" width="200">
<div class="western" style="text-align: center;">
<b>77</b></div>
</td>
</tr>
</tbody>
</table>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
<br />
</div>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
Cette
dernière répartition semble à première vue aberrante puisqu’une
seule ville se situe au niveau 4. Cependant, il ne faut pas aller aux
conclusions trop hâtivement. L’examen de la distribution des
agglomérations donne un autre éclairage. En effet, c’est
l’agglomération des Cayes qui se trouve seule au niveau 4.
</div>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
<br />
</div>
<table cellpadding="2" cellspacing="0" style="width: 516px;">
<colgroup><col width="135"></col>
<col width="46"></col>
<col width="87"></col>
<col width="69"></col>
<col width="72"></col>
<col width="83"></col>
</colgroup><tbody>
<tr>
<td bgcolor="#00ff00" colspan="6" style="background: #00ff00;" width="512">
<div align="center" class="western">
<b>Étape 3: Classement par
niveau selon le seuil</b></div>
</td>
</tr>
<tr>
<td bgcolor="#00ff00" style="background: #00ff00;" width="135">
<div align="center" class="western">
Agglomération</div>
</td>
<td bgcolor="#00ff00" style="background: #00ff00;" width="46">
<div align="center" class="western">
Rang</div>
</td>
<td bgcolor="#00ff00" style="background: #00ff00;" width="87">
<div align="center" class="western">
Population</div>
</td>
<td bgcolor="#00ff00" style="background: #00ff00;" width="69">
<div align="center" class="western">
Déficit</div>
</td>
<td bgcolor="#00ff00" style="background: #00ff00;" width="72">
<div align="center" class="western">
Seuil 14% (5 niveaux)</div>
</td>
<td bgcolor="#00ff00" style="background: #00ff00;" width="83">
<div align="center" class="western" style="font-weight: normal;">
<span style="font-family: Arial;">Seuil
9% (6 niveaux)</span></div>
</td>
</tr>
</tbody>
<tbody>
<tr>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="135">
<div class="western">
Port-au-Prince</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="46">
<div align="right" class="western">
1</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="87">
<div align="right" class="western">
2 663 925</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="69">
<div align="right" class="western">
0,0%</div>
</td>
<td bgcolor="#57bb8a" style="background: #57bb8a;" width="72">
<div align="center" class="western">
1</div>
</td>
<td bgcolor="#57bb8a" style="background: #57bb8a;" width="83">
<div align="center" class="western" style="font-weight: normal;">
<span style="font-family: Arial;">1</span></div>
</td>
</tr>
</tbody>
<tbody>
<tr>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="135">
<div class="western">
Gonaïves</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="46">
<div align="right" class="western">
2</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="87">
<div align="right" class="western">
278 584</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="69">
<div align="right" class="western">
327,5%</div>
</td>
<td bgcolor="#81cca7" style="background: #81cca7;" width="72">
<div align="center" class="western">
2</div>
</td>
<td bgcolor="#78c8a1" style="background: #78c8a1;" width="83">
<div align="center" class="western" style="font-weight: normal;">
<span style="color: black;"><span style="font-family: Arial;"><span style="font-size: x-small;">2</span></span></span></div>
</td>
</tr>
</tbody>
<tbody>
<tr>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="135">
<div class="western">
Cap-Haïtien</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="46">
<div align="right" class="western">
3</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="87">
<div align="right" class="western">
269 036</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="69">
<div align="right" class="western">
-35,3%</div>
</td>
<td bgcolor="#81cca7" style="background: #81cca7;" width="72">
<div align="center" class="western">
2</div>
</td>
<td bgcolor="#78c8a1" style="background: #78c8a1;" width="83">
<div align="center" class="western" style="font-weight: normal;">
<span style="color: black;"><span style="font-family: Arial;"><span style="font-size: x-small;">2</span></span></span></div>
</td>
</tr>
</tbody>
<tbody>
<tr>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="135">
<div class="western">
Port de Paix</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="46">
<div align="right" class="western">
4</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="87">
<div align="right" class="western">
157 822</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="69">
<div align="right" class="western">
22,0%</div>
</td>
<td bgcolor="#abddc4" style="background: #abddc4;" width="72">
<div align="center" class="western">
3</div>
</td>
<td bgcolor="#9ad6b8" style="background: #9ad6b8;" width="83">
<div align="center" class="western" style="font-weight: normal;">
<span style="color: black;"><span style="font-family: Arial;"><span style="font-size: x-small;">3</span></span></span></div>
</td>
</tr>
</tbody>
<tbody>
<tr>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="135">
<div class="western">
Saint Marc</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="46">
<div align="right" class="western">
5</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="87">
<div align="right" class="western">
149 653</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="69">
<div align="right" class="western">
-18,6%</div>
</td>
<td bgcolor="#abddc4" style="background: #abddc4;" width="72">
<div align="center" class="western">
3</div>
</td>
<td bgcolor="#9ad6b8" style="background: #9ad6b8;" width="83">
<div align="center" class="western" style="font-weight: normal;">
<span style="color: black;"><span style="font-family: Arial;"><span style="font-size: x-small;">3</span></span></span></div>
</td>
</tr>
</tbody>
<tbody>
<tr>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="135">
<div class="western">
Petit-Goave</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="46">
<div align="right" class="western">
6</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="87">
<div align="right" class="western">
123 805</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="69">
<div align="right" class="western">
-2,2%</div>
</td>
<td bgcolor="#abddc4" style="background: #abddc4;" width="72">
<div align="center" class="western">
3</div>
</td>
<td bgcolor="#9ad6b8" style="background: #9ad6b8;" width="83">
<div align="center" class="western" style="font-weight: normal;">
<span style="color: black;"><span style="font-family: Arial;"><span style="font-size: x-small;">3</span></span></span></div>
</td>
</tr>
</tbody>
<tbody>
<tr>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="135">
<div class="western">
Léogane</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="46">
<div align="right" class="western">
7</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="87">
<div align="right" class="western">
122 650</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="69">
<div align="right" class="western">
-15,6%</div>
</td>
<td bgcolor="#abddc4" style="background: #abddc4;" width="72">
<div align="center" class="western">
3</div>
</td>
<td bgcolor="#9ad6b8" style="background: #9ad6b8;" width="83">
<div align="center" class="western" style="font-weight: normal;">
<span style="color: black;"><span style="font-family: Arial;"><span style="font-size: x-small;">3</span></span></span></div>
</td>
</tr>
</tbody>
<tbody>
<tr>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="135">
<div class="western">
<span style="color: #ce181e;"><b>Cayes</b></span></div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="46">
<div align="right" class="western">
<span style="color: #ce181e;"><b>8</b></span></div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="87">
<div align="right" class="western">
<span style="color: #ce181e;"><b>89 284</b></span></div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="69">
<div align="right" class="western">
<span style="color: #ce181e;"><b>17,6%</b></span></div>
</td>
<td bgcolor="#d5eee1" style="background: #d5eee1;" width="72">
<div align="center" class="western">
4</div>
</td>
<td bgcolor="#bbe3d0" style="background: #bbe3d0;" width="83">
<div align="center" class="western">
<span style="color: red;"><span style="font-family: Arial;"><span style="font-size: x-small;"><b>4</b></span></span></span></div>
</td>
</tr>
</tbody>
<tbody>
<tr>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="135">
<div class="western">
Ouanaminthe</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="46">
<div align="right" class="western">
9</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="87">
<div align="right" class="western">
70 905</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="69">
<div align="right" class="western">
<span style="color: red;"><b>9,8%</b></span></div>
</td>
<td bgcolor="#d5eee1" style="background: #d5eee1;" width="72">
<div align="center" class="western">
4</div>
</td>
<td bgcolor="#ddf1e7" style="background: #ddf1e7;" width="83">
<div align="center" class="western" style="font-weight: normal;">
<span style="color: black;"><span style="font-family: Arial;"><span style="font-size: x-small;">5</span></span></span></div>
</td>
</tr>
</tbody>
<tbody>
<tr>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="135">
<div class="western">
Cabaret</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="46">
<div align="right" class="western">
10</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="87">
<div align="right" class="western">
59 956</div>
</td>
<td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.02in; padding-left: 0.02in; padding-right: 0in; padding-top: 0in;" width="69">
<div align="right" class="western">
4,6%</div>
</td>
<td bgcolor="#d5eee1" style="background: #d5eee1;" width="72">
<div align="center" class="western">
4</div>
</td>
<td bgcolor="#ddf1e7" style="background: #ddf1e7;" width="83">
<div align="center" class="western" style="font-weight: normal;">
<span style="color: black;"><span style="font-family: Arial;"><span style="font-size: x-small;">5</span></span></span></div>
</td>
</tr>
</tbody>
</table>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
<br />
</div>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
Il
est légitime de se demander si cette position particulière des
Cayes ne vient pas d’un biais conceptuel de l’IHSI qui confond
agglomération urbaine et statut administratif. L’agglomération
des Cayes s’étend en effet sur la commune de Torbeck, ce qui n’est
pas considéré par l’IHSI.</div>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
<br />
</div>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
<img alt="" height="438" 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Cette
position des Cayes mérite donc d’être réexaminée à la lumière
de nouvelles données.</div>
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<style type="text/css">h2 { text-align: justify; }h2.western { font-family: "Arial", sans-serif; font-size: 14pt; }h2.cjk { font-family: "Noto Sans CJK SC Regular"; font-size: 16pt; }h2.ctl { font-family: "FreeSans"; font-size: 16pt; }p { margin-bottom: 0.1in; line-height: 115%; text-align: justify; }p.cjk { font-size: 10pt; }a:link { }</style>Jean-François Tardieuhttp://www.blogger.com/profile/01025349732771545315noreply@blogger.com2tag:blogger.com,1999:blog-6409212593755603984.post-53010736674583681922017-04-08T15:43:00.000-07:002017-04-08T16:50:41.596-07:00Le Sénat dit adieu à la décentralisation<h2 style="text-align: center;">
<span class="_5mdd _1n4g">Le Sénat dit adieu à la décentralisation! </span></h2>
<span class="_5mdd _1n4g"> </span>
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<i><b>Le National</b></i>
du 7 avril annonce que :</div>
<div align="justify" style="line-height: 100%; margin-bottom: 0in; margin-left: 0.5in; margin-right: 0.56in; page-break-before: auto;">
« <i>Les Îles Cayimites, sixième section de la commune de
Pestel, sont en passe de se hisser au rang de commune. Les sénateurs,
réunis en séance plénière le jeudi 6 avril 2017, ont voté à
l’unanimité la proposition de loi portant création de la commune
des Îles Cayimites de l’arrondissement de Corail dans le
département de la Grande-Anse. »</i></div>
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<br /></div>
<br />
<div style="text-align: justify;">
La commission « Intérieur, collectivités territoriales, développement frontalier et aménagement du territoire » a-t-elle un bureau technique d'experts qui lui a fait rapport sur l'impact catastrophique de la balkanisation de nos collectivités territoriales ? Sérieusement, oui: un cordonnier, un médecin, un géographe ou un informaticien peuvent avoir leurs opinions sur des choses aussi sérieuses que le redécoupage administratif du pays ou l'opportunité de procéder à une greffe cardiaque. Personnellement, c'est le médecin que j'écouterai si mon cœur flanche ! Pas n'importe quel médecin. Je ferais même appel à un panel de cardiologues; absolument pas au géographe! Le cordonnier a pourtant des outils aussi, certes; il ne m'ouvrira jamais la poitrine !</div>
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<br /></div>
<div align="justify" style="line-height: 100%; margin-bottom: 0in;">
Le
parlement doit savoir comment la balkanisation de nos collectivités territoriales TUE LA DÉCENTRALISATION! C'est un véritable désastre !<br />
<br />
Pauvres citoyens des Cayemites qui y voient une bonne affaire pour eux !!!<br />
<br />
La commune de Pestel était déjà trop petite et pauvre pour joindre les deux bouts. En 2012-2013, les recettes fiscales de Cette commune s’élevaient à l’équivalent de US$3 323 ! Quel sera le budget de la commune des Cayemites avec ses 5 000 habitants ?</div>
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<a href="https://2.bp.blogspot.com/-psg6kUa36Xk/WOl29ot_t-I/AAAAAAAAA9U/XL1xAjRXvCksDOjaJ0fFufOpuBUBTuqXwCLcB/s1600/Cayemites.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="220" src="https://2.bp.blogspot.com/-psg6kUa36Xk/WOl29ot_t-I/AAAAAAAAA9U/XL1xAjRXvCksDOjaJ0fFufOpuBUBTuqXwCLcB/s400/Cayemites.png" width="400" /></a></div>
<br />
<br />
<br />
Habitants pauvres qui plus est. Regroupés pour la plupart dans des villages de pêcheurs, surtout à Anse-à-Macon avec ses 2 500 habitants et Pointe sable qui en compte environ 1 500.<br />
<br />
Au lieu de porter un mieux-être aux citoyens, cette loi ne fera qu'augmenter les dépenses administratives qui étaient déjà au dessus des moyens de Pestel, sans offrir de meilleurs services. Ce n’est pas en créant de nouvelles communes qu’on œuvre à l’Intérêt Général. L’État ne sert-il pas les citoyens de Port-au-Prince mieux que tous les autres ? Oui, ce Port-au-Prince avec son million d’habitants autrement mieux dotés que ceux des Cayemites !!!<br />
<br />
Les députés auront-ils le courage d’arrêter le désastre qui ne profite qu’à de petits intérêts ?</div>
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<br /></div>
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<span style="font-weight: normal;">Je vous suggère de lire l'article "<a href="https://drive.google.com/file/d/0B1Ll7ACjwbSaaW94TTI4bUhWelE/view?usp=sharing"><i>Le redécoupage territorial administratif, impératif pour l'aménagement du territoire d'Haïti</i></a>"</span></div>
Jean-François Tardieuhttp://www.blogger.com/profile/01025349732771545315noreply@blogger.com0tag:blogger.com,1999:blog-6409212593755603984.post-57579162885873359822017-03-04T15:24:00.000-08:002019-12-20T16:13:29.764-08:00<h2>
Rédiger un compte rendu critique </h2>
Voici un guide pour la rédaction d'un compte rendu critique.<br />
<br />
Le texte est tiré de la page web suivante : <br />
GINGRAS, François-Pierre, « Le compte rendu critique », <i>Cybermétho</i>, <a href="http://aix1.uottawa.ca/~fgingras/cybermetho/modules/compterendu.html">aix1.uottawa.ca/~fgingras/cybermetho/modules/compterendu.html</a>, 11 septembre 2019.<br />
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<span style="color: maroon;"><i>Rédiger un compte rendu
suivi de remarques critiques</i></span></h4>
<div style="text-align: justify;">
Les premiers essais de compte rendu critique prennent souvent la
forme d'un <b>compte rendu suivi de remarques critiques</b>.</div>
<div style="text-align: justify;">
Cette approche permet d'éviter assez facilement de confondre <i>ce
que l'auteur a écrit</i> (exposé du contexte, compte rendu) et <i>ce
que la critique en pense</i> (critique interne, critique externe,
conclusion).</div>
<div style="text-align: justify;">
Dans une telle approche, après la référence complète et exacte
au document critiqué, on a <b>quatre parties</b> bien distinctes :
(1) introduction (mise en contexte), (2) compte rendu, (3) critique
interne et externe, (4) appréciation générale.</div>
<ol>
<li style="text-align: justify;">
<div style="margin-bottom: 0in;">
<b>L'auteur et le contexte de
l'œuvre.</b> On commence le compte rendu en présentant l'auteur,
ses <i>objectifs</i> (cadre et origines de l'œuvre, public visé),
y compris, le cas échéant, sa <i>problématique</i> et ses
<i>hypothèses</i>. Un paragraphe suffit habituellement pour cette
introduction.
</div>
</li>
<li style="text-align: justify;">
<div style="margin-bottom: 0in;">
<b>Le compte rendu.</b> En
résumant, on doit retrancher du texte tout ce qui est purement
illustratif et anecdotique. En présence d'exemples, de souvenirs ou
d'un récit, on s'efforce d'effectuer une synthèse afin de
retrouver une réflexion et une intention démonstrative qui seules
doivent figurer dans le compte rendu. En gros, il s'agit
exclusivement de présenter non seulement le texte, mais <i>la
pensée</i> de l'auteur. Dans cette partie, il faut s'abstenir
d'exposer ses propres opinions. Il s'agit plutôt d'exposer les
<i>idées principales</i> et les <i>idées secondaires</i> de chaque
partie, en particulier, s'il s'agit d'un texte scientifique, le
<i>raisonnement</i> et les <i>arguments</i> de l'auteur. Chaque
paragraphe de cette partie correspond normalement à une idée
distincte.
</div>
</li>
<li style="text-align: justify;">
<div style="margin-bottom: 0in;">
<b>La critique.</b> La troisième
partie du compte rendu comprend alors la <i>critique interne et
externe</i> de l'œuvre. Il est souvent plus clair et parfois plus
facile de diviser la critique en deux sections distinctes, critique
interne et externe. Cependant, ceci peut entraîner des lourdeurs et
des répétitions inutiles. Cette division n'est donc pas
obligatoire.<br />
La <span style="color: blue;"><i>critique interne</i></span> porte sur la cohérence et la logique de l'ouvrage, l'aptitude des idées à retenir l'attention, la rigueur de l'argumentation, le choix des idées exposées, la forme et le style.<br />
La <span style="color: blue;"><i>critique externe</i></span> porte davantage sur l'œuvre dans son contexte On cherche alors à mesurer l'apport du texte à l'avancement d'une idée... Il est utile de recourir à d'autres auteurs et de faire appel à d'autres données, à d'autres faits que ceux mentionnés par l'auteur. <br />
La créativité et le sens critique doivent inspirer
une présentation intéressante et différente pour chaque texte
étudié. Chaque paragraphe de cette partie correspond normalement à
une idée distincte.
</div>
</li>
<li>
<div style="text-align: justify;">
<b>L'appréciation générale.</b> On termine par un court
paragraphe faisant ressortir l'intérêt général de l'œuvre, ses
principaux <i>mérites</i> et ses principales <i>faiblesses</i>.
</div>
</li>
</ol>
<div style="line-height: 100%; margin-bottom: 0in;">
<br /></div>
<div style="line-height: 100%; margin-bottom: 0in;">
Extrait de :</div>
<div style="line-height: 100%; margin-bottom: 0in;">
GINGRAS,
François-Pierre, « Le compte rendu critique », Cybermétho,
<a href="http://aix1.uottawa.ca/~fgingras/cybermetho/modules/compterendu.html">aix1.uottawa.ca/~fgingras/cybermetho/modules/compterendu.html</a>, 11 septembre 2019.</div>
Jean-François Tardieuhttp://www.blogger.com/profile/01025349732771545315noreply@blogger.com0tag:blogger.com,1999:blog-6409212593755603984.post-24669343729799280012015-05-22T16:58:00.000-07:002019-09-11T13:16:00.254-07:00CONTENU SUPLÉMENTAIRE<div style="text-align: center;">
<i><u><b>Ces contenus complètent les présentations des cours </b></u></i></div>
<div style="text-align: center;">
<i><u><b>et les enrichissent.</b></u></i></div>
<br />
<a href="https://geographieconomique.blogspot.com/2017/03/rediger-un-compte-rendu-critique-voici.html" target="_blank">Comment rédiger un compte rendu critique?</a> <br />
<br />
<a href="https://geographieconomique.blogspot.com/2018/03/classer-les-villes-selon-leur.html">Classer les villes à l'aide de la distribution rang-taille</a><br />
<br />
<a href="http://geographieconomique.blogspot.com/2012/03/10-mondialisation.html" target="_blank">Éléments sur la Mondialisation</a><br />
<br />
<a href="http://geographieconomique.blogspot.com/2012/01/les-modeles-de-localisation-des.html">Document de Amor Belhedi: Modèles de localisation</a><a href="https://drive.google.com/open?id=0B1Ll7ACjwbSaODk0MGNjYjgtNjVhZS00MTJhLWIwMDktYjc0MDY2ZGE0MjU4" target="_blank"> des activités économiques </a><br />
<br />
<a href="http://geographieconomique.blogspot.com/2012/02/attraction-urbaine-illustration-boucle.html" target="_blank">La "Boucle Centre-Artibonite": Un milliard de dollars pour tuer une région ! </a><br />
<br />
<a href="http://geographieconomique.blogspot.com/2012/04/le-comite-interministeriel-damenagement.html" target="_blank">Boucle Centre-Artibonite: le CIAT persiste</a> <br />
<br />
<a href="http://geographieconomique.blogspot.com/2013/06/09-loi-rang-taille-de-villes-haitiennes.html" target="_blank">Loi rang-taille: villes haïtiennes</a><br />
<br />
<a href="http://geographieconomique.blogspot.com/2014/02/loi-rang-taille-places-centrales-et.html" target="_blank">Loi rang-taille, places centrales et polarisation</a><br />
<br />
<span class="yt-uix-form-input-checkbox-container video-checkbox-container"></span><a class="vm-video-title-content yt-uix-sessionlink" data-sessionlink="ei=gpdfVfD1NITt-gXQtIPwDw" href="https://www.youtube.com/watch?v=3GUl4kZW79g" target="_blank">Konferans "Amenajman teritwa Gran-Sid nan Plan Estratejik Devlopman Ayiti"</a> <br />
<br />
<a href="http://geographieconomique.blogspot.com/2015/05/le-psdh-et-lamenagement-du-territoire.html" target="_blank">Le PSDH et l'aménagement du territoire du Grand-Sud d'Haïti: Adaptation française de la conférence prononcée le 8 avril 2015 aux Cayes.</a><br />
<br />
<a href="https://drive.google.com/file/d/0B1Ll7ACjwbSaMVptV1VhSzdrYUU/view?usp=sharing" target="_blank">Action en aménagement: La réforme agraire. Le document sur lequel est dirigé ce lien concerne la première phase de la réforme agraire opérée en 1997 dans l'Artibonite. Qu'est-ce qu'une véritable réforme agraire, et en Haïti? Ce document de "vulgarisation" répond en bonne partie à cette question.</a><br />
<br />
<a href="https://drive.google.com/open?id=117oLcQk84QvWFXmNn7JJABPuyJ2Bhx9z" target="_blank">Le redécoupage territorial administratif, un impératif pour l'aménagement du territoire d'Haïti . In :Aménagement du Territoire. CRESFED / UNASUR, Port-au-Prince 2015</a><br />
<br />
<a href="https://geographieconomique.blogspot.com/2019/03/la-chance-qui-passe-cliquer-pour-voir.html" target="_blank">La chance qui passe: Manifeste politique rédigé par Georges Anglade pour le "Mouvement Lavalas" en 1990.</a><br />
<style type="text/css">p { margin-bottom: 0.1in; line-height: 120%; text-align: justify; widows: 2; orphans: 2; page-break-before: auto; }p.cjk { font-size: 10pt; }</style>Jean-François Tardieuhttp://www.blogger.com/profile/01025349732771545315noreply@blogger.com0tag:blogger.com,1999:blog-6409212593755603984.post-34852894652478200252015-05-22T16:53:00.000-07:002019-02-08T14:19:35.197-08:00Le PSDH et l'aménagement du territoire du Grand-Sud d'Haïti<style type="text/css">h2 { margin-top: 0.12in; margin-bottom: 0.06in; text-align: justify; widows: 2; orphans: 2; page-break-before: auto; }h2.western { font-family: "Liberation Sans","Arial",sans-serif; font-size: 15pt; font-style: italic; font-weight: normal; }h2.cjk { font-family: "Droid Sans Fallback"; font-size: 16pt; }h2.ctl { font-family: "FreeSans"; font-size: 16pt; }h1 { margin-bottom: 0.08in; text-align: center; widows: 2; orphans: 2; page-break-before: auto; }h1.western { font-family: "Liberation Sans","Arial",sans-serif; font-size: 15pt; font-style: italic; }h1.cjk { font-family: "Droid Sans Fallback"; font-size: 18pt; }h1.ctl { font-family: "FreeSans"; font-size: 18pt; }blockquote { text-align: justify; widows: 2; orphans: 2; page-break-before: auto; }blockquote.western { font-style: italic; }blockquote.cjk { font-size: 10pt; }p { margin-bottom: 0.1in; line-height: 120%; text-align: justify; widows: 2; orphans: 2; page-break-before: auto; }p.cjk { font-size: 10pt; }</style>
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<h2 style="border-color: -moz-use-text-color -moz-use-text-color rgb(0, 0, 0); border-style: none none double; border-width: medium medium 1pt; line-height: 100%; margin-bottom: 0.08in; margin-top: 0.17in; padding: 0in 0in 0.02in; page-break-after: avoid; page-break-inside: avoid; text-align: center;">
<span style="font-family: "liberation sans" , "arial" , sans-serif; font-size: large;"><b>Le
PSDH et l'aménagement du territoire du Grand-Sud d'Haïti</b></span></h2>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
<span style="font-family: "arial" , sans-serif;"><span style="font-size: x-small;"><i>Jean-François
Tardieu,</i></span></span></div>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
<span style="font-family: "arial" , sans-serif;"><span style="font-size: x-small;"><i>Chef
de Département d'Aménagement du Territoire</i></span></span></div>
<div class="western" style="line-height: 100%; margin-bottom: 0in;">
<span style="font-family: "arial" , sans-serif;"><span style="font-size: x-small;"><i>à
l'Université Notre-Dame d'Haïti, UDERS des Cayes</i></span></span></div>
<div class="western">
<span style="font-family: "arial" , sans-serif;"><span style="font-size: x-small;"><i>Adaptation
française de la conférence prononcée le 8 avril 2015 aux Cayes</i></span></span></div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Du
17 au 31 mars 2015, une mission d'experts Canadiens est venue
apporter son aide à Haïti dans le domaine de la planification
stratégique, cela dans le cadre du « Projet d'Appui au
Renforcement de la Gestion Publique en Haïti ». Cette mission
aurait recommandé de créer un nouvel organisme qui aurait la charge
d'inciter tous les Ministères à respecter le Plan Stratégique de
Développement d'Haïti (PSDH).</div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Alors
que ces conseils étaient prodigués pour faire atterrir le PSDH, il
n'y a jamais eu, comme cela aurait dû être, une large campagne de
consultations publiques, ni même un effort sérieux de consultation
auprès des experts Haïtiens, sur ce document produit pour Haïti
par une compagnie canadienne. Le Département d'Aménagement du
Territoire de l'Université Notre-Dame aux Cayes a donc décidé de
lancer le débat sur le PSDH. Ainsi, ce texte traite de l'Aménagement
du Territoire du Grand-Sud d'Haïti en prenant le PSDH comme point de
départ.</div>
<h3 class="western">
Missions du Plan Stratégique de Développement
d'Haïti (PSDH)</h3>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in;">
Le
PSDH s'est donné trois missions :</div>
<ul>
<li style="text-align: justify;"><div class="western" style="line-height: 100%; margin-bottom: 0.12in;">
La première est de tracer le chemin à suivre pour sortir le pays
de la situation de sous-développement dans laquelle il se trouve.</div>
</li>
<li style="text-align: justify;"><div class="western" style="line-height: 100%; margin-bottom: 0.12in;">
La deuxième mission est de mobiliser et de rassembler tous les
acteurs autour d'une stratégie unique. Cette stratégie devrait
conduire à ce que dans tous les domaines et dans toutes les régions
du pays, les actions soient coordonnées pour atteindre le même
objectif.</div>
</li>
<li style="text-align: justify;"><div class="western" style="line-height: 100%; margin-bottom: 0.12in;">
La troisième mission est de garantir une coordination de toute ces
initiatives qui sont prises dans le but formel de participer au
développement du pays.</div>
</li>
</ul>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Aborder
la problématique de l'aménagement du territoire force à considérer
les autres domaines puisque dans la stratégie comme dans la vie,
tout est lié.</div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Beaucoup
confondent aménagement du territoire et zonage. Le zonage consiste
pour une autorité d'établir des règles à propos des activités ou
des établissements qui sont encouragés, autorisés ou interdits
dans un périmètre. Par exemple :</div>
<ul style="text-align: justify;">
<li><div class="western" style="line-height: 100%; margin-bottom: 0.12in;">
Il est interdit de construire dans les ravines; les berges des
rivières doivent être obligatoirement plantés de bambous.</div>
</li>
<li><div class="western" style="line-height: 100%; margin-bottom: 0.12in;">
La zone centrale du Parc Macaya doit être gérée par l'État.</div>
</li>
<li><div class="western" style="line-height: 100%; margin-bottom: 0.12in;">
La Plaine du Cul-de-Sac est décrétée zone agricole.</div>
</li>
</ul>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Ces
mesures de zonage font partie de l'aménagement du territoire qui est
un domaine bien plus vaste. L'aménagement du territoire est la façon
dont une société gère le positionnement et le mouvement de ses membres, de ses
activités et de ses ressources dans une région qui peut être une
section communale, une commune, un département, un bassin versant,
une agglomération urbaine, une plaine, l'aire d'influence d'une
ville ou d'un marché etc. Les règles et actions d'aménagement du
territoire par les pouvoirs publics devraient être guidées par
l'idée du bien commun à court, moyen et long termes.</div>
<h2 class="western" style="text-align: center;">
Le pacte du PSDH</h2>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Le
PSDH statue sur un pacte en 8 points qui traitent d'économie, de
rapports sociaux, d'aménagement du territoire et de politique en
général :</div>
<h3 class="western">
Dans le domaine de l'économie</h3>
<ol>
<li style="text-align: justify;"><div class="western" style="line-height: 100%; margin-bottom: 0.12in;">
Pour traiter la crise actuelle et les défis qui se présentent à
nous, le PSDH opte pour une stratégie de croissance économique
forte et durable.</div>
</li>
<li style="text-align: justify;"><div class="western" style="line-height: 100%; margin-bottom: 0.12in;">
Cette croissance doit être réalisée par la création de richesse
et d’emplois. À bien examiner, le PSDH orienterait les acteurs
vers la création de richesses ET d'emplois. Les options économiques
devraient dès lors d'une part conduire à l'augmentation du
patrimoine national et d'autre part viser la réduction du chômage
et du sous-emploi.</div>
</li>
<li><div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Le développement doit être mené par le secteur privé ; l'État
oriente et supporte.</div>
</li>
</ol>
<h3 class="western">
Dans le domaine social</h3>
<ol start="4">
<li style="text-align: justify;"><div class="western" style="line-height: 100%; margin-bottom: 0.12in;">
Il est fait choix de l’inclusion sociale. À bien comprendre, le
Plan conduirait à une ouverture sur les groupes sociaux qui,
jusqu'à aujourd'hui, subissent des blocages de toute sorte au
bénéfice des monopoles ou oligopoles qui freinent le développement
économique du pays.</div>
</li>
<li><div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Le choix est fait aussi de l’offre des services de base à la
population.</div>
</li>
</ol>
<h3 class="western">
Dans le domaine de l'aménagement du territoire</h3>
<ol start="6">
<li style="text-align: justify;"><div class="western" style="line-height: 100%; margin-bottom: 0.12in;">
Le PSDH décide de s'asseoir sur un développement polarisé (même
lorsque le document montre une incompréhension du concept). Il fait
choix de pôles régionaux de développement à l’échelle des
départements géographiques,</div>
</li>
<li><div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
et choix des Chefs-lieux d’Arrondissement comme pôles locaux de
développement.</div>
</li>
</ol>
<h3 class="western">
Dans le domaine politique</h3>
<ol start="8">
<li><div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Le Plan fait le choix de la construction d’un État fort,
déconcentré et décentralisé.</div>
</li>
</ol>
<h3 class="western">
En résumé</h3>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in;">
Il
est possible de résumer le contrat du PSDH en quatre éléments :</div>
<ol>
<li style="text-align: justify;"><div class="western" style="line-height: 100%; margin-bottom: 0.12in;">
Une croissance économique rapide mais surtout durable.</div>
</li>
<li style="text-align: justify;"><div class="western" style="line-height: 100%; margin-bottom: 0.12in;">
La décision de s'asseoir sur le secteur privé (qui inclus, il ne
faut pas l'oublier le secteur coopératif).</div>
</li>
<li style="text-align: justify;"><div class="western" style="line-height: 100%; margin-bottom: 0.12in;">
La décision de se baser sur les pôles géographiques pour animer
le développement.</div>
</li>
<li style="text-align: justify;"><div class="western" style="line-height: 100%; margin-bottom: 0.12in;">
L'équité, qui sociale qui géographique, ce qui conduit à
l'inclusion sociale, à l'offre de services de base et à la
décentralisation.</div>
</li>
</ol>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
En
une phrase, l<b>e PSDH c'est engager le pays dans un développement
polarisé, libéral et équitable.</b></div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Ces
quatre éléments constituent le leitmotiv des réflexions qui
suivent.</div>
<h2 class="western" style="text-align: center;">
Le développement polarisé</h2>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Dans
le PSDH, l'option intégratrice des actions est sans ambages la
polarisation. Faute d'une bonne utilisation du concept dans les
documents du PSDH, il est nécessaire de s'arrêter un moment
là-dessus.</div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Le
concept de polarisation a été développé par François Perroux.
Une phrase célèbre résume l'idée :</div>
<div style="text-align: justify;">
<blockquote class="western">
« <i>La croissance n'apparaît pas
partout à la fois ; elle se manifeste en des points ou pôles
de croissance (…) avec des effets terminaux variables pour
l'ensemble de l'économie</i> »</blockquote>
</div>
<h3 class="western">
Pôles économiques</h3>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Il
est important de mentionner qu'au départ, le concept de polarisation
n'est pas géographique. Un pôle est d'abord une activité ou groupe
d'activités économiques capables d'entraîner dans leur croissance
ou leur déclin, l'ensemble de l'économie. Les économistes habitués
à manipuler les matrices input-output peuvent facilement comprendre.
Concrètement, une entreprise utilise des bien acquis ailleurs et
peut fournir des biens et services à d'autres entreprises. Quand la
production d'un pôle économique augmente, la demande d'intrants
augmente et l'offre aussi, à des prix généralement inférieurs.
Ces deux résultats conduisent à une croissance de l'ensemble de
l'économie.</div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Quelles
conséquences pour la planification ? Si le choix est fait d'un
développement polarisé, une activité détachée de l'économie
nationale ne peut être priorisée. C'est ainsi que ni la
sous-traitance ni les zones franches ne peuvent constituer la base
d'un développement polarisé. Cela n'exclus la participation ni de
la sous-traitance ni des zones franches dans le développement
économique. Cependant ces options ne peuvent être prises comme
fondatrices.</div>
<h3 class="western">
Pôles géographiques</h3>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Mais
le développement économique polarisé a des conséquences dans
l'espace géographique. Les pôles économiques sont géographiquement
agglomérés ; cela conduit à la polarisation géographique. Un
pôle géographique entraîne dans sa croissance ou son déclin toute
la région qui tombe sous son influence.</div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Trois
facteurs entraînent la polarisation géographique :</div>
<ol style="text-align: justify;">
<li><div class="western" style="line-height: 100%; margin-bottom: 0.12in;">
Le premier facteur est l'économie d'échelle qui fait qu'une
industrie a une taille optimale où les coûts de production sont
plus faibles. Si par exemple une entreprise peut produire 1000
bocaux de confiture par jour et que, pour une raison ou une autre
elle n'y arrive pas, ses coûts moyens augmentent.</div>
</li>
<li><div class="western" style="line-height: 100%; margin-bottom: 0.12in;">
Le second facteur est l'économie de localisation qui fait que
plusieurs industries de même type ou complémentaires ont avantage
à se regrouper dans le territoire. Par exemple, un chimiste contracté
par un fabricant de confiture a intérêt à s'établir tout près.
Le chimiste pouvant desservir plusieurs fabricants, plusieurs
entreprises, il attire l'établissement d'autres fabricants qui bénéficient d'une économie externe c'est-à-dire d'un avantage qui est indépendant de l'entreprise elle-même. L'économie de localisation est à la base de la politique des
clusters en vogue actuellement.</div>
</li>
<li><div class="western" style="line-height: 100%; margin-bottom: 0.12in;">
Le troisième facteur qui stimule la polarisation géographique est
l'économie d'agglomération. Une ville qui offre une variété de
ressources, un environnement favorable et un marché attire des
entreprises de toute sorte à cause de ces économies externes.</div>
</li>
</ol>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Dans
une option de développement polarisé, ces trois facteurs doivent
constamment être considérés.</div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Une
option réaliste et libérale qui de surcroît offre à tous les
acteurs une chance de participer au développement, conduit à
dynamiser les pôles économiques et géographiques déjà existants.
Parler d'équité exige en plus une volonté manifeste d'en finir
avec l'apartheid économique, un effort particulier pour supporter les
micro-entreprises qui, souvent, sont réduit par le système en place
à rester dans l'informel.</div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Outre
l'équité économique, l'équité géographique demande à la fois
la décentralisation et la déconcentration.</div>
<h3 class="western">
Considérations erronées du PSDH sur les pôles
géographiques</h3>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Avant
de passer aux considérations du PSDH sur l'aménagement du
territoire, il est utile de jeter un coup d'œil sur la répartition
des pôles géographiques sur le territoire du pays.</div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
L'observation
de la répartition de quatre niveaux de villes selon leur population
amène au constat que ces pôles sont concentrés dans les
départements de l'Ouest, de l'Artibonite et du Nord. Dans le Sud, la
ville des Cayes est seulement au troisième niveau. Si la région est
prolongée jusqu'à Gressier, elle comprend aussi, au troisième
niveau, Petit-Goâve et Léogâne. Ensuite, Jérémie, Jacmel et
Grand-Goâve se trouvent au quatrième niveau<sup>1</sup>. Cela signifie que le
Grand-Sud souffre d'un déficit de grandes agglomérations urbaines.<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="http://3.bp.blogspot.com/-28iznXMCFxo/VXmXAhXwFKI/AAAAAAAAAfE/AmheIPNxGrg/s1600/Nivo_Vil_Ayiti.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="472" src="https://3.bp.blogspot.com/-28iznXMCFxo/VXmXAhXwFKI/AAAAAAAAAfE/AmheIPNxGrg/s640/Nivo_Vil_Ayiti.png" width="640" /></a></div>
<div class="separator" style="clear: both; text-align: center;">
<br /></div>
</div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Par
contre, la région comprend une quantité appréciable de gros
marchés publics. De Anse d'Hainault à Gressier, on y trouve plus
d'une quinzaine de ces marchés à très forte fréquentation. Cela
signifie qu'une planification territoriale bien pensée du Grand-Sud
devrait particulièrement considérer les marchés publics dans la
problématique de la polarisation.<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="http://2.bp.blogspot.com/-D0iPanxR0O8/VXmX8oL1HRI/AAAAAAAAAfM/04vry68eJcM/s1600/Plas_santralAyiti.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="470" src="https://2.bp.blogspot.com/-D0iPanxR0O8/VXmX8oL1HRI/AAAAAAAAAfM/04vry68eJcM/s640/Plas_santralAyiti.png" width="640" /></a></div>
<div class="separator" style="clear: both; text-align: center;">
<br /></div>
</div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Le
PSDH déclare que pour dynamiser le développement du pays, il opte
pour des « pôles » qu'il choisit sur la base des
divisions administratives. C'est ainsi que Port-au-Prince est déclaré
pôle national, que le Cap et les Cayes sont déclarés grand pôles
régionaux, les chefs-lieux de départements sont déclarés pôles
régionaux (en plus de Saint-Marc et de Mirebalais), les chefs-lieux
d'arrondissements sont déclarés pôles locaux.<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="http://4.bp.blogspot.com/-FpjscCaISD4/VXmpfTyLKXI/AAAAAAAAAgE/yg4jSZBcB_Q/s1600/PolesPSDH.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="406" src="https://4.bp.blogspot.com/-FpjscCaISD4/VXmpfTyLKXI/AAAAAAAAAgE/yg4jSZBcB_Q/s640/PolesPSDH.png" width="640" /></a></div>
<br /></div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Depuis
1989, à la sortie du document « La relance des régions »,
c'est cette approche qui est adoptée par le Ministère de la
Planification.<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="http://3.bp.blogspot.com/-Aqlig_pfmrs/VXmcaWJiigI/AAAAAAAAAfY/nyaZ4Mb_8aM/s1600/RelanceRegions.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="362" src="https://3.bp.blogspot.com/-Aqlig_pfmrs/VXmcaWJiigI/AAAAAAAAAfY/nyaZ4Mb_8aM/s640/RelanceRegions.png" width="640" /></a></div>
<div class="separator" style="clear: both; text-align: center;">
<br /></div>
<div class="separator" style="clear: both; text-align: center;">
</div>
</div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
À
l'examen, cette vision est en porte-à faux de la polarisation bien
comprise. En effet, comment, dans un plan de développement
économique, Belladère avec ses 2 000 habitants peut-il être
considéré au même titre que Anse d'Hainault qui a une population
de 12 000 habitants ? Comment positionner Miragoâne de
12 000 âmes au même niveau que Jacmel ou Jérémie qui ont
40 000 habitants ?<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="http://3.bp.blogspot.com/-7Z6LVXbojOI/VXmgRNSF7jI/AAAAAAAAAfk/-XUnGk8IowI/s1600/PolesPADHGdSud.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="160" src="https://3.bp.blogspot.com/-7Z6LVXbojOI/VXmgRNSF7jI/AAAAAAAAAfk/-XUnGk8IowI/s640/PolesPADHGdSud.png" width="640" /></a></div>
<br />
<br />
<div class="separator" style="clear: both; text-align: center;">
</div>
Les divisions administratives n'ont pas
été conçus pour générer un développement économique. Il n'y a
aucune raison de croire que forcer une polarisation hiérarchisée en
fonction des divisions administratives conduirait à une croissance
plutôt qu'à un déclin. C'est un choix risqué sinon dangereux.</div>
<h2 class="western" style="text-align: center;">
Le PSDH sur le Grand-Sud</h2>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
En
ce qui concerne le Grand-Sud, 3 document de base traitent de la
planification pour les départements du Sud, de la Grand'Anse et des
Nippes. Le premier est un diagnostic, le second contient des
propositions stratégique et le troisième une liste de projets
bancables. D'autres documents qui traitent du Sud-Est sont animés
par la même logique.</div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Le
document diagnostic comprend une description de la région : sa
délimitation, sa géographie physique, ses caractéristique
démographiques. Il aborde l'occupation du sol, la question de
l'environnement physique, les attraits touristiques, les
infrastructures, la pêche, l'agriculture, le tourisme. Aucun
diagnostic sur la polarisation actuelle ou potentielle économique ou
géographique.</div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Or,
un plan d'aménagement du territoire se doit de considérer à la
fois et de façon combinée :</div>
<ul style="text-align: justify;">
<li><div class="western" style="line-height: 100%; margin-bottom: 0.12in;">
les régions uniformes caractérisés par une ressemblance eu égard
à un certain nombre de paramètres : les plaines versus zones
pentues, les régions rurales, les agglomérations urbaines, les
régions uniformes quant-aux revenus, les régions administratives
etc.</div>
</li>
<li><div class="western" style="line-height: 100%; margin-bottom: 0.12in;">
et les régions polarisées comme la zone d'influence d'une
agglomération urbaine ou d'un marché.</div>
</li>
</ul>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
C'est
l'étude de ces deux catégories de régions qui permettent de
définir dans un soucis d'optimalisation, les régions programmes (ou
régions-plan), c'est-à-dire qui seront sujets à une gestion
spécifique des pouvoirs publics. Ces régions devraient également
considérer les plans des agents économique, plans qui ont aussi une
dimension géographique. Mais si le choix est fait d'adopter la
polarisation comme base, la considération des régions polarisées
devient prioritaire.</div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Le
constat est que le diagnostic du PSDH pour le Grand-Sud se base sur
les régions uniformes, dont les divisions administratives, cela en
contradiction avec la ligne affichée qui est le développement
polarisé. Il y a là une faiblesse conceptuelle évidente.</div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
La
faiblesse du PSDH conduit à des errements, jusqu'à l'amalgame
conceptuel. En effet, alors que le Plan opte pour les pôles de
développement, c'est le modèle de développement de Michel Porter
qui est présenté, modèle étranger au cadre théorique de François
Perroux.</div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Michel
Porter a travaillé sur les grand pays industriels tels les
États-Unis d'Amérique, le Japon, l'Italie, l'Allemagne et la Corrée
du Sud, tous des pays qui ne supportent aucune comparaison de
dimension, d'histoire et de structure avec Haïti. De plus, ses
« clusters » ne sont pas de réels pôles de
développement au sens de Perroux.</div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Perroux,
l'un des plus grands économistes du 20e siècle, chrétien avec des
convictions humanistes, s'est particulièrement intéressé au
sous-développement, à l'Afrique et à l'Amérique Latine. Très
critique par rapport à la science économique traditionnelle, il
fait largement appel à l'histoire et aux questions de pouvoir et
d'inégalités entre agents économiques et nations.</div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Ces
deux approches ne peuvent pas aussi facilement être assimilées.
Dans cette ambiance amalgamée, le PSDH qui ne site Perroux nulle
part, donne une définition tout à fait débile de pôle de
développement.</div>
<div style="text-align: justify;">
<blockquote class="western">
« <i>Pòl – nan dokiman sa se kote,
pwen, vil ke leta chwazi pou l mete yon seri aktivite ekonomik. Vil
Caracol vin tounen yon pòl devlopman a kòz de faktori, lojman, izin
kouran, eks. Ke yap mete ladann. »</i></blockquote>
<blockquote class="western">
<i>(Pôle – dans ce document, c'est un
endroit, un point, une ville que l'État choisit pour y installer une
série d'activités économiques. La ville de Caracol est devenu un
pôle de développement de par les factoreries, les logements, la
centrale électrique qui vont y être installés.)</i></blockquote>
</div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Cette
conception est très loin de l'idée d'un lieu central assis sur des
pôles économiques et capable d'entraîner une région dans sa
croissance ou son déclin. De surcroît, d'où sort l'idée pour
l'État, dans une approche libérale, de se donner un rôle aussi
actif de l'ACTEUR qui positionne les activités économiques dans le
territoire ?</div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Cette
faiblesse conceptuelle empêche au PSDH d'offrir un cadre d'insertion
des activités de développement économique et social. C'est sans
doute cela qui conduit le PSDH à présenter pour le Grand-Sud dans
l'horizon 2012-2015, un simple catalogue de projets déconnectés de
toute logique unitaire. Arrivés à la fin de ladite période, force
est de constater que rares sont les projets menés à bon port. Dans
la pratique, le PSDH s'est donc révélé une boite vide.</div>
<h2 class="western" style="text-align: center;">
Les actions du gouvernement dans le Grand-Sud, et
le PSDH</h2>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Pendant
que le Ministère de la Planification faisait la promotion du PSDH,
le Premier Ministre (Laurent Lamothe, également Ministre de la
Planification), sans aucune vision stratégique, s'est mis à
produire des « plans spéciaux » ici et là : 5 pour
le Grand-Sud :</div>
<ul style="text-align: justify;">
<li><div class="western" style="line-height: 100%; margin-bottom: 0.12in;">
Jérémie,</div>
</li>
<li><div class="western" style="line-height: 100%; margin-bottom: 0.12in;">
Les Cayes,</div>
</li>
<li><div class="western" style="line-height: 100%; margin-bottom: 0.12in;">
l'Île-à-Vache,</div>
</li>
<li><div class="western" style="line-height: 100%; margin-bottom: 0.12in;">
Bernargosse,</div>
</li>
<li><div class="western" style="line-height: 100%; margin-bottom: 0.12in;">
et Côte-de-Fer.</div>
</li>
</ul>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
<div class="separator" style="clear: both; text-align: center;">
<a href="http://2.bp.blogspot.com/-IJsIbZhSGBk/VXmq0UnvMXI/AAAAAAAAAgM/DoVtYT_76lM/s1600/PlansSpeciauxSud.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="212" src="https://2.bp.blogspot.com/-IJsIbZhSGBk/VXmq0UnvMXI/AAAAAAAAAgM/DoVtYT_76lM/s640/PlansSpeciauxSud.png" width="640" /></a></div>
<br />
<br />
Le
cas de Côte-de-Fer éclaire suffisamment. Ce sont 37 petits projets
sans liens que contient son plan spécial : parc sportif,
bord-de-mer, marché public, lampadaires, lycée, traitement de
ravine etc. L'approche par plans spéciaux, faute de vision,
hypothèque en fait le développement économique et social, pénalise
la population et la région à long terme.<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="http://3.bp.blogspot.com/-9ATVxAVTkcI/VXmh-LAsl0I/AAAAAAAAAfw/Vef2Z9WEn0c/s1600/PlSpeciauxCotesdeFer.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="328" src="https://3.bp.blogspot.com/-9ATVxAVTkcI/VXmh-LAsl0I/AAAAAAAAAfw/Vef2Z9WEn0c/s640/PlSpeciauxCotesdeFer.png" width="640" /></a></div>
<br /></div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Un
autre exemple terrible de l'absence non seulement de cadre mais aussi
de considérations économiques est l'idée de construire 4 aéroports
internationaux dans le Grand-Sud : à Jérémie, aux Cayes, à
l'Île-à-Vache et à Côte-de-Fer. Où est le calcul de rentabilité
de ces importants investissements ?<br />
<div class="separator" style="clear: both; text-align: center;">
</div>
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="http://2.bp.blogspot.com/-vpxt9tfjazU/VXmi0oUN2fI/AAAAAAAAAf4/9B4gYrM74Ak/s1600/Aeroports.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="212" src="https://2.bp.blogspot.com/-vpxt9tfjazU/VXmi0oUN2fI/AAAAAAAAAf4/9B4gYrM74Ak/s640/Aeroports.png" width="640" /></a></div>
<span style="color: red;"></span></div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Finalement,
le gouvernement haïtien a commandé l'élaboration d'un Plan
Stratégique de Développement. Ce Plan, faible au niveau du cadre
conceptuel, est caractérisé par une somme de projets déconnectés.
Sans considération de ce PSDH, le gouvernement a opté pour la
réalisation d'une série de plans spéciaux plus faibles encore que
le PSDH et étrangers à un processus de développement économique
et social.</div>
<h2 class="western" style="text-align: center;">
Propositions sur trois axes</h2>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Au
vu de ce constat, un effort de la pensée est nécessaire. Le lecteur
trouvera dans ce qui suit des pistes pour un véritable aménagement
du territoire polarisé dans l'optique de l'invitation du Pape
François : «<i> Je vous exhorte à la solidarité
désintéressée et à un retour de l’économie et de la finance à
une éthique en faveur de l’être humain. </i>»</div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
La
proposition s'assied sur trois axes de réflexions et d'actions :</div>
<ol>
<li style="text-align: justify;"><div class="western" style="line-height: 100%; margin-bottom: 0.12in;">
La résolution de la contradiction engagée depuis la colonie entre
ce que Georges Anglade nomme les réseaux de prélèvement d'une
part et les noyaux de résistance de l'autre.</div>
</li>
<li style="text-align: justify;"><div class="western" style="line-height: 100%; margin-bottom: 0.12in;">
La prise en compte des régions uniformes physiques et sociales.</div>
</li>
<li><div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
L'identification des régions polarisées actuelles ou potentielles.</div>
</li>
</ol>
<h3 class="western">
Réseaux de prélèvement et noyaux de résistance</h3>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Le
premier axe concerne les rapports entre réseaux de prélèvement et
noyaux de résistance.</div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Les
réseaux de prélèvement relèvent d'un projet de développement
exogène, au service des grandes puissances du monde. Ce projet était
le fondement de la colonie. Après l'indépendance, pour diverses
raisons, les oligarchies ont défendu ce projet : créoles,
commerçants étrangers du bord-de-mer, européens, caraïbes, juifs
et arabes. Même modéré Dessalines a joué cette partition.
Aujourd'hui, ce projet oriente vers la mécanisation sans réflexion
de l'agriculture, vers une agriculture d'exportation, vers un secteur
secondaire qui privilégie les zones franches et la sous-traitance. À
l'évidence, ce projet est incompatible avec un développement
polarisé. Présentement, ce sont ce que Fritz Jean appelle Réseaux
Sociaux d'Accumulation qui défendent ce projet avec le plus
d'agressivité.</div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Face
à ce projet, même en relation forcée avec lui, se dressent les
noyaux de résistance. Ils tirent leur source du marronnage. Les
noyaux cherchent l'autonomie. Dans le domaine de l'agriculture, le
choix prioritaire est la production de vivre pour consommation
nationale. C'est un projet endogène de développement qui seul, dans
le court terme, est compatible avec un développement polarisé.</div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
La
contradiction entre réseaux et noyaux accapare dans une lutte
stérile l'énergie qui pourrait alimenter le développement
économique et social. Il faut nécessairement un nouveau contrat
social qui puisse résoudre cette contradiction. La prise en compte
de cette dynamique sociale est incontournable.</div>
<h3 class="western">
Les régions uniformes</h3>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Cela
dit, les espaces uniformes construits ou à construire sous les
contraintes naturelles et humaines sont un deuxième pilier pour
l'aménagement du territoire. Les unités naturelles contraignent
mais offrent aussi des opportunités spécifiques aux activités
économiques. De la même manière, les régions sociales doivent
être traités dans leurs positionnements actuels en regard à la
dynamique de développement : zones rurales essentiellement
paysannes, métropoles soumises aux réseaux sociaux d'accumulation
au sens de Fritz Jean et malades de la mondialisation, cités occupés
par un lumpenprolétariat dominé par des gangs, villes moyennes
animées par les oligarchies de province et... la diaspora. Ce
diagnostic des régions uniformes va donc bien au-delà de la simple
description de ce qui est observable à l'œil ou sur Google. Et le
diagnostic physique, et le diagnostic social sont affaire de
compétences affirmées et hautement critiques.</div>
<h3 class="western">
Les régions polarisées</h3>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
L'analyse
des régions uniformes permet de mieux aborder les questions de
polarisation. D'ailleurs, l'étude des classes de densité est l'un
des meilleurs moyens d'identifier les pôles géographiques. C'est ce
qui a été fait dernièrement pour le département du Nord-Ouest.</div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Mais
il faut toujours tenir en tête que la polarisation géographique
provient de la polarisation économique. Un diagnostic des activités
potentiellement motrices est essentiel.</div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Quant
aux lieux centraux, particulièrement dans le cas du Grand-Sud
d'Haïti, la localisation des pôles géographiques potentiels doit
tenir compte des marché publics ruraux.</div>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Il
faut considérer que la dynamique de polarisation doit tenir compte à
la fois des économies d'échelle, des économies de localisation et
des économies d'agglomération.</div>
<h3 class="western">
Régions programmes et redécoupage administratif</h3>
<div class="western" style="line-height: 100%; margin-bottom: 0.12in; text-align: justify;">
Les
considérations sur les régions polarisées et les régions
uniformes doivent mener les responsables à prendre des dispositions
en ce qui concerne les régions programme. La position actuelle du
Ministère de la Planification, position adoptée par le PSDH, de se
baser sur le découpage administratif actuel est regrettable. La
conception d'un plan d'aménagement du territoire en Haïti tirerait
profit d'un redécoupage des collectivités territorialesu<sup>2</sup>. Cela n'est
sans doute pas possible dans l'immédiat. Il faudrait alors, au
moins, des ententes entre les collectivités pour la planification et
la gestion des territoires-programmes (inter-communes et
inter-départements).<br />
____________________<br />
1- Voir la page: <a href="https://geographieconomique.blogspot.com/2018/03/classer-les-villes-selon-leur.html" target="_blank">Classer les villes selon leur population à l'aide de la distribution rang-taille</a>. <br />
2- Voir: J.F. Tardieu: <a href="https://drive.google.com/open?id=117oLcQk84QvWFXmNn7JJABPuyJ2Bhx9z" target="_blank">Le redécoupage territorial administratif, un impératif pour l'aménagement du territoire d'Haïti . In : <i>Aménagement du Territoire</i>. CRESFED / UNASUR, Port-au-Prince 2015</a><br />
<br />
<br />
<a href="https://www.youtube.com/watch?v=3GUl4kZW79g" target="_blank">VIDEO DE LA CONFERENCE EN CREOLE</a></div>
Jean-François Tardieuhttp://www.blogger.com/profile/01025349732771545315noreply@blogger.com21tag:blogger.com,1999:blog-6409212593755603984.post-6560333816892020442015-03-21T12:55:00.002-07:002015-04-21T13:05:17.583-07:00Travaux d'étudiants mars 2015<style type="text/css">p { margin-bottom: 0.1in; line-height: 120%; }</style>
<br />
<div style="line-height: 100%; margin-bottom: 0in; margin-left: 0.5in; text-indent: -0.38in;">
Travaux de groupe</div>
<ol>
<li>Discutez de la distribution des places centrales sur le territoire
haïtien. Document de base: <a href="https://drive.google.com/open?id=0B1Ll7ACjwbSaMDIzYWZmNWUtMWE0My00N2Q4LTk4YzQtODgzOWE5ZTg5MTE1&authuser=0">Pistes pour un Programme d'Aménagement du Territoire d'Haïti</a></li>
<li>
Faites un résumé de la théorie de localisation agricole de Von Thünen. Document de base: <a href="http://www.oecd.org/dataoecd/34/11/44112060.pdf"><i>"La conversion des terres agricoles: Dimension spatiale des politiques agricoles et d’aménagement du territoire</i></a>"</li>
<li>
Parlez le la localisation rurale des activités industrielles. Document de base: <a href="http://hal.archives-ouvertes.fr/docs/00/17/85/51/PDF/0303.pdf" target="_blank">Carl GAIGNÉ, Florence GOFFETTE-NAGOT : <i>Localisation rurale des activités industrielles. Que nous enseigne l’économie géographique ?</i></a></li>
<li>
Attraction urbaine: Critiquez le projet de "Boucle Centre-Artibonite" à la lumière de la loi d'attraction urbaine (avec calculs mathématiques). Document de base:<a href="http://atlas-caraibe.certic.unicaen.fr/fr/page-229.html">"La Boucle Centre-Artibonite: Un milliard de dollars pour tuer une région"</a></li>
<li>
Loi rang-taille. Documents de base: <a href="http://geographieconomique.blogspot.com/2013/06/09-loi-rang-taille-de-villes-haitiennes.html">Loi rang-taille des villes haïtiennes</a> et <a href="https://drive.google.com/open?id=0B1Ll7ACjwbSaSDBYQ0VpUEhzNnM&authuser=0">Redécouper le territoire.</a> Discutez de la répartition géographiques des places centrales dans les différentes régions d'Haïti.</li>
<li>Théorie des places centrales et application à Haïti. Documents de base: <a href="https://drive.google.com/open?id=0B1Ll7ACjwbSaOTg2OTVlYjMtZGI0Ni00ZTUyLThkMjktMmE0NzBjNmZlMjcy&authuser=0">"Entre bords-de-mers et marchés ruraux</a> et <a href="https://drive.google.com/open?id=0B1Ll7ACjwbSaSDBYQ0VpUEhzNnM&authuser=0">Redécouper le territoire.</a></li>
<li>
Polarisation département du Nord-Ouest. Document de base: <a href="https://drive.google.com/open?id=0B1Ll7ACjwbSadFBsTmgtT2JYYVU&authuser=0">Rapport pré-diagnostic Nord-Ouest</a>. Dites comment les régions uniformes et les régions polarisées ont été considérées pour proposer les régions programme.</li>
<li>Polarisation Grand-Sud d'Haïti. Documents du PSDH sur le Grand-Sud.</li>
<li>
Évolution de l'espace haïtien. <a href="https://www.youtube.com/watch?v=S2pXMnHQ6M0&list=PLyR1hxdj61pdC6FC1LcOxtCfliR9xf3M1&index=2">Géographie du développement</a>. et <a href="http://classiques.uqac.ca/contemporains/anglade_georges/atlas_critique_haiti/atlas_critique_haiti.pdf">Atlas critique d'Haïti</a>.</li>
<li>
Rôle des marchés publics haïtiens comme places centrales. Document de base: <a href="https://drive.google.com/open?id=0B1Ll7ACjwbSaOTg2OTVlYjMtZGI0Ni00ZTUyLThkMjktMmE0NzBjNmZlMjcy&authuser=0">"Entre bords-de-mers et marchés ruraux"</a></li>
<li>Aménager le territoire d'Haïti. Document de base: <a href="https://drive.google.com/open?id=0B1Ll7ACjwbSaMDIzYWZmNWUtMWE0My00N2Q4LTk4YzQtODgzOWE5ZTg5MTE1&authuser=0">Pistes pour un Programme d'Aménagement du Territoire d'Haïti</a></li>
<li>Politique d'organisation de l'espace. Discutez du document: <a href="https://drive.google.com/open?id=0B1Ll7ACjwbSaYmMwOTc0MTAtZTZhNS00ZmY1LWJmNTAtNjAzZDg1NzMxZjdm&authuser=0">La chance qui passe.</a></li>
</ol>
Jean-François Tardieuhttp://www.blogger.com/profile/01025349732771545315noreply@blogger.com0tag:blogger.com,1999:blog-6409212593755603984.post-87311616050670944052015-03-05T09:33:00.000-08:002019-12-20T16:09:26.994-08:0010- Pôles de développement<style type="text/css">p { margin-bottom: 0.1in; line-height: 120%; }</style>
<br />
<div style="text-align: justify;">
Le Plan Stratégique de Développement d'Haïti (PSDH) opte pour
un développement territorial polarisé. Le concept de pôle de
développement est malheureusement mal compris par les auteurs du
document. Cela conduit, comme pour la localisation industrielle à
des propositions concrètes très loin de l'optimum économique.</div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
Visionnez la présentation suivante qui essaie de faire succinctement le
point sur la question.<br />
<div class="separator" style="clear: both; text-align: center;">
<br /></div>
<iframe allowfullscreen="" class="YOUTUBE-iframe-video" data-thumbnail-src="https://i.ytimg.com/vi/MUoBNhhCi-I/0.jpg" frameborder="0" height="266" src="https://www.youtube.com/embed/MUoBNhhCi-I?feature=player_embedded" width="320"></iframe></div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
Allez aussi consulter le document suivant de Patrice Collignon qui
concerne les pôles ruraux.
</div>
<a href="http://www.unece.org/fileadmin/DAM/hlm/prgm/urbanenvperf/conference/tenth_bratislava/documents/topic2.10.collignon.f.pdf" target="_blank">Une approche polycentrique basée sur les pôles urbains et ruraux.</a><br />
<br />
<div style="line-height: 100%; margin-bottom: 0in;">
<br /></div>
<div style="line-height: 100%; margin-bottom: 0in;">
<b>Pour le cas haïtien,
consultez à nouveau :</b></div>
<div style="line-height: 100%; margin-bottom: 0in;">
<a href="https://drive.google.com/file/d/0B1Ll7ACjwbSacC0wVFB2cHV6S1U/view?usp=sharing" target="_blank">Le résumé du PSDH</a></div>
<div style="line-height: 100%; margin-bottom: 0in;">
</div>
<div style="line-height: 100%; margin-bottom: 0in;">
<br />
<a href="https://drive.google.com/open?id=1TszTvgpKuw8at1b_6eO_M03zxvL3I4hy" target="_blank">Les projets bancables pour la péninsule du Sud</a><br />
<br />
<a class="vm-video-title-content yt-uix-sessionlink" data-sessionlink="ei=gpdfVfD1NITt-gXQtIPwDw" href="https://www.youtube.com/watch?v=3GUl4kZW79g" target="_blank">Konferans "Amenajman teritwa Gran-Sid nan Plan Estratejik Devlopman Ayiti"</a> <br />
</div>
<div style="line-height: 100%; margin-bottom: 0in;">
<a href="https://geographieconomique.blogspot.com/2015/05/le-psdh-et-lamenagement-du-territoire.html" target="_blank">Le PSDH et l'aménagement du territoire du Grand-Sud d'Haïti: Adaptation française de la conférence prononcée le 8 avril 2015 aux Cayes.</a></div>
<div style="line-height: 100%; margin-bottom: 0in;">
<br /></div>
<div style="line-height: 100%; margin-bottom: 0in;">
<br /></div>
Jean-François Tardieuhttp://www.blogger.com/profile/01025349732771545315noreply@blogger.com31tag:blogger.com,1999:blog-6409212593755603984.post-64335962479398056072014-12-11T06:42:00.001-08:002014-12-11T06:42:20.307-08:00IMPORTANT: Cours du 12 décembre 2014Le vendredi 12 décembre 2014, les discussions porteront sur la théorie des places centrales.<br />
Les étudiants doivent visionner sur le blog les 2 exposés:<br />
<ul>
<li>celui concernant Walter Christaller et</li>
<li>celui concernant August Lösch.</li>
</ul>
Faites passer le message.Jean-François Tardieuhttp://www.blogger.com/profile/01025349732771545315noreply@blogger.com1tag:blogger.com,1999:blog-6409212593755603984.post-49579354068635971262014-10-25T16:53:00.002-07:002014-10-25T16:53:26.213-07:00Mise à jour du chapitre sur la localisation industrielleNotez que le texte du blog sur la localisation industrielle a été mis-à-jour.<br />
<br />
<span style="color: red;"><b>Donc, à reconsulter.</b></span>Jean-François Tardieuhttp://www.blogger.com/profile/01025349732771545315noreply@blogger.com7tag:blogger.com,1999:blog-6409212593755603984.post-58478140062160510392014-10-13T14:27:00.003-07:002016-01-24T13:08:15.282-08:00L'État isolé en francaisPour ceux que cela intéresse, voici un lien pour obtenir la traduction française du livre-maître de Von Thünen: "<b><i>L'État isolé</i></b>".<br />
<br />
Je jubile car, ne lisant pas l'allemand, j'utilisais la traduction anglaise.<br />
<br />
<br />
<a href="https://drive.google.com/file/d/0B1Ll7ACjwbSaTUwyQmRzc3NLSzA/view?usp=sharing" target="_blank"><b>L'État isolé</b></a>Jean-François Tardieuhttp://www.blogger.com/profile/01025349732771545315noreply@blogger.com0tag:blogger.com,1999:blog-6409212593755603984.post-90518777834796796872014-02-15T10:53:00.000-08:002019-02-08T14:29:06.844-08:00LOI RANG-TAILLE, PLACES CENTRALES et POLARISATION<a href="https://docs.google.com/presentation/d/1xFAry4jiK3Nbq9Ra1Vs191Oz-rcwigqaFCeLvc_NWXY/pub?start=false&loop=false&delayms=60000">Application combinée de la "loi" rang-taille, de la théorie des places centrales et du concept de polarisation:</a><br />
<ul>
<li><a href="https://docs.google.com/presentation/d/1xFAry4jiK3Nbq9Ra1Vs191Oz-rcwigqaFCeLvc_NWXY/pub?start=false&loop=false&delayms=60000">à l'étude de l'espace haïtien</a></li>
<li><a href="https://docs.google.com/presentation/d/1xFAry4jiK3Nbq9Ra1Vs191Oz-rcwigqaFCeLvc_NWXY/pub?start=false&loop=false&delayms=60000">et de la région du Nord-Ouest.</a></li>
</ul>
<a href="https://docs.google.com/presentation/d/1xFAry4jiK3Nbq9Ra1Vs191Oz-rcwigqaFCeLvc_NWXY/pub?start=false&loop=false&delayms=60000">https://docs.google.com/presentation/d/1xFAry4jiK3Nbq9Ra1Vs191Oz-rcwigqaFCeLvc_NWXY/pub?start=false&loop=false&delayms=60000</a>Jean-François Tardieuhttp://www.blogger.com/profile/01025349732771545315noreply@blogger.com3tag:blogger.com,1999:blog-6409212593755603984.post-21114163383271296772014-01-09T09:24:00.000-08:002014-01-17T06:48:37.180-08:00FAMV: Travail de groupe<style type="text/css">H2 { margin-bottom: 0.08in; }H2.western { font-family: "Arial",sans-serif; font-size: 14pt; font-style: italic; }H2.cjk { font-size: 14pt; font-style: italic; }H2.ctl { font-family: "Lohit Hindi"; font-size: 14pt; font-style: italic; }P { margin-bottom: 0.08in; text-align: justify; }</style>
<br />
<h2 class="western">
</h2>
<h2 class="western">
Groupe 1 : Géographie, outil de
développement économique et social</h2>
<ol>
<li>Faire un bref historique des théories de localisation, de
Von Thünen à Krugman.<br />
</li>
<li>Faire ressortir comment la géographie peut contribuer au
développement économique et social. Les réflexions seront
centrées sur le cas haïtien.<br />
</li>
<li>En particulier, montrer comment les modèles de localisation
des activités économiques peuvent servir la planification étatique
et la planification des entreprises.
</li>
</ol>
Il peut être très utile de consulter les documents suivants:<br />
<a href="http://region-developpement.univ-tln.fr/en/pdf/R6/R6_Thisse.pdf">THISSE, Jacques-François: "<i>L'oubli de l'espace dans la pensée économique"</i> </a><br />
<br />
<a href="http://siteresources.worldbank.org/INTWDR2009/Resources/4231006-1225840759068/Overview-French.pdf" target="_blank">Résumé du "Rapport sur le développement dans le monde 2009: Repenser la géographie économique." (Banque Mondiale).</a><br />
<ol>
</ol>
<h2 class="western">
Groupe 2 : Localisation agricole, Thünen</h2>
<ol>
<li>Compléter le contenu du blog qui résume le modèle de Von
Thünen.<br />
</li>
<li>Dire brièvement comment ce modèle peut aider à comprendre
la localisation de la production agricole et les politiques
agricoles.</li>
</ol>
Document de base à consulter:<br />
<a href="http://www.oecd.org/dataoecd/34/11/44112060.pdf"><i>OCDE: "La conversion des terres agricoles: Dimension spatiale des politiques agricoles et d’aménagement du territoire</i></a>"
<br />
<ol>
</ol>
<h2 class="western">
Groupe 3 : Localisation industrielle, Weber</h2>
<ol>
<li>Faire un résumé du modèle simplifié de Weber.<br />
</li>
<li>Expliquer pourquoi les industries s'installent le plus
souvent dans des agglomérations et dans quelles conditions elle
peuvent avoir intérêt à s'installer en milieu rural.</li>
</ol>
Document de base à consulter:<br />
<a href="http://hal.archives-ouvertes.fr/docs/00/17/85/51/PDF/0303.pdf" target="_blank">Carl GAIGNÉ, Florence GOFFETTE-NAGOT : <i>Localisation rurale des activités industrielles. Que nous enseigne l’économie géographique ?</i></a>
<br />
<ol>
</ol>
<h2 class="western">
Groupe 4 : Attraction urbaine, Reilly</h2>
<ol>
<li>Faire un résumé du modèle d'attraction urbaine de Reilly.<br />
</li>
<li>Appliquer le modèle à un cas haïtien.<br />
</li>
<li>En se basant sur le document « Boucle
Centre-Artibonite » dire comment ce modèle peut éviter de
commettre des erreurs graves en aménagement du territoire.<br />
</li>
</ol>
<h2 class="western">
Groupe 5 : Loi rang-taille, Zipf</h2>
<ol>
<li>Résumer la loi rang-taille dans un système urbain.<br />
</li>
<li>En examinant la distribution des agglomérations urbaines
haïtiennes selon leur population, dire quelles conclusions la loi
rang-taille permet de tirer.</li>
<li>Cartographier et examiner la répartition géographique des villes selon leur niveau.<br />
</li>
</ol>
<ol>
</ol>
<h2 class="western">
Groupe 6 : Théorie des places centrales,
Christaller</h2>
<ol>
<li>Résumer la théorie des places centrales de Christaller.<br />
</li>
<li>Dire comment cette théorie peut aider à concevoir des
politiques bien pensées de décentralisation.</li>
<li>A partir de la distribution des villes par niveaux à la lumière de la loi rang-taille, caractériser le réseau de villes haïtiennes selon les principes de Christaller.</li>
<li>Identifier les irrégularités régionales et discuter.<br />
</li>
</ol>
<h2 class="western">
Groupe 7 : Théorie des places centrales,
Lösch</h2>
<ol>
<li>Résumer l'approche de Lösch.</li>
<li>Faire ressortir les différences avec l'approche de Christaller.</li>
<li>Dire comment l'approche de Lösch permet de mieux affiner les
politiques de développement de la structure urbaine (comparaison
avec Christaller).</li>
<li>Analyser sommairement le PSDH à la lumière des particularités de l'approche de Lösch. </li>
</ol>
<h2 class="western">
Groupe 8 : Évolution de la structure
urbaine haïtienne</h2>
<ol>
<li>Résumer et expliquer les étapes d'évolution de la
structure urbaine haïtienne selon Anglade.<br />
</li>
<li>Expliquer comment cette théorie permet d'éviter des graves
erreurs dans la politique de décentralisation.<br />
</li>
</ol>
<h2 class="western">
Groupe 9 : Villes et Marchés publics en
Haïti</h2>
<ol>
<li>Expliquer comment le réseau de marchés publics a dû se
développer en relative indépendance avec la structure urbaine en
Haïti.<br />
</li>
<li>Dire pourquoi et comment prendre en considération le réseau
des marchés publics dans les politiques d'aménagement du
territoire.<br />
</li>
</ol>
<h2 class="western">
Groupe 10 : Pôles de développement et
aménagement du territoire</h2>
<ol>
<li>Expliquer le concept de pôle de développement en
distinguant pôle économique et pôle géographique.<br />
</li>
<li>Critiquer l'usage qui en est fait dans le Plan Stratégique
de Développement d'Haïti (PSDH).<br />
</li>
</ol>
Jean-François Tardieuhttp://www.blogger.com/profile/01025349732771545315noreply@blogger.com5tag:blogger.com,1999:blog-6409212593755603984.post-48659641578311113882013-06-22T12:19:00.001-07:002013-07-01T13:14:03.565-07:00Loi rang-taille des villes haïtiennes
<span style="font-size: small;">Voici le corrigé de l'exercice d'application de la loi rang-taille aux villes haïtiennes.</span><br />
<h2>
<span style="font-size: x-large;">Graphique des villes selon leur rang</span></h2>
Après avoir classé les villes selon leur population, le graphique suivant permet de mettre en évidence la relation entre le rang et la population des villes. À vue d'œil, on observe un alignement qui suit plus ou moins une pente régulière avec de temps à autre un saut vers le bas. Chacune des "marches" semble indiquer un niveau de centralité.<br />
<ol>
<li>Il y a <b>Port-au-Prince</b>, nettement à part. C'est une ville de <b>niveau 1</b>; la seule.</li>
<li>Le <b>Cap-Haïtien et Gonaïves</b> se retrouvent sur la 2ème "marche". Ce sont des villes de <b>2ème niveau.</b></li>
<li>Une rupture fait ressortir St-Marc, nettement moins populeuse que Gonaïves; à partir de là, une pente douce regroupe <b>6 villes</b> de même importance. C'est le <b>3ème niveau</b>.</li>
<li>Une autre rupture permet d'identifier un <b>4ème niveau</b> de villes. Elles sont au <b>nombre de 13</b>.</li>
<li>La "marche" suivante semble toute petite (4 petites villes). Elle semble plus représenter une sorte d'anomalie dans la régularité des ruptures (ou alors représenter une situation intermédiaire entre le 4ème et un 5ème niveau consistants).</li>
<li>Enfin, <b>toutes les autres plus petites villes</b> peuvent faire l'objet d'un seul grand regroupement; c'est le <b>5ème niveau</b>.</li>
</ol>
<div class="separator" style="clear: both; text-align: center;">
<a href="http://2.bp.blogspot.com/-wd2gOlRaWO0/UcV4GzE-IZI/AAAAAAAAALM/WQgyOXYTjxU/s1600/Rang-taille1.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="386" src="http://2.bp.blogspot.com/-wd2gOlRaWO0/UcV4GzE-IZI/AAAAAAAAALM/WQgyOXYTjxU/s640/Rang-taille1.png" width="640" /></a></div>
<h2>
<span style="font-size: x-large;">Calcul des seuils de rupture</span></h2>
Complétons le tableau avec:<br />
<ul>
<li>Dans la colonne F, le calcul de la population théorique de chaque ville à partir de la ville qui la précède dans le classement (P<span style="font-size: xx-small;">r</span> théorique = P<span style="font-size: xx-small;">(r-1)</span>observée * (r - 1) / r).</li>
<li>Dans la colonne G, le déficit de la population observée par rapport à la population théorique en % de la population observée: <div class="separator" style="clear: both; text-align: center;">
<a href="http://1.bp.blogspot.com/-vD9TJ2OWGMI/UcWXsobHnAI/AAAAAAAAALc/nFjdseAtvhg/s1600/EquationDeficitPopulation.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="http://1.bp.blogspot.com/-vD9TJ2OWGMI/UcWXsobHnAI/AAAAAAAAALc/nFjdseAtvhg/s1600/EquationDeficitPopulation.png" /></a></div>
</li>
<li>Dans la colonne H, le niveau de ville qui change quand le déficit mentionné dépasse 15%.</li>
</ul>
<div class="separator" style="clear: both; text-align: left;">
Le tableau devient:</div>
<div class="separator" style="clear: both; text-align: left;">
<a href="https://docs.google.com/spreadsheet/ccc?key=0AlLl7ACjwbSadEJCbzN3U2gyY21RbTNwaWpVaTAzVHc&usp=sharing">Loi_Rang_Taille_Haiti_2003</a></div>
<div class="separator" style="clear: both; text-align: left;">
</div>
<div class="separator" style="clear: both; text-align: left;">
</div>
<div class="separator" style="clear: both; text-align: left;">
<br /></div>
<div class="separator" style="clear: both; text-align: left;">
Le calcul des déficits confirme le visuel du graphique.</div>
<ul>
<li><div class="separator" style="clear: both; text-align: left;">
La population du Cap est trois fois moindre que la valeur théorique calculée à partir de Port-au-Prince. Donc, on passe au niveau 2 qui comprend aussi Gonaïves.</div>
</li>
<li><div class="separator" style="clear: both; text-align: left;">
St-Marc a un déficit de 40% en se basant sur Gonaïves qui la précède dans la hiérarchie. St-Marc initie donc le niveau 3. Au total 6 villes sont à ce niveau.</div>
</li>
<li><div class="separator" style="clear: both; text-align: left;">
Le déficit de Limbé est de 23%; on passe au 4ème niveau qui regroupe 13 villes.</div>
</li>
<li><div class="separator" style="clear: both; text-align: left;">
Enfin, Trou-du-Nord a un déficit de 15%, ce qui la porte au 5ème niveau avec toutes les autres petites villes (57).</div>
</li>
</ul>
<div class="separator" style="clear: both; text-align: left;">
Très proche de Trou-du-Nord, on observe une rupture notable entre Fort-Liberté et Mirebalais dont le déficit est de 14%. Il s'agit d'une situation particulière qui a probablement à voir avec le statut de Fort-Liberté comme Chef-Lieu du département du Nord-Est. Ce statut permet à Fort-Liberté de se détacher un peu de la courbe.</div>
<div class="separator" style="clear: both; text-align: left;">
<img border="0" height="386" src="http://2.bp.blogspot.com/-9Zm9jOORlGY/UcXpSEJJpII/AAAAAAAAAMg/WAO9WL-LhbY/s620/Rang_taille2.png" width="620" /></div>
<div class="separator" style="clear: both; text-align: left;">
L'examen de la distribution permet de remplir le tableau suivant:</div>
<div class="separator" style="clear: both; text-align: left;">
<br /></div>
<div align="center">
<table border="1" cellpadding="0" cellspacing="0" class="MsoNormalTable" style="border-collapse: collapse; border: currentColor; margin: auto auto auto 1.4pt; mso-border-alt: solid windowtext 1.5pt; mso-border-insideh: 1.5pt solid windowtext; mso-border-insidev: 1.5pt solid windowtext; mso-padding-alt: 1.4pt 1.4pt 1.4pt 1.4pt; mso-table-layout-alt: fixed; width: 655px;">
<tbody>
<tr style="height: 38.05pt; mso-yfti-firstrow: yes; mso-yfti-irow: 0;">
<td style="background: rgb(230, 230, 255); border: 1.5pt solid windowtext; height: 38.05pt; padding: 1.4pt; width: 45.05pt;" width="60"><div align="center" class="Contenudetableau" style="margin: 0in 0in 0pt; text-align: center;">
<span lang="FR">Niveau<o:p></o:p></span></div>
</td>
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<span lang="FR">Nombre de villes d'après la colonne H<o:p></o:p></span></div>
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<span lang="FR">Nombre de villes selon de principe de marché de Christaller<o:p></o:p></span></div>
</td>
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<span lang="FR">Nombre de villes selon le principe de transport de Christaller<o:p></o:p></span></div>
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<span lang="FR">Nombre de villes selon le principe administratif de Christaller<o:p></o:p></span></div>
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<span lang="FR">1<o:p></o:p></span></div>
</td>
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<span lang="FR">1<o:p></o:p></span></div>
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<td style="background-color: transparent; border-color: rgb(0, 0, 0) windowtext windowtext rgb(0, 0, 0); border-style: none solid solid none; border-width: 0px 1.5pt 1.5pt 0px; height: 14.8pt; mso-border-left-alt: solid windowtext 1.5pt; mso-border-top-alt: solid windowtext 1.5pt; padding: 1.4pt; width: 116.8pt;" width="156"><div align="center" class="Contenudetableau" style="margin: 0in 0in 0pt; text-align: center;">
<span lang="FR">1<o:p></o:p></span></div>
</td>
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<span lang="FR">1<o:p></o:p></span></div>
</td>
<td style="background-color: transparent; border-color: rgb(0, 0, 0) windowtext windowtext rgb(0, 0, 0); border-style: none solid solid none; border-width: 0px 1.5pt 1.5pt 0px; height: 14.8pt; mso-border-left-alt: solid windowtext 1.5pt; mso-border-top-alt: solid windowtext 1.5pt; padding: 1.4pt; width: 125.05pt;" width="167"><div align="center" class="Contenudetableau" style="margin: 0in 0in 0pt; text-align: center;">
<span lang="FR">1<o:p></o:p></span></div>
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<span lang="FR">2<o:p></o:p></span></div>
</td>
<td style="background-color: transparent; border-color: rgb(0, 0, 0) windowtext windowtext rgb(0, 0, 0); border-style: none solid solid none; border-width: 0px 1.5pt 1.5pt 0px; height: 14.8pt; mso-border-left-alt: solid windowtext 1.5pt; mso-border-top-alt: solid windowtext 1.5pt; padding: 1.4pt; width: 81.3pt;" width="108"><div align="center" class="Contenudetableau" style="margin: 0in 0in 0pt; text-align: center;">
<span lang="FR">2<o:p></o:p></span></div>
</td>
<td style="background-color: transparent; border-color: rgb(0, 0, 0) windowtext windowtext rgb(0, 0, 0); border-style: none solid solid none; border-width: 0px 1.5pt 1.5pt 0px; height: 14.8pt; mso-border-left-alt: solid windowtext 1.5pt; mso-border-top-alt: solid windowtext 1.5pt; padding: 1.4pt; width: 116.8pt;" width="156"><div align="center" class="Contenudetableau" style="margin: 0in 0in 0pt; text-align: center;">
<span lang="FR">2<o:p></o:p></span></div>
</td>
<td style="background-color: transparent; border-color: rgb(0, 0, 0) windowtext windowtext rgb(0, 0, 0); border-style: none solid solid none; border-width: 0px 1.5pt 1.5pt 0px; height: 14.8pt; mso-border-left-alt: solid windowtext 1.5pt; mso-border-top-alt: solid windowtext 1.5pt; padding: 1.4pt; width: 122.8pt;" width="164"><div align="center" class="Contenudetableau" style="margin: 0in 0in 0pt; text-align: center;">
<span lang="FR">3<o:p></o:p></span></div>
</td>
<td style="background-color: transparent; border-color: rgb(0, 0, 0) windowtext windowtext rgb(0, 0, 0); border-style: none solid solid none; border-width: 0px 1.5pt 1.5pt 0px; height: 14.8pt; mso-border-left-alt: solid windowtext 1.5pt; mso-border-top-alt: solid windowtext 1.5pt; padding: 1.4pt; width: 125.05pt;" width="167"><div align="center" class="Contenudetableau" style="margin: 0in 0in 0pt; text-align: center;">
<span lang="FR">6<o:p></o:p></span></div>
</td>
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<tr style="height: 14.8pt; mso-yfti-irow: 3;">
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<span lang="FR">3<o:p></o:p></span></div>
</td>
<td style="background-color: transparent; border-color: rgb(0, 0, 0) windowtext windowtext rgb(0, 0, 0); border-style: none solid solid none; border-width: 0px 1.5pt 1.5pt 0px; height: 14.8pt; mso-border-left-alt: solid windowtext 1.5pt; mso-border-top-alt: solid windowtext 1.5pt; padding: 1.4pt; width: 81.3pt;" width="108"><div align="center" class="Contenudetableau" style="margin: 0in 0in 0pt; text-align: center;">
<span lang="FR">6<o:p></o:p></span></div>
</td>
<td style="background-color: transparent; border-color: rgb(0, 0, 0) windowtext windowtext rgb(0, 0, 0); border-style: none solid solid none; border-width: 0px 1.5pt 1.5pt 0px; height: 14.8pt; mso-border-left-alt: solid windowtext 1.5pt; mso-border-top-alt: solid windowtext 1.5pt; padding: 1.4pt; width: 116.8pt;" width="156"><div align="center" class="Contenudetableau" style="margin: 0in 0in 0pt; text-align: center;">
<span lang="FR">6<o:p></o:p></span></div>
</td>
<td style="background-color: transparent; border-color: rgb(0, 0, 0) windowtext windowtext rgb(0, 0, 0); border-style: none solid solid none; border-width: 0px 1.5pt 1.5pt 0px; height: 14.8pt; mso-border-left-alt: solid windowtext 1.5pt; mso-border-top-alt: solid windowtext 1.5pt; padding: 1.4pt; width: 122.8pt;" width="164"><div align="center" class="Contenudetableau" style="margin: 0in 0in 0pt; text-align: center;">
<span lang="FR">12<o:p></o:p></span></div>
</td>
<td style="background-color: transparent; border-color: rgb(0, 0, 0) windowtext windowtext rgb(0, 0, 0); border-style: none solid solid none; border-width: 0px 1.5pt 1.5pt 0px; height: 14.8pt; mso-border-left-alt: solid windowtext 1.5pt; mso-border-top-alt: solid windowtext 1.5pt; padding: 1.4pt; width: 125.05pt;" width="167"><div align="center" class="Contenudetableau" style="margin: 0in 0in 0pt; text-align: center;">
<span lang="FR">42<o:p></o:p></span></div>
</td>
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<tr style="height: 14.8pt; mso-yfti-irow: 4;">
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<span lang="FR">4<o:p></o:p></span></div>
</td>
<td style="background-color: transparent; border-color: rgb(0, 0, 0) windowtext windowtext rgb(0, 0, 0); border-style: none solid solid none; border-width: 0px 1.5pt 1.5pt 0px; height: 14.8pt; mso-border-left-alt: solid windowtext 1.5pt; mso-border-top-alt: solid windowtext 1.5pt; padding: 1.4pt; width: 81.3pt;" width="108"><div align="center" class="Contenudetableau" style="margin: 0in 0in 0pt; text-align: center;">
<span lang="FR">13<o:p></o:p></span></div>
</td>
<td style="background-color: transparent; border-color: rgb(0, 0, 0) windowtext windowtext rgb(0, 0, 0); border-style: none solid solid none; border-width: 0px 1.5pt 1.5pt 0px; height: 14.8pt; mso-border-left-alt: solid windowtext 1.5pt; mso-border-top-alt: solid windowtext 1.5pt; padding: 1.4pt; width: 116.8pt;" width="156"><div align="center" class="Contenudetableau" style="margin: 0in 0in 0pt; text-align: center;">
<span lang="FR">18<o:p></o:p></span></div>
</td>
<td style="background-color: transparent; border-color: rgb(0, 0, 0) windowtext windowtext rgb(0, 0, 0); border-style: none solid solid none; border-width: 0px 1.5pt 1.5pt 0px; height: 14.8pt; mso-border-left-alt: solid windowtext 1.5pt; mso-border-top-alt: solid windowtext 1.5pt; padding: 1.4pt; width: 122.8pt;" width="164"><div align="center" class="Contenudetableau" style="margin: 0in 0in 0pt; text-align: center;">
<span lang="FR">48<o:p></o:p></span></div>
</td>
<td style="background-color: transparent; border-color: rgb(0, 0, 0) windowtext windowtext rgb(0, 0, 0); border-style: none solid solid none; border-width: 0px 1.5pt 1.5pt 0px; height: 14.8pt; mso-border-left-alt: solid windowtext 1.5pt; mso-border-top-alt: solid windowtext 1.5pt; padding: 1.4pt; width: 125.05pt;" width="167"><div align="center" class="Contenudetableau" style="margin: 0in 0in 0pt; text-align: center;">
<span lang="FR">294<o:p></o:p></span></div>
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<td style="background-color: transparent; border-color: rgb(0, 0, 0) windowtext windowtext; border-style: none solid solid; border-width: 0px 1.5pt 1.5pt; height: 14.8pt; mso-border-top-alt: solid windowtext 1.5pt; padding: 1.4pt; width: 45.05pt;" width="60"><div align="center" class="Contenudetableau" style="margin: 0in 0in 0pt; text-align: center;">
<span lang="FR">5<o:p></o:p></span></div>
</td>
<td style="background-color: transparent; border-color: rgb(0, 0, 0) windowtext windowtext rgb(0, 0, 0); border-style: none solid solid none; border-width: 0px 1.5pt 1.5pt 0px; height: 14.8pt; mso-border-left-alt: solid windowtext 1.5pt; mso-border-top-alt: solid windowtext 1.5pt; padding: 1.4pt; width: 81.3pt;" width="108"><div align="center" class="Contenudetableau" style="margin: 0in 0in 0pt; text-align: center;">
<span lang="FR">57<o:p></o:p></span></div>
</td>
<td style="background-color: transparent; border-color: rgb(0, 0, 0) windowtext windowtext rgb(0, 0, 0); border-style: none solid solid none; border-width: 0px 1.5pt 1.5pt 0px; height: 14.8pt; mso-border-left-alt: solid windowtext 1.5pt; mso-border-top-alt: solid windowtext 1.5pt; padding: 1.4pt; width: 116.8pt;" width="156"><div align="center" class="Contenudetableau" style="margin: 0in 0in 0pt; text-align: center;">
<span lang="FR">54<o:p></o:p></span></div>
</td>
<td style="background-color: transparent; border-color: rgb(0, 0, 0) windowtext windowtext rgb(0, 0, 0); border-style: none solid solid none; border-width: 0px 1.5pt 1.5pt 0px; height: 14.8pt; mso-border-left-alt: solid windowtext 1.5pt; mso-border-top-alt: solid windowtext 1.5pt; padding: 1.4pt; width: 122.8pt;" width="164"><div align="center" class="Contenudetableau" style="margin: 0in 0in 0pt; text-align: center;">
<span lang="FR">192<o:p></o:p></span></div>
</td>
<td style="background-color: transparent; border-color: rgb(0, 0, 0) windowtext windowtext rgb(0, 0, 0); border-style: none solid solid none; border-width: 0px 1.5pt 1.5pt 0px; height: 14.8pt; mso-border-left-alt: solid windowtext 1.5pt; mso-border-top-alt: solid windowtext 1.5pt; padding: 1.4pt; width: 125.05pt;" width="167"><div align="center" class="Contenudetableau" style="margin: 0in 0in 0pt; text-align: center;">
<span lang="FR">2058<o:p></o:p></span></div>
</td>
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</tbody></table>
</div>
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Les données semblent donc indiquer que la structure urbaine haïtienne obéit au principe de marché de Christaller.</div>
Jean-François Tardieuhttp://www.blogger.com/profile/01025349732771545315noreply@blogger.com23tag:blogger.com,1999:blog-6409212593755603984.post-13748432903087260592012-04-28T12:21:00.000-07:002019-12-20T16:48:59.104-08:00Le Comité Interministériel d'Aménagement du Territoire (CIAT) persiste dans l'erreur<br />
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L'article de John Smith Sanon «<a href="https://lenouvelliste.com/article/104395/cfi-faciliter-linvestissement-dans-le-centre"> CFI:faciliter l'investissement dans le Centre </a>» daté du 25
Avril 2012 publié sur le site de <i>Le Nouvelliste</i> a retenu mon
attention.</div>
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<br /></div>
<div style="margin-bottom: 0in; text-align: justify;">
J'attire à mon tour l'attention sur
une dérive dans laquelle persiste le Comité Interministériel
d'Aménagement du Territoire (CIAT). Le CIAT entraîne dans cette
dérive la Chambre de commerce et d'industrie d’Haïti (CCIH), la
Banque centrale (BRH), la Banque inter-américaine de développement
(BID), les pouvoirs locaux des collectivités territoriales. Il
entraîne aussi –plus important peut-être– le Centre de
facilitation des investissements (CFI) qui a la lourde responsabilité
non seulement de faciliter les investissements mais de les guider.</div>
<div style="margin-bottom: 0in; text-align: justify;">
<br /></div>
<div style="margin-bottom: 0in; text-align: justify;">
Un développement équilibré,
équitable et durable ne peut faire l'économie d'une vision
territoriale claire qui tienne compte de la réalité dans toute sa
complexité. Malheureusement, le CIAT part d'une perspective
imaginaire de l'existant pour présenter une vision tout à fait
chimérique de l'aménagement du territoire. Le CIAT fourvoie dans
son errance les institutions du secteur privé. C'est une énorme
responsabilité pour une institution étatique de mal diriger des
investisseurs dans un pays « <span lang="en-US">ready for
business</span> ». Je réfère le lecteur à mon article publié
dans l'Atlas Caraïbe: «<a href="https://atlas-caraibe.certic.unicaen.fr/fr/page-229.html"> La boucle "Centre-Artibonite".Un milliard de dollars pour tuer une région</a> ».</div>
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<br /></div>
<div style="margin-bottom: 0in; text-align: justify;">
Le CIAT est-il un gouvernement à lui
seul ? Il devrait être un chef d'orchestre qui s'assure d'une
harmonie de toutes les instances de l'État en matière d'aménagement
du territoire. Comment se fait-il alors que les réflexions de ce
comité et celles du Ministère de la Planification soient
développées de façon tout à fait autonomiques ?</div>
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<br /></div>
<div style="margin-bottom: 0in; text-align: justify;">
Le MPCE a en effet mis en débat public
son <a href="https://drive.google.com/open?id=1DjjTQW2qbLUr8en3Dx9nms1KYQgeTqYM">Plan Stratégique pour le Développement d'Haïti (PSDH)</a>,
document dont la facture révèle un certain professionnalisme.
Pendant ce temps, le CIAT fait la promotion d'un plan qui n'a rien à
voir avec le PSDH et qui n'est sérieux que par les conséquences
néfastes qui risquent d'en découler. Tout se passe comme si l'Unité
d'Aménagement du Territoire du MPCE et le CIAT recevaient leurs
fonds de sources différentes et devaient par conséquent satisfaire
la fantaisie de bailleurs distincts !</div>
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<br /></div>
<div style="margin-bottom: 0in; text-align: justify;">
On ne peut continuer à admettre que
les fonds destinés au progrès d'Haïti continuent à être non
seulement gaspillés mais en plus à servir contre Haïti et ceux qui
veulent se risquer à y investir.</div>
Jean-François Tardieuhttp://www.blogger.com/profile/01025349732771545315noreply@blogger.com20tag:blogger.com,1999:blog-6409212593755603984.post-57676293755522378212012-03-09T15:52:00.000-08:002019-12-20T16:36:59.647-08:00MondialisationPour le cours sur la mondialisation, téléchargez la diapo. <br />
<a href="https://docs.google.com/open?id=0B1Ll7ACjwbSaV18wTExHeGxUVGEyT3FaTm90bzJGdw">Format PDF</a> <a href="https://docs.google.com/open?id=0B1Ll7ACjwbSaZVpaSzAzTEtSU2FzUjgzREl4Z1BSQQ">Format LibreOffice Impress</a><br />
<br />
Voir aussi<br />
<a href="http://aubel.online.fr/GEO/monde/COURS_Logiques_organisation_espace_mondial_CA.pdf">Le Processus de mondialisation et les autres logiques d'organisation de l'espace mondial</a><br />
<br />
et aussi le texte (bien qu'à caractère sociologique) de Guy Rocher: <br />
<a href="https://depot.erudit.org/retrieve/2842/0046.pdf"><i>La mondialisation: un phénomène pluriel</i></a><br />
<br />
A lire l'analyse critique : <br />
<a href="https://drive.google.com/open?id=1tSjJYV6aSyoR4nzVHD_qzr_pK45cQShM">VladimirKOLOSSOV: <i>La mondialisation comme processus spatio-temporel dans les pays à économie de transition</i></a><br />
<br />
<i> </i>Pour ceux qui sont <b>très</b> intéressés, le texte de la CEPALC:<br />
<a href="https://repositorio.cepal.org/bitstream/handle/11362/2418/1/S2005999_fr.pdf"><i>Mondialisation et développement Un regard de l'Amérique latine et des Caraïbes</i></a>Jean-François Tardieuhttp://www.blogger.com/profile/01025349732771545315noreply@blogger.com12tag:blogger.com,1999:blog-6409212593755603984.post-72629368997836532332012-03-04T09:45:00.004-08:002018-03-21T12:21:52.493-07:009- Les places centrales haïtiennes: Villes et marchés publics<h2>
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</style>Évolution contradictoire de l'espace haïtien </h2>
De l'époque coloniale au XXIe siècle, l'espace économique haïtien a subi trois mutations. Quatre stades donc dans son évolution. Cette évolution a entraîné des changements dans le fonctionnement dualiste de la société : <br />
<ol>
<li>Les places à vivre et les marchés de nègres sont une réponse à la plantation coloniale et au morcellement.</li>
<li>Les lakous du XIXe siècle sont une réponse aux oligarchies régionales.</li>
<li>Les "bourg-jardins"sont une réponse à la centralisation.</li>
<li>Les "Nouvelles Provinces" appuyés par la diaspora sont une réponse à la métropolisation.</li>
</ol>
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Documents à consulter :<br />
<div style="margin-bottom: 0in;">
Tardieu, Jean-François : </div>
<ul>
<li><a href="https://drive.google.com/open?id=0B1Ll7ACjwbSaOTg2OTVlYjMtZGI0Ni00ZTUyLThkMjktMmE0NzBjNmZlMjcy" target="_blank">Entre bords de mer et marchés ruraux</a></li>
</ul>
<ul>
<li><a href="http://www.blogger.com/goog_278750336"> </a><a href="http://atlas-caraibe.certic.unicaen.fr/fr/page-229.html" target="_blank">La " Boucle Centre-Artibonite ", Un milliard de dollars pour tuer une région.</a></li>
</ul>
<div style="margin-bottom: 0in;">
<a href="http://www.blogger.com/blogger.g?blogID=6409212593755603984" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><a href="http://www.blogger.com/blogger.g?blogID=6409212593755603984" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><a href="http://www.blogger.com/blogger.g?blogID=6409212593755603984" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><a href="http://www.blogger.com/blogger.g?blogID=6409212593755603984" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><a href="http://www.blogger.com/blogger.g?blogID=6409212593755603984" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a></div>
<h2 class="western">
Distribution des villes</h2>
<div style="margin-bottom: 0in;">
<a href="https://drive.google.com/open?id=0B1Ll7ACjwbSaYzE5YmZhOGQtOTJhOS00MWZiLTkzOTctMTc0MGEyNjE3Mzlm" target="_blank">Dans la feuille de calcul sur les villes haïtiennes (tableur LibreOffice)</a>, </div>
<ol>
<li><div style="margin-bottom: 0in;">
Classez les villes de la plus grande à la plus petite.</div>
</li>
<li><div style="margin-bottom: 0in;">
Organisez le tableur avec :</div>
</li>
</ol>
<ul>
<li><div style="margin-bottom: 0in;">
Dans la colonne A, le nom de la ville</div>
</li>
<li><div style="margin-bottom: 0in;">
Dans la colonne B, son rang (écrivez le rang pour chaque ville)</div>
</li>
<li><div style="margin-bottom: 0in;">
Dans la colonne C, sa population</div>
</li>
<li><div style="margin-bottom: 0in;">
Dans la colonne D, inscrivez le logarithme du rang</div>
</li>
<li><div style="margin-bottom: 0in;">
Dans la colonne E, le logarithme de la population</div>
</li>
</ul>
<ol start="3">
<li><div style="margin-bottom: 0in;">
Faites tracer un diagramme en XY (dispersion) avec log(rang) et log(population)</div>
</li>
<li><div style="margin-bottom: 0in;">
Observez à l’œil sur le diagramme les irrégularités dans la distribution et essayez de regrouper les villes haïtiennes par niveau.</div>
</li>
</ol>
<div style="margin-bottom: 0in;">
<br /></div>
<div style="margin-bottom: 0in;">
Ensuite, vous allez faire l'exercice de regrouper ces villes par niveaux à partir d'un seuil de rupture. Pour vous aider, vous vous basez sur la loi rang-taille avec b=1.</div>
<div style="margin-bottom: 0in;">
<br />
Soit P<sub>r</sub> la population de la ville de rang r. Si la loi rang-taille était parfaitement respectée, on aurait :<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="http://4.bp.blogspot.com/-gQO7ixvg06c/URLBqH3PxDI/AAAAAAAAAFs/uep6wmJcw2M/s1600/eq_1.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://4.bp.blogspot.com/-gQO7ixvg06c/URLBqH3PxDI/AAAAAAAAAFs/uep6wmJcw2M/s1600/eq_1.png" /></a></div>
<br />
donc,</div>
<br />
<div style="margin-bottom: 0in;">
<div class="separator" style="clear: both; text-align: center;">
<a href="http://3.bp.blogspot.com/-51zBVRj2InY/URLB9XiHAKI/AAAAAAAAAF0/ukBL9T0kebU/s1600/eq_2.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://3.bp.blogspot.com/-51zBVRj2InY/URLB9XiHAKI/AAAAAAAAAF0/ukBL9T0kebU/s1600/eq_2.png" /></a></div>
et</div>
<a href="http://4.bp.blogspot.com/-1gEdbapmj_U/URLCVOiXC-I/AAAAAAAAAF8/IdrCirCkQXA/s1600/eq_3.png" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="99" src="https://4.bp.blogspot.com/-1gEdbapmj_U/URLCVOiXC-I/AAAAAAAAAF8/IdrCirCkQXA/s320/eq_3.png" width="320" /></a><br />
<ol start="5">
<li><div style="margin-bottom: 0in;">
Dans la colonne F, calculez le P<sub>r</sub> théorique à partir de la formule précédente (la population théorique de Port-au-Prince est la même que la population observée). Pour les autres villes, par exemple, pour Gonaïves (rang 3), la population théorique est la population du Cap-Haïtien (rang 2) multipliée par 2 et divisée par 3.</div>
</li>
</ol>
<div style="margin-bottom: 0in;">
Pour déterminer les points de rupture, comparez P<sub>r</sub> observé (colonne C) et P<sub>r</sub> théorique calculé à partir de P<sub>r-1</sub> (colonne F).</div>
<div style="margin-bottom: 0in;">
La différence entre ces 2 valeurs rapportée à la population observée, P<sub>r</sub>, permet de déterminer des seuils de rupture dans la distribution des villes.</div>
<ol start="6">
<li><div style="margin-bottom: 0in;">
Dans la colonne G, calculez<sub>:</sub></div>
<a href="http://1.bp.blogspot.com/-0sqDnAgNbfo/URLGzggFHwI/AAAAAAAAAGE/qJl36Tc9who/s1600/eq_4.png" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://1.bp.blogspot.com/-0sqDnAgNbfo/URLGzggFHwI/AAAAAAAAAGE/qJl36Tc9who/s1600/eq_4.png" /></a></li>
<li><div style="margin-bottom: 0in;">
Formatez la colonne G en %.</div>
</li>
<li><div style="margin-bottom: 0in;">
Dans la colonne H, vous allez mettre le niveau des villes (mettez 1 pour Port-au-Prince).</div>
</li>
<li><div style="margin-bottom: 0in;">
Si la population théorique d'une ville dépasse d'au mois 15% la population observée, classez cette ville à un niveau inférieur.</div>
</li>
</ol>
<div style="margin-bottom: 0in;">
A quel rang classez-vous le Cap-Haïtien, Gonaïves, Saint-Marc?</div>
<div style="margin-bottom: 0in;">
Combien de niveaux avez-vous déterminé?</div>
<div style="margin-bottom: 0in;">
Remplissez ce tableau :</div>
<table cellpadding="4" cellspacing="0" style="width: 665px;"><colgroup><col width="49"></col> <col width="117"></col> <col width="150"></col> <col width="149"></col> <col width="158"></col> </colgroup><tbody>
<tr valign="TOP"> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: 1px solid #000000; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0.04in;" width="49">Niveau</td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: 1px solid #000000; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0.04in;" width="117">Nombre de villes d'après la colonne H</td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: 1px solid #000000; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0.04in;" width="150">Nombre de villes selon de principe de marché de Christaller</td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: 1px solid #000000; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0.04in;" width="149">Nombre de villes selon le principe de transport de Christaller</td> <td style="border: 1px solid #000000; padding: 0.04in;" width="158">Nombre de villes selon le principe administratif de Christaller</td> </tr>
<tr valign="TOP"> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0in;" width="49">1</td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0in;" width="117"><br />
<br /></td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0in;" width="150"><br />
<br /></td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0in;" width="149"><br />
<br /></td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: 1px solid #000000; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0.04in; padding-top: 0in;" width="158"><br />
<br /></td> </tr>
<tr valign="TOP"> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0in;" width="49"><br />
<br /></td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0in;" width="117"><br />
<br /></td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0in;" width="150"><br />
<br /></td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0in;" width="149"><br />
<br /></td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: 1px solid #000000; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0.04in; padding-top: 0in;" width="158"><br />
<br /></td> </tr>
<tr valign="TOP"> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0in;" width="49"><br />
<br /></td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0in;" width="117"><br />
<br /></td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0in;" width="150"><br />
<br /></td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0in;" width="149"><br />
<br /></td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: 1px solid #000000; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0.04in; padding-top: 0in;" width="158"><br />
<br /></td> </tr>
<tr valign="TOP"> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0in;" width="49"><br />
<br /></td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0in;" width="117"><br />
<br /></td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0in;" width="150"><br />
<br /></td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0in;" width="149"><br />
<br /></td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: 1px solid #000000; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0.04in; padding-top: 0in;" width="158"><br />
<br /></td> </tr>
<tr valign="TOP"> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0in;" width="49"><br />
<br /></td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0in;" width="117"><br />
<br /></td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0in;" width="150"><br />
<br /></td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0in;" width="149"><br />
<br /></td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: 1px solid #000000; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0.04in; padding-top: 0in;" width="158"><br />
<br /></td> </tr>
<tr valign="TOP"> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0in;" width="49"><br />
<br /></td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0in;" width="117"><br />
<br /></td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0in;" width="150"><br />
<br /></td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0in;" width="149"><br />
<br /></td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: 1px solid #000000; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0.04in; padding-top: 0in;" width="158"><br />
<br /></td> </tr>
<tr valign="TOP"> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0in;" width="49"><br />
<br /></td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0in;" width="117"><br />
<br /></td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0in;" width="150"><br />
<br /></td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: none; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0in; padding-top: 0in;" width="149"><br />
<br /></td> <td style="border-bottom: 1px solid #000000; border-left: 1px solid #000000; border-right: 1px solid #000000; border-top: none; padding-bottom: 0.04in; padding-left: 0.04in; padding-right: 0.04in; padding-top: 0in;" width="158"><br />
<br /></td> </tr>
</tbody></table>
<div style="margin-bottom: 0in;">
<br /></div>
<div style="margin-bottom: 0in;">
Comparez les résultats du nombre de villes par niveau observé aux nombres de villes par niveau selon les 3 principes de Christaller. </div>
<div style="margin-bottom: 0in;">
<br /></div>
<div style="margin-bottom: 0in;">
<br /></div>
Jean-François Tardieuhttp://www.blogger.com/profile/01025349732771545315noreply@blogger.com27tag:blogger.com,1999:blog-6409212593755603984.post-3071156861279024802012-03-04T09:16:00.002-08:002019-12-20T16:02:22.828-08:008- Évolution de l'espace haïtien<h2>
<style type="text/css">
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</style> Évolution de l'espace haïtien</h2>
<h1 class="western">
</h1>
<div style="margin-bottom: 0in;">
Pour étudier l''évolution de l'espace haïtien, nous nous basons essentiellement sur les travaux de George Anglade.<br />
<br />
<div class="separator" style="clear: both; text-align: center;">
<iframe allowfullscreen="" class="YOUTUBE-iframe-video" data-thumbnail-src="https://i.ytimg.com/vi/u5IQL4llt4Y/0.jpg" frameborder="0" height="266" src="https://www.youtube.com/embed/u5IQL4llt4Y?feature=player_embedded" width="320"></iframe></div>
</div>
<div style="margin-bottom: 0in;">
<br /></div>
<div style="margin-bottom: 0in;">
Si vous ne l'avez toujours pas fait, téléchargez les documents suivants qui sont de consultation <b>obligatoire (l'examen final peut aborder n'importe quel élément contenu dans ces documents) </b>:</div>
<div style="margin-bottom: 0in;">
<br /></div>
<div style="margin-bottom: 0in;">
<a href="http://classiques.uqac.ca/contemporains/anglade_georges/atlas_critique_haiti/atlas_critique_haiti.pdf">George Anglade : Atlas critiqued'Haïti</a></div>
<div style="margin-bottom: 0in;">
<br /></div>
<div style="margin-bottom: 0in;">
<br /></div>
<div style="margin-bottom: 0in;">
Dans l'Atlas critique d'Haïti, vous devez bien étudier les 3 premières planches :</div>
<div style="margin-bottom: 0in;">
Planche 1 : L'espace morcelé 1664-1803</div>
<div style="margin-bottom: 0in;">
Planche 2 : L'espace régionalisé 1804-1915</div>
<div style="margin-bottom: 0in;">
Planche 3 : L'espace centralisé 1915-1980</div>
<div style="margin-bottom: 0in;">
<br /></div>
<div style="margin-bottom: 0in;">
<br /></div>
<div style="margin-bottom: 0in;">
<a href="https://docs.google.com/open?id=0B1Ll7ACjwbSaMmU1MzkwNWEtZjNjYS00NDI2LTgxZWQtMjU3OGJkYzdkYWU5">Jean-François Tardieu : Lesmots pour dire, in Anglade, Georges : Cartes sur table Volume2, ERCE, Montréal 1990</a></div>
<div style="margin-bottom: 0in;">
<br /></div>
<div style="margin-bottom: 0in;">
Lisez la première « livraison » qui concerne l'atlas d'Anglade.</div>
<div style="margin-bottom: 0in;">
<br /></div>
<div style="margin-bottom: 0in;">
Visionnez à nouveau l'animation :</div>
<div style="margin-bottom: 0in;">
<a href="https://www.youtube.com/watch?v=S2pXMnHQ6M0&list=PLyR1hxdj61pdC6FC1LcOxtCfliR9xf3M1&index=4&t=1315s">Géographie du développement.</a> Portez votre attention sur la partie qui concerne l'évolution de l'espace.</div>
<div style="margin-bottom: 0in;">
<br /></div>
<div style="margin-bottom: 0in;">
Enfin, le manifeste politique du « mouvement Lavalas » à ses début doit être consulté. Même si les idées qui y sont présentes ont été évacuées (en partie pour n'avoir pas été comprises), ce manifeste montre comment la perspective géographique peut conduire à la conception d'un projet politique de transformation de la société.</div>
<div style="margin-bottom: 0in;">
Téléchargez donc :</div>
<div style="margin-bottom: 0in;">
<a href="https://docs.google.com/open?id=0B1Ll7ACjwbSaYmMwOTc0MTAtZTZhNS00ZmY1LWJmNTAtNjAzZDg1NzMxZjdm">La chance qui passe.</a></div>
Jean-François Tardieuhttp://www.blogger.com/profile/01025349732771545315noreply@blogger.com19tag:blogger.com,1999:blog-6409212593755603984.post-56508500108123754062012-02-23T18:59:00.000-08:002017-09-04T13:05:52.302-07:007-Places centrales avec August Lösch<div style="text-align: justify;">
August Lösch a apporté un nouvel éclairage à la théorie des places centrales. Il a en plus abordé la problématique de la localisation des activités économiques en général. Y compris les questions de l'identité nationale et de l'impact du progrès technologique sur le raccourcissement des distances économiques.</div>
<br />
<div class="separator" style="clear: both; text-align: center;">
<br /><iframe width="320" height="266" class="YOUTUBE-iframe-video" data-thumbnail-src="https://i.ytimg.com/vi/MEddIAfLBac/0.jpg" src="https://www.youtube.com/embed/MEddIAfLBac?feature=player_embedded" frameborder="0" allowfullscreen></iframe></div>
<br />
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
Dans une œuvre originale, Lösch s’est donc penché sur l’ensemble de la problématique de localisation des activités économique. Les réflexions sur les réseaux urbains (places centrales) ne sont donc qu’une partie de sa réflexion.</div>
<div style="text-align: justify;">
<br />
Les régions économiques font suite au traitements des problèmes de localisation industrielle et agricole. Ces problèmes de localisation, Lösch les traite en tenant compte des acquis de Weber et de Thünen, chacun en ce qui le concerne. </div>
<div style="text-align: justify;">
<br />
Sa critique de Weber concerne, entre autres, la question de l’équilibre général alors que Weber traite le problème en termes d’équilibre partiel. Lösch va donc plus loin en tenant compte par exemple de la dynamique entre les variations de prix et de demande, et les choix de localisation industrielle. Il prend également en compte la compétition entre entreprises avec, en considérant de façon critique la solution de Hotelling.</div>
<div style="text-align: justify;">
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De la même manière, les anneaux de Thünen sont reconsidérés pour prendre en compte les différents facteurs tels les variations de l’offre et de la demande.<br />
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Dans les deux cas, Lösh aboutit à la conclusion que la solution géométrique est trop simpliste pour répondre à la complexité de l’équation.<br />
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Lösch traite également des choix de localisation des consommateurs.</div>
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C’est après avoir considéré la logique de localisation des agents économiques, et sur cette base que Lösch se lance dans l’étude de la localisation des agglomérations urbaines, des réseaux de places centrales et des régions économiques.</div>
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Il considère et critique l’approche de Christaller pour développer sa propre vision.<br />
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<u><b>Document de référence</b></u> : <a href="http://amorbelhedi.m.a.f.unblog.fr/files/2013/10/mlae.pdf">A. Belhedi: <i>Les modèles de localisation des activités économiques</i>. Chapitre 4.</a></div>
Jean-François Tardieuhttp://www.blogger.com/profile/01025349732771545315noreply@blogger.com12