Cholesky factorization on symbolic matrix

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Chien-Chia Huang le 16 Mai 2011

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Hi all,

I want to use Cholesky factorization on some symbolic matrices but I am still working with R2007b, quite an old version.

I met error message when I did it.

Is there any other way out to do this in R2007b?

I do have an authorized R2011a but the toolboxes are not included. (I have no idea why my school did not purchase the full version.)

So guess I cannot, for this time being, work with R2011a unless I know how to transfer all the toolboxes from my current version to the latest one.

Could anyone tell me how to do this? (Just copy all the files?)

Thanks in advance.

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Kai Gehrs le 17 Mai 2011

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If you want to do the computation inside of MuPAD, you can use

n:= 4:
A:= matrix([[c.i.j $ i = 1..n] $ j = 1..n]):
linalg::factorCholesky(A,NoCheck)

The option 'NoCheck' means that it is not checked whether A is symmetric and positive definite.

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Chien-Chia Huang le 17 Mai 2011

Thanks, Kai. But MuPad is contained in new Matlab version. I did not found it in my "antique" R2007b.

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Walter Roberson le 16 Mai 2011

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Toolboxes cannot be transferred between versions.

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Chien-Chia Huang le 17 Mai 2011

Thanks Walter. I did exactly what you say in your comment and got what I wanted.

Also to Andrei, I have tried and it works. But the answer is not as "pretty" as that in Maple. What should "C" be? what I input is C = [1 a b c;a 1 d e;b d 1 f;c e f 1].

Walter Roberson le 17 Mai 2011

I would suggest

maple('Chol := C->LinearAlgebra[LUDecomposition](Matrix(C,form=symmetric),method=Cholesky)':);

syms a b c d e f

C = [1 a b c;a 1 d e;b d 1 f;c e f 1];

maple('Chol', C);

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