Abstract—This work tackles the evaluation of a multigrid cycling strategy using inner flexible Krylov subspace iterations. It provides a valuable improvement to the Reitzinger and Schöberl algebraic multigrid method for systems coming from edge-element discretizations. I
. An algebraic multigrid algorithm for symmetric, positive definite linear systems is developed base...
Abstract: A multigrid algorithm for the solution of stabilized finite element discretiza...
Abstract. In this paper we develop a robust multigrid preconditioned Krylov subspace method for the ...
International audienceThis work tackles the evaluation of a multigrid cycling strategy using inner f...
International audienceThis work tackles the evaluation of an algebraic multigrid method using inner ...
International audienceAn algebraic multigrid algorithm based on element agglomeration is proposed fo...
This paper presents an algebraic multigrid method for the ecient so-lution of the linear system aris...
We consider a modification of the Reitzinger-Schöberl algebraic multigrid method for the iterative s...
We consider multigrid (MG) cycles based on the recursive use of a two-grid method, in which the coar...
We consider a modification of the Reitzinger-Schöberl algebraic multigrid method for the iterative s...
We present an algebraic analysis of two-level multigrid methods for the solution of linear systems a...
We are interested in computing eigenvalues and eigenvectors of matrices derived from differential eq...
Standard multigrid algorithms have proven ineffective for the solution of discretizations of Helmhol...
We consider multi-iterative techniques of multigrid type for the numerical solution of large linear ...
Abstract. We introduce AMGe, an algebraic multigrid method for solving the discrete equations that a...
. An algebraic multigrid algorithm for symmetric, positive definite linear systems is developed base...
Abstract: A multigrid algorithm for the solution of stabilized finite element discretiza...
Abstract. In this paper we develop a robust multigrid preconditioned Krylov subspace method for the ...
International audienceThis work tackles the evaluation of a multigrid cycling strategy using inner f...
International audienceThis work tackles the evaluation of an algebraic multigrid method using inner ...
International audienceAn algebraic multigrid algorithm based on element agglomeration is proposed fo...
This paper presents an algebraic multigrid method for the ecient so-lution of the linear system aris...
We consider a modification of the Reitzinger-Schöberl algebraic multigrid method for the iterative s...
We consider multigrid (MG) cycles based on the recursive use of a two-grid method, in which the coar...
We consider a modification of the Reitzinger-Schöberl algebraic multigrid method for the iterative s...
We present an algebraic analysis of two-level multigrid methods for the solution of linear systems a...
We are interested in computing eigenvalues and eigenvectors of matrices derived from differential eq...
Standard multigrid algorithms have proven ineffective for the solution of discretizations of Helmhol...
We consider multi-iterative techniques of multigrid type for the numerical solution of large linear ...
Abstract. We introduce AMGe, an algebraic multigrid method for solving the discrete equations that a...
. An algebraic multigrid algorithm for symmetric, positive definite linear systems is developed base...
Abstract: A multigrid algorithm for the solution of stabilized finite element discretiza...
Abstract. In this paper we develop a robust multigrid preconditioned Krylov subspace method for the ...