This thesis focuses on the Cholesky-related factorizations of symmetric matrices and their application to Newton-type optimization. A matrix is called triadic if it has at most two nonzero off-diagonal elements in each column. Tridiagonal matrices are a special case of these. We prove that the triadic structure is preserved in the Cholesky-related factorizations We analyze its numerical stability and also present our perturbation analysis. Newton-like methods solve nonlinear programming problems whose objective function and constraint functions are twice continuously differentiable. At each iteration, a search direction is computed by solving a linear symmetric system Ax=b. When A is not positive definite, the computed search direction ma...
In this thesis we present research on mathematical properties of methods for solv- ing symmetric sys...
Our work under this support broadly falls into five categories: automatic differentiation, sparsity,...
The process of factorizing a symmetric matrix using the Cholesky (LLT ) or indefinite (LDLT ) facto...
Given an $n \times n$ symmetric possibly indefinite matrix $A$, a modified Cholesky algorithm comp...
Given a symmetric and not necessarily positive definite matrix A, a modified Cholesky algorithm comp...
. Given a symmetric and not necessarily positive definite matrix A, a modified Cholesky algorithm co...
Symmetric positive definite matrices appear in most methods for Unconstrained Optimization. The met...
AbstractGeneral conditions where a symmetric matrix is factorable by Cholesky decomposition are desc...
We call a matrix triadic if it has no more than two nonzero off-diagonal elements in any column. A...
Abstract. Sparse linear equations Kd r are considered, where K is a specially structured symmetric i...
AbstractThe paper concerns the Cholesky factorization of symmetric positive definite matrices arisin...
In recent years the use of quasi-Newton methods in optimization algorithms has inspired much of the ...
We consider the $LBL^T$ factorization of a symmetric matrix where $L$ is unit lower triangular and ...
This article, aimed at a general audience of computational scientists, surveys the Cholesky factoriz...
An algorithm is presented to compute a triangular factorization and the inertia of a symmetric matri...
In this thesis we present research on mathematical properties of methods for solv- ing symmetric sys...
Our work under this support broadly falls into five categories: automatic differentiation, sparsity,...
The process of factorizing a symmetric matrix using the Cholesky (LLT ) or indefinite (LDLT ) facto...
Given an $n \times n$ symmetric possibly indefinite matrix $A$, a modified Cholesky algorithm comp...
Given a symmetric and not necessarily positive definite matrix A, a modified Cholesky algorithm comp...
. Given a symmetric and not necessarily positive definite matrix A, a modified Cholesky algorithm co...
Symmetric positive definite matrices appear in most methods for Unconstrained Optimization. The met...
AbstractGeneral conditions where a symmetric matrix is factorable by Cholesky decomposition are desc...
We call a matrix triadic if it has no more than two nonzero off-diagonal elements in any column. A...
Abstract. Sparse linear equations Kd r are considered, where K is a specially structured symmetric i...
AbstractThe paper concerns the Cholesky factorization of symmetric positive definite matrices arisin...
In recent years the use of quasi-Newton methods in optimization algorithms has inspired much of the ...
We consider the $LBL^T$ factorization of a symmetric matrix where $L$ is unit lower triangular and ...
This article, aimed at a general audience of computational scientists, surveys the Cholesky factoriz...
An algorithm is presented to compute a triangular factorization and the inertia of a symmetric matri...
In this thesis we present research on mathematical properties of methods for solv- ing symmetric sys...
Our work under this support broadly falls into five categories: automatic differentiation, sparsity,...
The process of factorizing a symmetric matrix using the Cholesky (LLT ) or indefinite (LDLT ) facto...