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 Post subject: LU Factorization
PostPosted: Fri Nov 25, 2011 6:39 pm 
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How can I (succesfully) unpack the information module rmatrixlu returns me in the first argument? I.e. i need the matrices L and U explicitely.


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 Post subject: Re: LU Factorization
PostPosted: Mon Nov 28, 2011 7:20 am 
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Posts: 927
Lower part of the result contains L, upper one contains U. They should be easy to unpack.


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 Post subject: Re: LU Factorization
PostPosted: Mon Nov 28, 2011 7:49 am 
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Sure, if this were it. What about the Permutation Matrix (Pivots) and the Decomposition A=P L U? I don't understand the function of the returned pivots in order to construct that Decomposition.


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 Post subject: Re: LU Factorization
PostPosted: Mon Nov 28, 2011 9:05 am 
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Here is extract from documentation:

Quote:
A is represented as A = P*L*U, where:
* L is lower unitriangular matrix
* U is upper triangular matrix
* P = P0*P1*...*PK, K=min(M,N)-1,
Pi - permutation matrix for I and Pivots[I]


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 Post subject: Re: LU Factorization
PostPosted: Mon Nov 28, 2011 9:51 am 
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Joined: Fri Nov 25, 2011 6:36 pm
Posts: 4
It seems we are talking past each other. Please take a look at this example (mycode)

LU Decomposition A = L U.
A:
2,000000 -1,000000 0,000000
1,000000 0,000000 -1,000000
3,000000 7,000000 -1,000000

The Decomposition of A is
L:
0,666667 1,000000 0,000000
0,333333 0,411765 1,000000
1,000000 0,000000 0,000000
U:
3,000000 7,000000 -1,000000
0,000000 -5,666667 0,666667
0,000000 0,000000 -0,941176

Now please consider the output of alglib routine rmatrixlux

---> LUA:
3,0000 7,0000 -1,0000
0,6667 -5,6667 0,6667
0,3333 0,4118 -0,9412
---> PIVOTS:
2 2 2

Matrix U can easily be extracted. But the construction of L is what is making me a headache when using alglib's rmatrixlu.


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 Post subject: Re: LU Factorization
PostPosted: Mon Nov 28, 2011 11:16 am 
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L is unitriangular, which means that its diagonal elements are equal to 1.0. In your case L is equal to
1,0000 0,0000 0,0000
0,6667 1,0000 0,0000
0,3333 0,4118 1,0000


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 Post subject: Re: LU Factorization
PostPosted: Mon Nov 28, 2011 12:40 pm 
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Joined: Fri Nov 25, 2011 6:36 pm
Posts: 4
Which in this case would mean, that LU != A. And, what about the Pivots? I know i am intrusive, and i am really sorry about that, but i hope to solve this (little) problem with your very appreciated help.


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