Vectorizing a function looking for eigenvalues of a matrix

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Ferdy Ellen
Ferdy Ellen am 25 Okt. 2022
Kommentiert: Walter Roberson am 25 Okt. 2022
In short, I have a function that defines a matrix based on an input value, and then returns the eigenvalue of that matrix that is closest to 1. I want to plot this for different inputs, but I get the following warning:
'Warning: Function behaves unexpectedly on array inputs. To improve performance, properly vectorize your function to return an output with the same size and shape as the input arguments.'
Is it possible to vectorize this function in order to plot it properly (and without waiting a very long time)?
My code looks somewhat like this (if necessary I can post the entire code but it's pretty long).
eigenvalue = @eigenvalue_func
fplot(eigenvalue)
function eta = eigenvalue_func(z)
p = 1:1:100;
q = p;
weights = rand(100,1); %in reality I'm using a distribution for p, q and the weights based on Gaussian Quadrature
[Q, P] = meshgrid(q,p);
[W, ~] = meshgrid(weights, p);
v_0 = -30./(P.*Q.*(P.^2-Q.^2).*2.*pi.^2).*(Q.*cos(Q).*sin(P)-P.*cos(P).*sin(Q));
A = -4.*pi.*v_0.*(Q.^2 - z ).^(-1).*Q.^2.*W;
for j = 1:100 %the diagonal has to be defined differently since the above returns NaN/Inf (I take the limit here)
v_0(j,j) = -30./(2.*pi^2.*P(j,j).^2).*(0.5-(sin(2.*P(j,j)))./(4.*P(j,j)));
A(j,j) = -4.*pi.*v_0(j,j).*(Q(j,j).^2 - z).^(-1).*Q(j,j).^2.*W(j,j);
end
eta_full = eigs(A, 20);
[~, index_eigenvalue] = min(abs(eigs(A, 20)-1));
eta = eta_full(index_eigenvalue);
end
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Bruno Luong
Bruno Luong am 25 Okt. 2022
Bearbeitet: Bruno Luong am 25 Okt. 2022
The bottleneg is probably calling EIGS (have you made any profiler of your code?) which cannot be vectorized at the moment, and possibly fplot waste a lot of time to find the interval and resolution to plot the function.
If you want faster plot, change fplot and eigs.
For instant it is totally iefficient to call twice eigs with 20 eigenvalues
eta_full = eigs(A, 20);
[~, index_eigenvalue] = min(abs(eigs(A, 20)-1));
eta = eta_full(index_eigenvalue)
where you can get the same result with
eta = eigs(A,1,1);
Walter Roberson
Walter Roberson am 25 Okt. 2022
Since eigs is not internally vectorized, it might make sense to define a function that accepted a vector of z values, and used background pool to evaluate multiple z in parallel.

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Walter Roberson
Walter Roberson am 25 Okt. 2022
wrapper = @(z) arrayfun(eigenvalue, z)
fplot(wrapper)

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