eigenvalues of many dense symmetric real matrix that are 'close' to each other

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Henry Wolkowicz
Henry Wolkowicz am 15 Jun. 2019
Bearbeitet: David Goodmanson am 16 Jun. 2019
I have to find the eigenvalues of many dense symmetric real matrix that are 'close' to each other, i.e. they are not much different. Can I speed up eig or some other code if I know the spectral decomposition of A and want to find it for a nearby B. I.e. I have A = UDU' as the spectral decomposition and want to find it for B where
B-A is small. I know this can be done for eigs with 'restarts'. But what about finding all the eigenvalues with eig?
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David Goodmanson
David Goodmanson am 16 Jun. 2019
Bearbeitet: David Goodmanson am 16 Jun. 2019
Hi Henry,
If the eigenvalues are not too closely spaced (no repeated ones either) then a simple first order approximation gives a quick look at how much the eigenvalues change. Let A1 = B-A. The diagonal elements of
E1 = U'*A1*U
are the shifts in the eigenvalues, to first order. Perturbation theory can provide results for higher orders, using increasingly complicated expressions.

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