<div dir="ltr"><div class="gmail_extra"><div class="gmail_quote">On Tue, Jan 8, 2013 at 3:02 PM, Sandro Santilli <span dir="ltr"><<a href="mailto:strk@keybit.net" target="_blank">strk@keybit.net</a>></span> wrote:<br>
<blockquote class="gmail_quote" style="margin:0px 0px 0px 0.8ex;border-left:1px solid rgb(204,204,204);padding-left:1ex"><div class="im"><br>
</div>There's no function to move non-isolated nodes.<br>
ISO SQL/MM contains no specification about it, and PostGIS<br>
doesn't provide its own. <br></blockquote><div> </div><blockquote class="gmail_quote" style="margin:0px 0px 0px 0.8ex;border-left:1px solid rgb(204,204,204);padding-left:1ex">
What should happen to the node edges ?<br>
Should only the endpoint move ?<br></blockquote><div><br></div><div>The idea is that a user should be able to change the geometry of areas that should be topologically consistent. My perception was that moving an endpoint of an edge should be possible as long as the underlying topology was still valid after a move. <br>
</div><div>If I have two adjacent faces (picture below)<br><img src="data:image/png;base64,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" alt=""><br>
</div><div>I should be able to move a single node to get this:<br><br><img src="data:image/png;base64,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" alt=""><br>
<br></div><div>Regards,<br>Mats<br><br></div><div>ps.<br></div><div>Apologies for the crappy images but I hope you still get my point.<br>ds.<br><br></div><div><br></div><div><br> </div><blockquote class="gmail_quote" style="margin:0px 0px 0px 0.8ex;border-left:1px solid rgb(204,204,204);padding-left:1ex">

I suggest you use qgis with topological editing<br>
to move both the node and the edges endpoints<br>
the way you feel.<br>
Doing so would give you a feel of what the possible<br>
outcomes are.<br>
<div class="im"><br>
> The usecase is editing topological areas in a web client and have the<br>
> changes persisted in PostGIS. The user has to be able to move start or end<br>
> nodes in edges in the topology.<br>
<br>
</div>What about dropping the old edge and creating a new one ?<br>
<br>
--strk;<br>
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</blockquote></div><br></div></div>