User`s guide
Cholesky Inverse
5-80
5Cholesky Inverse
Purpose Compute the inverse of a Hermitian positive definite matrix using Cholesky
factorization.
Library Math Functions / Matrices and Linear Algebra / Matrix Inverses
Description The Cholesky Inverse block computes the inverse of the Hermitian positive
definite input matrix S by performing Cholesky factorization.
L is a lower triangular square matrix with positive diagonal elements and L
*
is the Hermitian (complex conjugate) transpose of L. Only the diagonal and
upper triangle of the input matrix are used, and any imaginary component of
the diagonal entries is disregarded. Cholesky factorization requires half the
computation of Gaussian elimination (LU decomposition), and is always stable.
The output is always sample-based.
The algorithm requires that the input be Hermitian positive definite. When the
input is not positive definite, the block reacts with the behavior specified by the
Non-positive definite input parameter. The following options are available:
•
Ignore – Proceed with the computation and do not issue an alert. The output
is not a valid inverse.
•
Warning – Display a warning message in the MATLAB command window,
and continue the simulation. The output is not a valid inverse.
•
Error – Display an error dialog box and terminate the simulation.
Dialog Box
Non-positive definite input
Response to non-positive definite matrix inputs. Tunable.
S
1–
LL
*
()
1–
=