Strange behaviour of pde-toolbox in labeling or a bug?
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Mohammad Monfared
le 18 Oct 2013
Commenté : Mohammad Monfared
le 21 Oct 2013
Hi, I'm new to pde-toolbox but this is kinda weird to me:
let's draw some rectangles in PDE Tollbox like:
but when I export Geometry Description and ... from Draw menu to matlab workspace and then decompose them using:
[g,bt] = decsg(gd,sf,ns) ;
plotting the resulted geometry by:
pdegplot(g)
this is what I get:
as could be seen, labels are randomly changed! any idea of what is happening here?
I'm using Matlab R2012b.
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Bill Greene
le 18 Oct 2013
Hi,
Your geometry is unusual in that none of the rectangles intersect each other. The algorithm in function decsg is designed to generally compute the intersections among the input entities and produce a completely new set of regions that are only related to the input entities. Generally, the number of output entities does not match the number of input entities and, as you have discovered, decsg assigns region numbers to these output entities in a way that is not easy to predict.
Bill
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Bill Greene
le 19 Oct 2013
Hi,
The way I have dealt with the problem of defining coefficient matrices when I have had geometries similar to yours is to simply ignore the sub-domain numbers. I write a function to define the coefficient as shown in this doc page:
This page also shows how you can compute the centroid of each triangle inside this function. Then you simply assign coefficient values based on this location. In your case you can use the x-coordinate to determine which rectangle the element is in.
Hope that helps.
Bill
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Bill Greene
le 20 Oct 2013
Without knowing the physics of your problem, I can't really say much definitive. It is not uncommon to have a single scalar equation for u and a "c" coefficient that has different terms in the x and y directions to reflect different properties in those directions. But, for a single PDE, the "a" coefficient is also a scalar. If you have more than one value for "a", I would guess you are missing an equation. That would mean u is a vector with two components.
Bill
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