computational complexity of svds

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Bowen am 26 Aug. 2023

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Bearbeitet: Christine Tobler am 28 Aug. 2023

Could anyone give me some help on why MATLAB implement svds use Lanczos Bidiagonalization algorithms but not seemingly more computational efficient algorithm like randomized algorithm, like algorithms in the paper FINDING STRUCTURE WITH RANDOMNESS: PROBABILISTIC ALGORITHMS FOR CONSTRUCTING APPROXIMATE MATRIX DECOMPOSITIONS?

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Torsten am 26 Aug. 2023

Bearbeitet: Torsten am 26 Aug. 2023

"randomized algorithm" sounds it has a wide range of application, but not computationally efficient for me.

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Answer 1

John D'Errico am 26 Aug. 2023

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Bearbeitet: John D'Errico am 26 Aug. 2023

Sorry, but no, we can't tell you why a choice was made. MathWorks does not give out that information.

You MIGHT be able to learn something if you make a technical support request, DIRECTLY to the tech support link. That is not Answers.

https://www.mathworks.com/support/contact_us.html?s_tid=hc_trail

Or, you could write your own code, if you think that scheme is so much better. Nothing stops you from doing so.

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Answer 2

Christine Tobler am 28 Aug. 2023

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Bearbeitet: Christine Tobler am 28 Aug. 2023

There is a recent function (introduced R2020b) called svdsketch, which is using randomized linear algebra. We recommend this for finding a low-rank approximation of a matrix, but not for finding individual singular value triplet, as it is focused on the whole matrix approximation, not on the residual of an individual triplet. It also doesn't allow for computing the smallest singular values, or singular values close to a shift, as svds does.