Add to ORKGMany environmental processes can be modelled as transient convection–diffusion–reaction problems. This is the case, for instance, of the operation of activated-carbon filters. For industrial applications there is a growing demand for 3D simulations, so efficient linear solvers are a major concern. We have compared the numerical performance of two families of incomplete Cholesky factorizations as preconditioners of conjugate gradient iterations: drop-tolerance and prescribed-memory strategies. Numerical examples show that the former are computationally more efficient, but the latter may be preferable due to their predictable memory requirements.Peer Reviewe
In this chapter, we give a brief overview of a particular class of preconditioners known as incomple...
The paper addresses the development of time‐accurate methods for solving transient convection–...
We propose an incomplete Cholesky factorization for the solution of large-scale trust region subprob...
We consider the numerical solution of large and sparse linear systems arising from a finite differen...
Title: Numerical Solution of Convection-dominated Problems Author: Petr Lukáš Department: Department...
Incomplete factorization has been shown to be a good preconditioner for the conjugate gradient metho...
We consider flux-corrected finite element discretizations of 3D convection-dominated transport probl...
AbstractIterative methods preconditioned by incomplete factorizations and sparse approximate inverse...
. In this chapter, we give a brief overview of a particular class of preconditioners known as incomp...
AbstractWe study the stability of zero-fill incomplete LU factorizations of a nine-point coefficient...
Several new finite-difference schemes for a nonlinear convection-diffusion problem are constructed a...
A numerical study of the efficiency of the vectorized generalized conjugate residual methods (GCR) i...
In this paper we compare various preconditioners for the numerical solution of partial dierential eq...
An efficient algorithm to find the solution of transient convection–diffusion problems with dominant...
A numerical study of the efficiency of the generalized conjugate residual methods (GCR) is performed...
In this chapter, we give a brief overview of a particular class of preconditioners known as incomple...
The paper addresses the development of time‐accurate methods for solving transient convection–...
We propose an incomplete Cholesky factorization for the solution of large-scale trust region subprob...
We consider the numerical solution of large and sparse linear systems arising from a finite differen...
Title: Numerical Solution of Convection-dominated Problems Author: Petr Lukáš Department: Department...
Incomplete factorization has been shown to be a good preconditioner for the conjugate gradient metho...
We consider flux-corrected finite element discretizations of 3D convection-dominated transport probl...
AbstractIterative methods preconditioned by incomplete factorizations and sparse approximate inverse...
. In this chapter, we give a brief overview of a particular class of preconditioners known as incomp...
AbstractWe study the stability of zero-fill incomplete LU factorizations of a nine-point coefficient...
Several new finite-difference schemes for a nonlinear convection-diffusion problem are constructed a...
A numerical study of the efficiency of the vectorized generalized conjugate residual methods (GCR) i...
In this paper we compare various preconditioners for the numerical solution of partial dierential eq...
An efficient algorithm to find the solution of transient convection–diffusion problems with dominant...
A numerical study of the efficiency of the generalized conjugate residual methods (GCR) is performed...
In this chapter, we give a brief overview of a particular class of preconditioners known as incomple...
The paper addresses the development of time‐accurate methods for solving transient convection–...
We propose an incomplete Cholesky factorization for the solution of large-scale trust region subprob...