Solution of linear initial value problems on a hypercube

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Authors
Neta, Beny
Subjects
initial value problems
parallel scheme
hypercube, box scheme
recursive doubling technique
Advisors
Date of Issue
1988-11
Date
1988-11
Publisher
Monterey, California. Naval Postgraduate School
Language
en_US
Abstract
There are many articles discussing the solution of boundary value problems on various parallel machines. The solution of initial value problems does not lend itself to parallelism, since in this case one uses methods that are sequential in nature. The authors develop a parallel scheme for initial value problems based on the box scheme and a modified recursive doubling technique. Fully implicit Runge Kutta Methods were discussed by Jackson and Norsett (1986) and Lie (1987). Lie assumes that each processor of the parallel computer having vector capabilities. (kr)
Type
Technical Report
Description
Series/Report No
Department
Applied Mathematics
Identifiers
NPS Report Number
NPS-53-89-001
Sponsors
This report was prepared in conjunction with research conducted for the National Science Foundation
Funder
funded through Texas Tech University
Format
Citation
Distribution Statement
Rights
This publication is a work of the U.S. Government as defined in Title 17, United States Code, Section 101. Copyright protection is not available for this work in the United States.
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