AbstractThe effectiveness of relaxation schemes for solving the systems of algebraic equations which arise from spectral discretizations of elliptic equations is examined. Iterative methods are an attractive alternative to direct methods because Fourier transform techniques enable the discrete matrix-vector products to be computed almost as efficiently as for corresponding but sparse finite difference discretizations. Preconditioning is found to be essential for acceptable rates of convergence. Preconditioners based on second-order finite difference methods are used. A comparison is made of the performance of different relaxation methods on model problems with a variety of conditions specified around the boundary. The investigations show th...
A domain decomposition method for second-order elliptic problems is considered. An iterative procedu...
Abstract. This paper discusses multigrid for high dimensional partial differential equa-tions (PDEs)...
Ph.D. (Applied Mathematics)In this thesis we introduce new numerical methods for solving nonlinear o...
The systems of algebraic equations which arise from spectral discretizations of elliptic equations a...
This work addresses the algorithmical aspects of spectral methods for elliptic equations. We focus o...
A detailed description of spectral multigrid methods is provided. This includes the interpolation an...
textabstractIn this paper we study the convergence of a multigrid method for the solution of a linea...
textabstractIn this paper we study a multigrid method for the solution of a linear second order el...
Iterative methods are the preferred solution for solving very large algebraic systems of equations. ...
This thesis is concerned with the solution of large systems of linear algebraic equations in which t...
In this paper we study the convergence of a multigrid method for the solution of a linear second ord...
Spectral element schemes for the solution of elliptic boundary value problems are considered. Precon...
Iterative substructuring methods are introduced and analyzed for saddle point problems with a penalt...
The efficiency of numerically solving time-dependent partial differential equations on parallel comp...
Abstract. Iterative methods are the preferred solution for solving very large algebraic systems of e...
A domain decomposition method for second-order elliptic problems is considered. An iterative procedu...
Abstract. This paper discusses multigrid for high dimensional partial differential equa-tions (PDEs)...
Ph.D. (Applied Mathematics)In this thesis we introduce new numerical methods for solving nonlinear o...
The systems of algebraic equations which arise from spectral discretizations of elliptic equations a...
This work addresses the algorithmical aspects of spectral methods for elliptic equations. We focus o...
A detailed description of spectral multigrid methods is provided. This includes the interpolation an...
textabstractIn this paper we study the convergence of a multigrid method for the solution of a linea...
textabstractIn this paper we study a multigrid method for the solution of a linear second order el...
Iterative methods are the preferred solution for solving very large algebraic systems of equations. ...
This thesis is concerned with the solution of large systems of linear algebraic equations in which t...
In this paper we study the convergence of a multigrid method for the solution of a linear second ord...
Spectral element schemes for the solution of elliptic boundary value problems are considered. Precon...
Iterative substructuring methods are introduced and analyzed for saddle point problems with a penalt...
The efficiency of numerically solving time-dependent partial differential equations on parallel comp...
Abstract. Iterative methods are the preferred solution for solving very large algebraic systems of e...
A domain decomposition method for second-order elliptic problems is considered. An iterative procedu...
Abstract. This paper discusses multigrid for high dimensional partial differential equa-tions (PDEs)...
Ph.D. (Applied Mathematics)In this thesis we introduce new numerical methods for solving nonlinear o...