AbstractA simple implementation on vector processors of the SOR method for solving a linear system of equations arising from the discretization of partial differential equations changes the SOR method into another, which, though, looks like the SOR method. In this paper, the efficiency of this SOR-like method (pseudo-SOR method) is investigated. For the Poisson equation in a rectangular region, in both five-point and nine-point discretization, we prove analytically that the optimal acceleration parameter is smaller and the optimal convergence rate is lower in the pseudo-SOR method. Comparison on several vector computers was made between the SOR method vectorized with the hyperplane technique and the pseudo-SOR method. It turned out that the...
The classical SOR (Successive Over-Relaxation) method is originated from the dissertation by D. Youn...
The Successive Over Relaxation (SOR) is a variant of the iterative Gauss-Seidel method for solving a...
AbstractThis paper refers to three iterative methods, namely the generalized extrapolated Jacobi (GJ...
AbstractA simple implementation on vector processors of the SOR method for solving a linear system o...
In this paper we investigate the performance of four different SOR acceleration techniques on a vari...
AbstractThe finite difference discretization of the Poisson equation with Dirichlet boundary conditi...
: A new relaxation analysis and two acceleration schemes are proposed for the five-point Red-Black G...
Recently, several proposals for the generalization of Young's SOR method to the saddle point pro...
A 2-level 4-color SOR method is proposed for the 9-point discretization of the Pois-son equation on ...
To provide the arithmetic power required by large-scale numerical simulations, the fastest computers...
AbstractAn analytic and empirical study of a new class of efficient iterative algorithms for solving...
Convergence difficulties that sometimes occur if the successive overrelaxation (SOR) method is appli...
Waveform relaxation is a numerical method for solving large-scale systems of ordinary differential e...
n. Itroduction The architectural differences between a serial and a parallel machine raise a number ...
The successive over relaxation (SOR) is a variant of the iterative Gauss-Seidel method for solving a...
The classical SOR (Successive Over-Relaxation) method is originated from the dissertation by D. Youn...
The Successive Over Relaxation (SOR) is a variant of the iterative Gauss-Seidel method for solving a...
AbstractThis paper refers to three iterative methods, namely the generalized extrapolated Jacobi (GJ...
AbstractA simple implementation on vector processors of the SOR method for solving a linear system o...
In this paper we investigate the performance of four different SOR acceleration techniques on a vari...
AbstractThe finite difference discretization of the Poisson equation with Dirichlet boundary conditi...
: A new relaxation analysis and two acceleration schemes are proposed for the five-point Red-Black G...
Recently, several proposals for the generalization of Young's SOR method to the saddle point pro...
A 2-level 4-color SOR method is proposed for the 9-point discretization of the Pois-son equation on ...
To provide the arithmetic power required by large-scale numerical simulations, the fastest computers...
AbstractAn analytic and empirical study of a new class of efficient iterative algorithms for solving...
Convergence difficulties that sometimes occur if the successive overrelaxation (SOR) method is appli...
Waveform relaxation is a numerical method for solving large-scale systems of ordinary differential e...
n. Itroduction The architectural differences between a serial and a parallel machine raise a number ...
The successive over relaxation (SOR) is a variant of the iterative Gauss-Seidel method for solving a...
The classical SOR (Successive Over-Relaxation) method is originated from the dissertation by D. Youn...
The Successive Over Relaxation (SOR) is a variant of the iterative Gauss-Seidel method for solving a...
AbstractThis paper refers to three iterative methods, namely the generalized extrapolated Jacobi (GJ...