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About LU factorization
06-04-2015, 11:30 AM (This post was last modified: 06-04-2015 01:13 PM by DrD.)
Post: #10
RE: About LU factorization
(06-04-2015 11:06 AM)salvomic Wrote:  so, is the Prime using Doolittle? Please, could it use *both* methods, to choose one? ;-)

For your matrix M1:=[[2,1,1],[4,−6,0],[−2,7,2]], I get:

L1:=LU(M1) = {[[1,0,0],[0.5,1,0],[−0.5,1,1]],[[4,−6,0],[0,4,1],[0,0,1]],[[0,1,0],[1,0,0],[0,0,1]]}

Since L1(1)=[[1,0,0],[0.5,1,0],[−0.5,1,1]] (Lower triangular, has one's in diagonal) it would be the Doolittle method.

By the way, I went through Gil Strang's MIT online classes. I really enjoyed them!
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Messages In This Thread
About LU factorization - salvomic - 06-04-2015, 09:10 AM
RE: About LU factorization - Paul Dale - 06-04-2015, 09:18 AM
RE: About LU factorization - salvomic - 06-04-2015, 09:52 AM
RE: About LU factorization - Tugdual - 06-04-2015, 10:15 AM
RE: About LU factorization - Paul Dale - 06-04-2015, 10:22 AM
RE: About LU factorization - Tugdual - 06-04-2015, 10:36 AM
RE: About LU factorization - DrD - 06-04-2015, 10:31 AM
RE: About LU factorization - DrD - 06-04-2015, 10:45 AM
RE: About LU factorization - salvomic - 06-04-2015, 11:06 AM
RE: About LU factorization - DrD - 06-04-2015 11:30 AM
RE: About LU factorization - salvomic - 06-04-2015, 12:05 PM
RE: About LU factorization - salvomic - 06-04-2015, 12:48 PM
RE: About LU factorization - DrD - 06-04-2015, 01:31 PM
RE: About LU factorization - salvomic - 06-04-2015, 01:36 PM
RE: About LU factorization - DrD - 06-04-2015, 02:12 PM
RE: About LU factorization - salvomic - 06-04-2015, 02:19 PM
RE: About LU factorization - DrD - 06-04-2015, 02:19 PM
RE: About LU factorization - salvomic - 06-04-2015, 02:22 PM
RE: About LU factorization - Werner - 06-04-2015, 04:57 PM
RE: About LU factorization - Gerald H - 06-04-2015, 05:10 PM
RE: About LU factorization - salvomic - 06-04-2015, 05:10 PM
RE: About LU factorization - salvomic - 06-05-2015, 08:15 PM
RE: About LU factorization - Claudio L. - 06-05-2015, 08:38 PM
RE: About LU factorization - salvomic - 06-05-2015, 09:00 PM
RE: About LU factorization - Claudio L. - 06-08-2015, 01:12 PM
RE: About LU factorization - salvomic - 06-08-2015, 01:15 PM
RE: About LU factorization - parisse - 06-07-2015, 06:42 PM
RE: About LU factorization - salvomic - 06-07-2015, 07:20 PM



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