International audienceWe analyze the convergence of the one-level overlapping domain decomposition preconditioner SORAS (Symmetrized Optimized Restricted Additive Schwarz) applied to a generic linear system whose matrix is not necessarily symmetric/self-adjoint nor positive definite. By generalizing the theory for the Helmholtz equation developed in [I.G. Graham, E.A. Spence, and J. Zou, SIAM J.Numer.Anal., 2020], we identify a list of assumptions and estimates that are sufficient to obtain an upper bound on the norm of the preconditioned matrix, and a lower bound on the distance of its field of values from the origin. We stress that our theory is general in the sense that it is not specific to one particular boundary value problem. Moreove...
We study the role of preconditioning strategies recently developed for coercive problems in connecti...
For an iterative solution of strongly nonsymmetric systems of linear algebraic equations we propose ...
The numerical solution of high-frequency Helmholtz problems by discretization methods such as the fi...
International audienceWe analyze the convergence of the one-level overlapping domain decomposition p...
We investigate numerically the influence of the choice of the partition of unity on the convergence ...
In this paper, we design some efficient domain decomposition preconditioners for the discontinuous P...
Abstract. In this paper we introduce a new Schwarz framework and theory, based on the well-known ide...
In the classical Schwarz framework for conforming approximations of nonsymmetric and indefinite prob...
In the classical Schwarz framework for conforming approximations of nonsymmetric and indefinite prob...
AbstractWe consider a new approach to the block SOR method applied to linear systems of equations wh...
This paper presents a preconditioner for non-overlapping Schwarz methods applied to the Helmholtz pr...
In this work a domain decomposition based preconditioner of the additive Schwarz type is developed a...
We consider a scalar advection--diffusion problem and a recently proposed discontinuous Galerkin app...
We study the role of preconditioning strategies recently developed for coercive problems in connecti...
For an iterative solution of strongly nonsymmetric systems of linear algebraic equations we propose ...
The numerical solution of high-frequency Helmholtz problems by discretization methods such as the fi...
International audienceWe analyze the convergence of the one-level overlapping domain decomposition p...
We investigate numerically the influence of the choice of the partition of unity on the convergence ...
In this paper, we design some efficient domain decomposition preconditioners for the discontinuous P...
Abstract. In this paper we introduce a new Schwarz framework and theory, based on the well-known ide...
In the classical Schwarz framework for conforming approximations of nonsymmetric and indefinite prob...
In the classical Schwarz framework for conforming approximations of nonsymmetric and indefinite prob...
AbstractWe consider a new approach to the block SOR method applied to linear systems of equations wh...
This paper presents a preconditioner for non-overlapping Schwarz methods applied to the Helmholtz pr...
In this work a domain decomposition based preconditioner of the additive Schwarz type is developed a...
We consider a scalar advection--diffusion problem and a recently proposed discontinuous Galerkin app...
We study the role of preconditioning strategies recently developed for coercive problems in connecti...
For an iterative solution of strongly nonsymmetric systems of linear algebraic equations we propose ...
The numerical solution of high-frequency Helmholtz problems by discretization methods such as the fi...