In the classical Schwarz framework for conforming approximations of nonsymmetric and indefinite problems [5, 6] the finite element space is optimally decomposed into the sum of a finite number of uniformly overlapped, two-level subspaces. In each iteration step, a coarse mesh problem and a number of smaller linear systems, which correspond to the restriction of the original problem to subregions, are solved instead of the large original system of equations. Based on this decomposition, domain decomposition methods of three basic type-additive, multiplicative and hybrid Schwarz methods-have been studied in the literature (cf. [4, 5, 6]). In [1, 2] it was shown that for discontinuous Galerkin (DG) approximations of purely elliptic problems op...
In this article we address the question of efficiently solving the algebraic linear system of equati...
The application of the techniques of domain decomposition to construct effective preconditioners for...
In this paper we introduce and analyze some non-overlapping multiplicative Schwarz methods for disco...
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...
In recent years, domain decomposition (DD) techniques have been extensively used to solve efficientl...
We propose and study some new additive, two-level non-overlapping Schwarz preconditioners for the so...
We propose and study some new additive, two-level non-overlapping Schwarz preconditioners for the s...
We consider a scalar advection--diffusion problem and a recently proposed discontinuous Galerkin app...
The classical overlapping Schwarz algorithm is here extended to stabilized spectral element discreti...
In this paper we introduce and analyze some non-overlapping multiplicative Schwarz methods for disco...
We present a class of Schwarz preconditioners for discontinuous Galerkin approximations of elliptic ...
In this article we address the question of efficiently solving the algebraic linear system of equati...
The application of the techniques of domain decomposition to construct effective preconditioners for...
In this paper we introduce and analyze some non-overlapping multiplicative Schwarz methods for disco...
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...
In recent years, domain decomposition (DD) techniques have been extensively used to solve efficientl...
We propose and study some new additive, two-level non-overlapping Schwarz preconditioners for the so...
We propose and study some new additive, two-level non-overlapping Schwarz preconditioners for the s...
We consider a scalar advection--diffusion problem and a recently proposed discontinuous Galerkin app...
The classical overlapping Schwarz algorithm is here extended to stabilized spectral element discreti...
In this paper we introduce and analyze some non-overlapping multiplicative Schwarz methods for disco...
We present a class of Schwarz preconditioners for discontinuous Galerkin approximations of elliptic ...
In this article we address the question of efficiently solving the algebraic linear system of equati...
The application of the techniques of domain decomposition to construct effective preconditioners for...
In this paper we introduce and analyze some non-overlapping multiplicative Schwarz methods for disco...