AbstractGeneral conditions where a symmetric matrix is factorable by Cholesky decomposition are described. While numerical stability is a remaining issue whenever the Cholesky decomposition is used to factor indefinite matrices, the existence of such factors is demonstrated for matrix structures that are commonly found in statistics. Kalman filtering, for example, is rediscovered in the Cholesky decomposition of an indefinite matrix. Moreover, the Cholesky decomposition uniquely defines the likelihood function in linear statistical models, and this includes situations when the variance matrix is singular or when the Cholesky decomposition does not run to completion. Alternative methods of likelihood evaluation (which may involve, for exampl...
We present two novel and explicit parametrizations of Cholesky factor of a nonsingular correlation m...
Abstract. Limited-memory incomplete Cholesky factorizations can provide robust precondi-tioners for ...
Perturbation theory is developed for the Cholesky decomposition of an n \Theta n symmetric positive...
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...
Abstract. Sparse linear equations Kd r are considered, where K is a specially structured symmetric i...
This article, aimed at a general audience of computational scientists, surveys the Cholesky factoriz...
The process of factorizing a symmetric matrix using the Cholesky (LLT ) or indefinite (LDLT ) facto...
. This paper presents a sufficient condition on sparsity patterns for the existence of the incomplet...
In this paper, we study the use of an incomplete Cholesky factorization (ICF) as a preconditioner fo...
In this paper, we study the use of an incomplete Cholesky factorization (ICF) as a preconditioner fo...
Symmetric positive definite matrices appear in most methods for Unconstrained Optimization. The met...
The modified Cholesky decomposition is one of the standard tools in various areas of mathematics for...
AbstractDue to the principle of regularization by restricting the number of degrees of freedom, trun...
The thesis is about the incomplete Cholesky factorization and its va- riants, which are important fo...
We present two novel and explicit parametrizations of Cholesky factor of a nonsingular correlation m...
Abstract. Limited-memory incomplete Cholesky factorizations can provide robust precondi-tioners for ...
Perturbation theory is developed for the Cholesky decomposition of an n \Theta n symmetric positive...
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...
Abstract. Sparse linear equations Kd r are considered, where K is a specially structured symmetric i...
This article, aimed at a general audience of computational scientists, surveys the Cholesky factoriz...
The process of factorizing a symmetric matrix using the Cholesky (LLT ) or indefinite (LDLT ) facto...
. This paper presents a sufficient condition on sparsity patterns for the existence of the incomplet...
In this paper, we study the use of an incomplete Cholesky factorization (ICF) as a preconditioner fo...
In this paper, we study the use of an incomplete Cholesky factorization (ICF) as a preconditioner fo...
Symmetric positive definite matrices appear in most methods for Unconstrained Optimization. The met...
The modified Cholesky decomposition is one of the standard tools in various areas of mathematics for...
AbstractDue to the principle of regularization by restricting the number of degrees of freedom, trun...
The thesis is about the incomplete Cholesky factorization and its va- riants, which are important fo...
We present two novel and explicit parametrizations of Cholesky factor of a nonsingular correlation m...
Abstract. Limited-memory incomplete Cholesky factorizations can provide robust precondi-tioners for ...
Perturbation theory is developed for the Cholesky decomposition of an n \Theta n symmetric positive...