We propose an incomplete Cholesky factorization for the solution of large-scale trust region subproblems and positive definite systems of linear equations. This factorization depends on a parameter p that specifies the amount of additional memory (in multiples of n, the dimension of the problem) that is available; there is no need to specify a drop tolerance. Our numerical results show that the number of conjugate gradient iterations and the computing time are reduced dramatically for small values of p. We also show that in contrast with drop tolerance strategies, the new approach is more stable in terms of number of iterations and memory requirements
. This paper presents a sufficient condition on sparsity patterns for the existence of the incomplet...
We consider an incomplete Cholesky factorization preconditioner for the iterative solution of large ...
Limited memory quasi-Newton methods and trust-region methods represent two efficient approaches used...
Abstract. Incomplete Cholesky factorizations have long been important as preconditioners for use in ...
We present a new method for constructing incomplete Cholesky factorization preconditioners for use i...
This paper proposes, analyzes, and numerically tests methods to assure the existence of incomplete C...
AbstractWe analyze the average parallel complexity of the solution of large sparse positive definite...
This work studies limited memory preconditioners for linear symmetric positive definite systems of e...
In this paper, we study the use of an incomplete Cholesky factorization (ICF) as a preconditioner fo...
We consider the numerical solution of large and sparse linear systems arising from a finite differen...
International audienceSolving large sparse linear systems by iterative methods has often been quite ...
The thesis is about the incomplete Cholesky factorization and its va- riants, which are important fo...
Abstract. Limited-memory incomplete Cholesky factorizations can provide robust precondi-tioners for ...
Incomplete factorization has been shown to be a good preconditioner for the conjugate gradient metho...
Abstract. Sparse linear equations Kd r are considered, where K is a specially structured symmetric i...
. This paper presents a sufficient condition on sparsity patterns for the existence of the incomplet...
We consider an incomplete Cholesky factorization preconditioner for the iterative solution of large ...
Limited memory quasi-Newton methods and trust-region methods represent two efficient approaches used...
Abstract. Incomplete Cholesky factorizations have long been important as preconditioners for use in ...
We present a new method for constructing incomplete Cholesky factorization preconditioners for use i...
This paper proposes, analyzes, and numerically tests methods to assure the existence of incomplete C...
AbstractWe analyze the average parallel complexity of the solution of large sparse positive definite...
This work studies limited memory preconditioners for linear symmetric positive definite systems of e...
In this paper, we study the use of an incomplete Cholesky factorization (ICF) as a preconditioner fo...
We consider the numerical solution of large and sparse linear systems arising from a finite differen...
International audienceSolving large sparse linear systems by iterative methods has often been quite ...
The thesis is about the incomplete Cholesky factorization and its va- riants, which are important fo...
Abstract. Limited-memory incomplete Cholesky factorizations can provide robust precondi-tioners for ...
Incomplete factorization has been shown to be a good preconditioner for the conjugate gradient metho...
Abstract. Sparse linear equations Kd r are considered, where K is a specially structured symmetric i...
. This paper presents a sufficient condition on sparsity patterns for the existence of the incomplet...
We consider an incomplete Cholesky factorization preconditioner for the iterative solution of large ...
Limited memory quasi-Newton methods and trust-region methods represent two efficient approaches used...