Manuals/calci/CHOLESKYFACTORIZATION

CHOLESKYFACTORIZATION(Matrix)

$Matrix$ is the array of numeric elements

Description

This function gives the value of Cholesky factorization.
It is called Cholesky Decomposition or Cholesky Factorization.
In $CHOLESKYFACTORIZATION(Matrix)$ , $Matrix$ is the set of values.
The Cholesky Factorization is only defined for symmetric or Hermitian positive definite matrices.
Every positive definite matrix A can be factored as $A$ = $LL^{T}$

 $L$  is lower triangular with positive diagonal elements
 $L^{T}$  is is the conjugate transpose value of  $L$

Every Hermitian positive-definite matrix has a unique Cholesky decomposition.
Here $CHOLESKYFACTORIZATION(Matrix)$ , $arr$ is set of values to find the factorization value.
Partition matrices in $A$ = $LL^{T}$ is

${\begin{bmatrix}a_{11}&A_{21}^{T}\\A_{21}&A_{22}\end{bmatrix}}={\begin{bmatrix}l_{11}&0\\L_{21}&L_{22}\end{bmatrix}}{\begin{bmatrix}l_{11}&L_{21}^{T}\\0&L_{22}^{T}\end{bmatrix}}={\begin{bmatrix}l_{11}^{2}&L_{11}L_{21}^{T}\\L_{11}L_{21}&L_{21}L_{21}^{T}+L_{22}L_{22}^{T}\end{bmatrix}}$

Algorithm

Determine $l_{11}$ and $L_{21}$

l_{11}

{\sqrt {a_{11}}}

L_{21}

{\frac {1}{l_{11}}}A_{21}

Compute $L_{22}$ from

A_{22}-L_{21}L_{21}^{T}

L_{22}L_{22}^{T}

this is a Cholesky Factorization of order $n-1$

If the matrix A is Hermitian and positive semi-definite, then it still has a decomposition of the form A = LL^T if the diagonal entries of L are allowed to be zero.
Also A can be written as LL^T for some invertible L, lower triangular or otherwise, then A is Hermitian and positive definite.

Manuals/calci/CHOLESKYFACTORIZATION

Description

Algorithm

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