Difference between revisions of "ApCoCoA-1:Num.SVD"
From ApCoCoAWiki
m (ApCoCoA:Numerical.SVD moved to ApCoCoA:Num.SVD) |
|||
Line 3: | Line 3: | ||
<short_description>singular value decomposition of a matrix</short_description> | <short_description>singular value decomposition of a matrix</short_description> | ||
<syntax> | <syntax> | ||
− | $numerical.SVD(A:Matrix): | + | $numerical.SVD(A:Matrix):[B:Matrix,C:Matrix,D:Matrix] |
</syntax> | </syntax> | ||
<description> | <description> | ||
Line 10: | Line 10: | ||
This function returns a list of three matrices which form the singular | This function returns a list of three matrices which form the singular | ||
value decomposition of the input matrix. The list produced is <formula>[U, S, VT]</formula>. | value decomposition of the input matrix. The list produced is <formula>[U, S, VT]</formula>. | ||
− | + | ||
− | |||
<example> | <example> |
Revision as of 16:38, 22 April 2009
Numerical.SVD
singular value decomposition of a matrix
Syntax
$numerical.SVD(A:Matrix):[B:Matrix,C:Matrix,D:Matrix]
Description
Please note: The function(s) explained on this page is/are using the ApCoCoAServer. You will have to start the ApCoCoAServer in order to use
it/them. Please also note that you will have to use an ApCoCoAServer with enabled BLAS/LAPACK support.
This function returns a list of three matrices which form the singular
value decomposition of the input matrix. The list produced is <formula>[U, S, VT]</formula>.
Example
D:=Mat([[1,2,7,18],[2,4,9,12],[23,8,9,10]]); $numerical.SVD(D); ------------------------------- [Mat([ [-2608957845014309/4503599627370496, 3400715993947695/4503599627370496, -1196230415249177/4503599627370496, -5542055005031021/36028797018963968], [-4803191187447087/18014398509481984, 4289880920686871/36028797018963968, 3813211715037953/9007199254740992, 7724713654272699/9007199254740992], [-7645273287337725/18014398509481984, -5741692259075309/36028797018963968, 3381220959856661/4503599627370496, -540919752203371/1125899906842624], [-5789886178591733/9007199254740992, -2813340077166513/4503599627370496, -7780633724302695/18014398509481984, 3606131681355807/36028797018963968] ]), Mat([ [1164315100749939/35184372088832, 4798366071344577/281474976710656, 3788674137264815/1125899906842624] ]), Mat([ [-8521591816535737/18014398509481984, -3744869794805223/9007199254740992, -6996513907843673/9007199254740992], [-3002889242741505/4503599627370496, -7337996657000815/18014398509481984, 2810636692253967/4503599627370496], [-5187087952406809/9007199254740992, 915526145687749/1125899906842624, -6091132379868651/72057594037927936] ])] -------------------------------
See also
Numerical.EigenValuesAndVectors
Numerical.EigenValuesAndAllVectors