elliptic PDE with variable coefficient
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Hello,
I am desperately trying to solve the following equation (in 2D) :
-(laplacian)u + u =1
This is basically an elliptic PDE with
c=1 , f=1 and a= B(x,y).
B(x,y) is a function I have created that doesn't have any closed form. Here's the code for B(x,y):
I entered c=1 , f=1 and a= B(x,y) in the pde specification but I cannot solve the equation as I get the following error
Expression evaluates to wrong size. Must be scalar or row vector. In a system case, pass first or second row; for example u(2,:)
Can somebody help me fix this ?
Thank you
2 Commenti
Geoff Hayes
il 19 Nov 2014
Ann - please describe what you mean by I entered c=1 , f=1 and a= V(x,y). in the pde specification but I cannot solve the equation as I get the following error. What line of code are you calling that generates the error? What is the pde specification?
Risposta accettata
Bill Greene
il 19 Nov 2014
The input arguments, x and y are equal length row vectors of x and y coordinates where the a coefficient must be defined. If this length (number of columns) is n, the output argument, v, must be a matrix with dimensions 1 x n (i.e. a row vector). The line
v = M(intx,inty);
is returning an n x n matrix; that is the reason for the error message.
3 Commenti
Bill Greene
il 19 Nov 2014
Yes, x and y are spatial locations in the mesh where the a-coefficient must be defined. The returned value must be a row vector with values at just those points. You are returning a matrix with n x n points where what is required is a row vector with values at the n locations. The simplest way to understand and implement this (though not particularly efficient) is with this snippet of code:
v = zeros(1, length(x))
for i=1:length(x)
v(i) = M(intx(i), inty(i));
end
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