similar matrix multiplication speed up

2011 6 月 20
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Hi,
I need to multiply many times matrices of the same type. Is there a way to speed this up:
M1^m*M2^m*...
where Mi = expm(alpha(i)*P) P being a matrix (hermitian). Already all Mi are precalculated and the main calculation cost of my problem now is the long matrix multiplication through all i.
Thanks

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その他の回答 (3 件)

Gary
Gary 2011 年 6 月 20 日

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mtimesx might help to calculate the Mi matrices and its power but can it speed up the multiplication between Mi?
Thanks for the answer btw.

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Paulo Silva
Paulo Silva 2011 年 6 月 20 日
Sorry but I can't help further, never used it.

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Teja Muppirala
Teja Muppirala 2011 年 6 月 20 日

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You can combine all of those multiplications into one expression using the properties of the matrix exponential.
Compare these 3 expressions:
P = rand(3);
P = P*P';
format long
% These are all the same
expm(2*P)^7*expm(4*P)^7*expm(5*P)^7
expm(14*P)*expm(28*P)*expm(35*P)
expm(7*(2+4+5)*P)
Gary
Gary 2011 年 6 月 20 日

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Sorry the expression given at the beginning was kind of stupid. The Mi matrices are of the form Mi=expm(P0+alpha(i)P1) where P0 and P1 are hermitian and most of all non commutative. I cannot combine the terms.

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