Title :
Parallel solution of a linear system using an SOR neural network
Author :
Delgado, Heriberto J. ; Fausett, Laurene V.
Author_Institution :
Florida Inst. of Technol., Melbourne, FL, USA
Abstract :
Successive over-relaxation (SOR) can be an efficient iterative method of solving linear systems of equations. However, parallel implementation depends on an appropriate structure in the coefficient matrix; for systems arising from discretization of the Poisson equation, a red-black ordering of the unknowns is suitable. One difficulty in utilizing SOR is the necessity of choosing a good value for the relaxation parameter, ω. We present a neural network for solving the Poisson equation applied to electrostatics. The neural network learns a good value for ω as it solves the linear system. The algorithm is based on the standard parallel SOR method. The performance of the sequential SOR and Jacobi methods are compared with the neural network for two sample problems
Keywords :
electrostatics; iterative methods; learning (artificial intelligence); linear algebra; matrix algebra; neural nets; parallel algorithms; relaxation theory; stochastic processes; Jacobi methods; Poisson equation; SOR neural network; algorithm; coefficient matrix; electrostatics; iterative method; linear equations; linear system; neural network training; parallel SOR method; parallel implementation; parallel solution; performance; red-black ordering; relaxation parameter; sequential SOR; successive over-relaxation; Algorithm design and analysis; Ear; Electrostatics; Gaussian processes; Iterative algorithms; Iterative methods; Jacobian matrices; Linear systems; Neural networks; Poisson equations;
Conference_Titel :
Southcon/96. Conference Record
Conference_Location :
Orlando, FL
Print_ISBN :
0-7803-3268-7
DOI :
10.1109/SOUTHC.1996.535110
