Add to ORKGWe study the parallelization of linearly--implicit extrapolation codes for the solution of large scale PDE systems and differential algebraic equations on distributed memory machines. The main advantage of these algorithms is that they enable adapativity both in time and space. Additive Krylov--Schwarz methods yield high parallel perfomance for such extrapolation methods. Our approach combines a slightly overlapping domain decomposition together with a polynomial block Neumann preconditioner and a reduced system technique. Furthermore we get important advantages through the explicit computation of the matrix--products of the preconditioner and the matrix of the linear system. The parallel algorithms exhibit scalability up to 64 processors a...
Solving initial value problems (IVP) for ordinary differential equations (ODE) has long been believe...
In the simulation of multibody systems, the equations of motion are generated by so-called multibody...
In this paper we review several methods for solving large sparse linear systems arising from discret...
We study the parallelization of linearly--implicit extrapolation methods for the solution of large s...
Extrapolation methods can be used to accelerate the convergence of vector sequences. It is shown ho...
In this work we investigate the parallel scalability of variants of additive Schwarz preconditioners...
Based on a hierarchical modular modeling the large nonlinear systems of differential algebraic equat...
Based on a hierarchical modular modeling the large nonlinear systems of differential algebraic equat...
Abstract. Domain decomposition (Krylov-Schwarz) iterative methods are natural for the parallel impli...
This paper describes and tests a parallel implementation of a factorized approximate inverse precond...
. Domaindecomposition (Krylov-Schwarz) iterative methods are natural for the parallel implicit solut...
In the common implicit integration schemes of fluid-dynamics equations, the need to solve a linear s...
In this thesis, we study polynomial extrapolation methods. We discuss the design and implementation ...
We study a parallel Newton-Krylov-Schwarz (NKS) based algorithm for solving large sparse systems...
Newton-Krylov-Schwarz methods are increasingly applied in Computational Fluid Dynamics (CFD). We dev...
Solving initial value problems (IVP) for ordinary differential equations (ODE) has long been believe...
In the simulation of multibody systems, the equations of motion are generated by so-called multibody...
In this paper we review several methods for solving large sparse linear systems arising from discret...
We study the parallelization of linearly--implicit extrapolation methods for the solution of large s...
Extrapolation methods can be used to accelerate the convergence of vector sequences. It is shown ho...
In this work we investigate the parallel scalability of variants of additive Schwarz preconditioners...
Based on a hierarchical modular modeling the large nonlinear systems of differential algebraic equat...
Based on a hierarchical modular modeling the large nonlinear systems of differential algebraic equat...
Abstract. Domain decomposition (Krylov-Schwarz) iterative methods are natural for the parallel impli...
This paper describes and tests a parallel implementation of a factorized approximate inverse precond...
. Domaindecomposition (Krylov-Schwarz) iterative methods are natural for the parallel implicit solut...
In the common implicit integration schemes of fluid-dynamics equations, the need to solve a linear s...
In this thesis, we study polynomial extrapolation methods. We discuss the design and implementation ...
We study a parallel Newton-Krylov-Schwarz (NKS) based algorithm for solving large sparse systems...
Newton-Krylov-Schwarz methods are increasingly applied in Computational Fluid Dynamics (CFD). We dev...
Solving initial value problems (IVP) for ordinary differential equations (ODE) has long been believe...
In the simulation of multibody systems, the equations of motion are generated by so-called multibody...
In this paper we review several methods for solving large sparse linear systems arising from discret...