We introduce a two-level preconditioner for the efficient solution of large scale saddle point linear systems arising from the finite element (FE) discretization of parametrized Stokes equations. This preconditioner extends the Multi Space Reduced Basis (MSRB) preconditioning method proposed in Dal Santo et al. (2018); it combines an approximated block (fine grid) preconditioner with a reduced basis (RB) solver which plays the role of coarse component. A sequence of RB spaces, constructed either with an enriched velocity formulation or a Petrov - Galerkin projection, is built. Each RB coarse component is defined to perform a single iteration of the iterative method at hand. The flexible GMRES (FGMRES) algorithm is employed to solve the resu...
We study a parallel implementation of different preconditioning techniques for the iterative solutio...
To solve saddle point systems efficiently, several preconditioners have been published. There are ma...
Standard discretizations of Stokes problems lead to linear systems of equations in saddle point form...
We introduce a two-level preconditioner for the efficient solution of large scale saddle-point linea...
In this work we introduce a new two-level preconditioner for the efficient solution of large-scale l...
In this work we introduce a new two-level preconditioner for the efficient solution of large scale l...
In this paper we introduce a new preconditioner for linear systems of saddle point type arising from...
This paper is concerned with the implementation of efficient solution algorithms for elliptic pro...
Abstract. We investigate several robust preconditioners for solving the saddle-point linear systems ...
Efficient incompressible flow simulations, using inf-sup stable pairs of finite element spaces, requ...
We analyze the numerical performance of a preconditioning technique recently proposed in [4] for the...
The reduced basis element method is a new approach for approximating the solution of problems descr...
This paper studies a new preconditioning technique for sparse systems arising from discretized parti...
Abstract. In this paper, we revisit an auxiliary space preconditioning method proposed by Xu [Comput...
AbstractA parameterized preconditioning framework is proposed to improve the conditions of the gener...
We study a parallel implementation of different preconditioning techniques for the iterative solutio...
To solve saddle point systems efficiently, several preconditioners have been published. There are ma...
Standard discretizations of Stokes problems lead to linear systems of equations in saddle point form...
We introduce a two-level preconditioner for the efficient solution of large scale saddle-point linea...
In this work we introduce a new two-level preconditioner for the efficient solution of large-scale l...
In this work we introduce a new two-level preconditioner for the efficient solution of large scale l...
In this paper we introduce a new preconditioner for linear systems of saddle point type arising from...
This paper is concerned with the implementation of efficient solution algorithms for elliptic pro...
Abstract. We investigate several robust preconditioners for solving the saddle-point linear systems ...
Efficient incompressible flow simulations, using inf-sup stable pairs of finite element spaces, requ...
We analyze the numerical performance of a preconditioning technique recently proposed in [4] for the...
The reduced basis element method is a new approach for approximating the solution of problems descr...
This paper studies a new preconditioning technique for sparse systems arising from discretized parti...
Abstract. In this paper, we revisit an auxiliary space preconditioning method proposed by Xu [Comput...
AbstractA parameterized preconditioning framework is proposed to improve the conditions of the gener...
We study a parallel implementation of different preconditioning techniques for the iterative solutio...
To solve saddle point systems efficiently, several preconditioners have been published. There are ma...
Standard discretizations of Stokes problems lead to linear systems of equations in saddle point form...