论文信息 - Successive underrelaxation (SUR) and generalised conjugate gradient (GCG) methods for hyperbolic difference equations on a parallel computer

Successive underrelaxation (SUR) and generalised conjugate gradient (GCG) methods for hyperbolic difference equations on a parallel computer

Abstract When we consider the numerical solution of the 2-dimensional linear hyperbolic problem by implicit difference equations we need to solve a set of linear systems Ax = b with many rightband sides b, where A is large, sparse and nonsymmetric. The SUR (Successive Underrelaxation) and GCG (Generalised Conjugate Gradient) methods are used for solving the linear systems. We compare the two methods on sequential and parallel computations. Numerical results indicate that the SUR method is nearly twice as fast as the GCG method and the SUR method has an almost linear speedup.

David J. Evans | C. Li

[1] D. Young. Iterative methods for solving partial difference equations of elliptic type , 1954 .

[2] Changjun Li. Iterative methods for a class of large, sparse, nonsymmetric linear systems , 1989 .

[3] Wilhelm Niethammer. Relaxation bei Matrizen mit der Eigenschaft „A” , 1964 .

[4] Stanley C. Eisenstat. A Note on the Generalized Conjugate Gradient Method , 1983 .

[5] Willi Hock,et al. Lecture Notes in Economics and Mathematical Systems , 1981 .

[6] C. Li,et al. New stopping criteria for some iterative methods for a class of unsymmetric linear systems , 1991 .

[7] J. Ortega. Introduction to Parallel and Vector Solution of Linear Systems , 1988, Frontiers of Computer Science.

[8] O. Widlund. A Lanczos Method for a Class of Nonsymmetric Systems of Linear Equations , 1978 .

[9] C. Li,et al. Determination of the ^{1/2}-norm of the SOR iterative matrix for the unsymmetric case , 1989 .

[10] Louis A. Hageman,et al. Iterative Solution of Large Linear Systems. , 1971 .