In this paper we investigate multigrid methods for a quad-curl problem on graded meshes. The approach is based on the Hodge decomposition. The solution for the quad-curl problem is approximated by solving standard second-order elliptic problems and optimal error estimates are obtained on graded meshes. We prove the uniform convergence of the multigrid algorithm for the resulting discrete problem. The performance of these methods is illustrated by numerical results
In this paper a local Fourier analysis for multigrid methods on tetrahedral grids is presented. Diff...
none5siIn this paper we consider a multigrid approach for solving elliptic equations over non-matchi...
Multigrid methods have been very active area of research since it was introduced in 1960’[19]. It is...
We develop and analyze P Lagrange finite element methods for a quad-curl problem on planar domains ...
In this work we investigate the numerical solution for two-dimensional Maxwell's equations on g...
We present an algebraic analysis of two-level multigrid methods for the solution of linear systems a...
We study a class of symmetric discontinuous Galerkin methods on graded meshes. Optimal order error e...
In this paper we analyze the convergence properties of two-level and W-cycle multigrid solvers for t...
Based on the theory for multigrid methods with nonnested spaces and noninherited quadratic forms, a ...
Abstract. We are concerned with the design and analysis of a multigrid algorithm for H(div; Ω)–ellip...
The symmetric interior penalty (SIP) method on graded meshes and its fast solution by multigrid meth...
In this paper we analyze the convergence properties of V -cycle multigrid algorithms for thenumerica...
We present a multigrid algorithm for the solution of the linear systems of equations stemming from t...
In this work we study finite element methods for two-dimensional Maxwell\u27s equations and their so...
This paper discusses multigrid for high dimensional partial differential equations (PDEs). We presen...
In this paper a local Fourier analysis for multigrid methods on tetrahedral grids is presented. Diff...
none5siIn this paper we consider a multigrid approach for solving elliptic equations over non-matchi...
Multigrid methods have been very active area of research since it was introduced in 1960’[19]. It is...
We develop and analyze P Lagrange finite element methods for a quad-curl problem on planar domains ...
In this work we investigate the numerical solution for two-dimensional Maxwell's equations on g...
We present an algebraic analysis of two-level multigrid methods for the solution of linear systems a...
We study a class of symmetric discontinuous Galerkin methods on graded meshes. Optimal order error e...
In this paper we analyze the convergence properties of two-level and W-cycle multigrid solvers for t...
Based on the theory for multigrid methods with nonnested spaces and noninherited quadratic forms, a ...
Abstract. We are concerned with the design and analysis of a multigrid algorithm for H(div; Ω)–ellip...
The symmetric interior penalty (SIP) method on graded meshes and its fast solution by multigrid meth...
In this paper we analyze the convergence properties of V -cycle multigrid algorithms for thenumerica...
We present a multigrid algorithm for the solution of the linear systems of equations stemming from t...
In this work we study finite element methods for two-dimensional Maxwell\u27s equations and their so...
This paper discusses multigrid for high dimensional partial differential equations (PDEs). We presen...
In this paper a local Fourier analysis for multigrid methods on tetrahedral grids is presented. Diff...
none5siIn this paper we consider a multigrid approach for solving elliptic equations over non-matchi...
Multigrid methods have been very active area of research since it was introduced in 1960’[19]. It is...