A method is presented for updating the Cholesky factorization of a band symmetric matrix modified by a rank-one matrix which has the same band width. Problems which could involve applications of such a method arise frequently in plasticity and structural optimization where repeated solutions of a band algebraic system with a changing matrix are needed. The Cholesky factorization of a stiffness matrix can be updated after modifying a local stiffness matrix which can be written as a sum of a few rank-one matrices. The number of operations required for the updating is of the order mn or less, where n is the dimension of the global matrix and m is its half band width (including the diagonal).Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/...
Let the positive definite matrix A have a Cholesky factorization A = RTR. For a given vector x suppo...
Perturbation theory is developed for the Cholesky decomposition of an n \Theta n symmetric positive...
This note concerns the computation of the Cholesky factorization of a symmetric and positive defini...
Given a sparse, symmetric positive definite matrix C and an associated sparse Cholesky factorization...
Symmetric positive definite matrices appear in most methods for Unconstrained Optimization. The met...
AbstractThe rank-one modification of a Cholesky factorization R>TR−zzT=DTD, where R and D are upper ...
Cholesky factorization is a type of matrix factorization which is used for solving system of linear ...
Given a symmetric and not necessarily positive definite matrix A, a modified Cholesky algorithm comp...
This article, aimed at a general audience of computational scientists, surveys the Cholesky factoriz...
. Given a symmetric and not necessarily positive definite matrix A, a modified Cholesky algorithm co...
Usage of the Sherman-Morrison-Woodbury formula to update linear systems after low rank modifications...
In many problems in nonlinear solid mechanics, the finite element method is executed incrementally, ...
Abstract. For any symmetric positive definite ¢¤£¥ ¢ matrix ¦ we introduce a definition of strong ra...
Efectua una deducció dels algorismes coneguts i d'actualització de factoritzacions de Cholesky de ma...
In many problems in nonlinear solid mechanics, the finite element method is executed incrementally, ...
Let the positive definite matrix A have a Cholesky factorization A = RTR. For a given vector x suppo...
Perturbation theory is developed for the Cholesky decomposition of an n \Theta n symmetric positive...
This note concerns the computation of the Cholesky factorization of a symmetric and positive defini...
Given a sparse, symmetric positive definite matrix C and an associated sparse Cholesky factorization...
Symmetric positive definite matrices appear in most methods for Unconstrained Optimization. The met...
AbstractThe rank-one modification of a Cholesky factorization R>TR−zzT=DTD, where R and D are upper ...
Cholesky factorization is a type of matrix factorization which is used for solving system of linear ...
Given a symmetric and not necessarily positive definite matrix A, a modified Cholesky algorithm comp...
This article, aimed at a general audience of computational scientists, surveys the Cholesky factoriz...
. Given a symmetric and not necessarily positive definite matrix A, a modified Cholesky algorithm co...
Usage of the Sherman-Morrison-Woodbury formula to update linear systems after low rank modifications...
In many problems in nonlinear solid mechanics, the finite element method is executed incrementally, ...
Abstract. For any symmetric positive definite ¢¤£¥ ¢ matrix ¦ we introduce a definition of strong ra...
Efectua una deducció dels algorismes coneguts i d'actualització de factoritzacions de Cholesky de ma...
In many problems in nonlinear solid mechanics, the finite element method is executed incrementally, ...
Let the positive definite matrix A have a Cholesky factorization A = RTR. For a given vector x suppo...
Perturbation theory is developed for the Cholesky decomposition of an n \Theta n symmetric positive...
This note concerns the computation of the Cholesky factorization of a symmetric and positive defini...