Multiple results for iteratively multiplying a matrix with a vector quickly

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James McIntosh
James McIntosh el 17 de Jun. de 2018
Comentada: James McIntosh el 17 de Jun. de 2018
Essentially I want a fast way of doing: c = (A^k)*b0. But I want the result for multiple values of k (I don't need it for all values of k, just some).
At the moment, I am just doing this in a normal for loop (b1 = A*b, b2 = A*b1, b3 = A*b2, etc.) for all k. But I am wondering if there is a faster way (maybe using GPUs).
Doing loops in GPUs doesn't seem like the way forward. I was thinking I could just request c = (A^k)*b0 (which is very fast on the GPU) for only the k that I want, but if I want many (for example for k = [1:5:1000]) this still ends up being slower than just doing it on a loop on the CPU.
Any suggestions? Thanks -
clear; rng(1);
N = 301;
k = 1000; A = randn(N)/17; b = rand(N,1);
f = @() r(A,b,k);
t = timeit(f);disp(t)
function b = r(A,b,k)
for ix = 1:k
% currently not pulling out b for the k of interest (but is doable here)
b = A*b;
end
end
  2 comentarios
Jan
Jan el 17 de Jun. de 2018
It matters which values of k you need. If it is 1,2,4,8,16, it might be more efficient to use A = A ^ 2.
James McIntosh
James McIntosh el 17 de Jun. de 2018
Editada: James McIntosh el 17 de Jun. de 2018
Thanks - there is no pattern to the k (for all intents and purposes, the k that I want to query is randomly distributed between 1 and 5000, and there might be for example, 500 samples).

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Respuestas (2)

James Tursa
James Tursa el 17 de Jun. de 2018
Editada: James Tursa el 17 de Jun. de 2018
Note that as the power value gets higher, the numerical stability of successive matrix multiplies will degrade and you will not get as accurate an answer as calling the MATLAB mpower function directly (which uses the matrix exponential function). Also, I am not sure all of those successive matrix multiplies will be faster than calling mpower directly anyway. E.g., what kind of timing do you get with this compared to your looping?
X = your matrix
b = your vector
k = 1:5:1000;
tic
result = arrayfun(@(p)X^p*b,k,'uni',false);
toc
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James Tursa
James Tursa el 17 de Jun. de 2018
So, I would assume that the time savings is mainly because in your loop you are doing successive iterations of (matrix)*(vector) multiplies, whereas the other method does the full matrix^power operation and then does the (matrix)*(vector) operation. I.e., your loop does not do (matrix)*(matrix) operations and that is where I am guessing you are getting the time savings.
You will have to decide if the numerical error accumulation of the successive multiplies is tolerable for your application.
James McIntosh
James McIntosh el 17 de Jun. de 2018
Thanks for looking into the problem. I know that the numerical error accumulation is manageable for my purposes. I am really just looking for a faster way than the loop method on a CPU - but maybe that's as good as it's going to get.

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Walter Roberson
Walter Roberson el 17 de Jun. de 2018
Since you are calculating many A^k, you should probably do an svd to get the U, S, V, and then you can easily raise S to multiple powers since it is a vector. You would probably still need a loop for the reconstruction -- though perhaps you would be able to us pagefun() with gpuarrays
  1 comentario
James McIntosh
James McIntosh el 17 de Jun. de 2018
Thanks - I think I do not understand the SVD approach though. Maybe if A was symmetric (so that U*(S^k)*V' = X^k) - but it is not in this case.

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