SVD Only With Matrix of Full Rank?

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SVD Only With Matrix of Full Rank?

04-04-2015, 06:30 PM (This post was last modified: 04-04-2015 06:45 PM by parisse.)

Post: #8

parisse Offline

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RE: SVD Only With Matrix of Full Rank?

I just discovered I can cheat on degenerated matrices, I can replace the small computed singular values by 0, then precision becomes much better. However it would have a drawback, really small svl would be replaced by 0. Is it a problem?

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Messages In This Thread

SVD Only With Matrix of Full Rank? - mark4flies - 04-03-2015, 11:20 AM

RE: SVD Only With Matrix of Full Rank? - Han - 04-03-2015, 03:07 PM

RE: SVD Only With Matrix of Full Rank? - parisse - 04-03-2015, 04:44 PM

RE: SVD Only With Matrix of Full Rank? - mark4flies - 04-03-2015, 05:10 PM

RE: SVD Only With Matrix of Full Rank? - parisse - 04-03-2015, 06:51 PM

RE: SVD Only With Matrix of Full Rank? - mark4flies - 04-04-2015, 12:08 PM

RE: SVD Only With Matrix of Full Rank? - parisse - 04-04-2015, 04:48 PM

RE: SVD Only With Matrix of Full Rank? - parisse - 04-04-2015 06:30 PM

RE: SVD Only With Matrix of Full Rank? - mark4flies - 04-08-2015, 12:25 PM

RE: SVD Only With Matrix of Full Rank? - mark4flies - 04-08-2015, 12:26 PM

RE: SVD Only With Matrix of Full Rank? - Han - 10-20-2015, 07:18 PM

RE: SVD Only With Matrix of Full Rank? - mark4flies - 11-14-2015, 03:37 PM

RE: SVD Only With Matrix of Full Rank? - Han - 11-14-2015, 05:21 PM

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