Aspects of a distributed solution of the Brusselator equation

Author

Rauber, Thomas ; Runger, Gudula

Author_Institution

Dept. of Comput. Sci., Saarlandes Univ., Saarbrucken, Germany

fYear

1995

fDate

15-17 Mar 1995

Firstpage

114

Lastpage

120

Abstract

The spatial discretization of nonlinear partial differential equations (PDEs) results in large systems of nonlinear ordinary differential equations (ODEs). The discretization of the Brusselator equation is a characteristic example. For the parallel numerical solution of the Brusselator equation we use an iterated Runge-Kutta method. We propose modifications of the original method that exploit the access structure of the Brusselator equation. The implementation is realized on an Intel iPSC/860. A theoretical analysis of the resulting speedup values shows that the efficiency cannot be improved considerably

Keywords

Runge-Kutta methods; iterative methods; mathematics computing; nonlinear differential equations; parallel algorithms; parallel machines; partial differential equations; Brusselator equation; Intel iPSC/860; access structure; distributed solution; iterated Runge-Kutta method; nonlinear ordinary differential equations; nonlinear partial differential equations; parallel numerical solution; spatial discretization; speedup values; Chemicals; Computer science; Differential equations; Finite difference methods; Kinetic theory; Nonlinear equations; Partial differential equations; Runtime; Stability analysis; Velocity measurement;

fLanguage

English

Publisher

ieee

Conference_Titel

Parallel Algorithms/Architecture Synthesis, 1995. Proceedings., First Aizu International Symposium on

Conference_Location

Fukushima

Print_ISBN

0-8186-7038-X

Type

conf

DOI

10.1109/AISPAS.1995.401347

Filename

401347