Implementation of the Multicolored SOR Method on a Vector Supercomputer

Seiji FUJINO; Ryutaro HIMENO; Akira KOJIMA; Kazuo TERADA

Implementation of the Multicolored SOR Method on a Vector Supercomputer

Seiji FUJINO, Ryutaro HIMENO, Akira KOJIMA, Kazuo TERADA

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We describe the implementation of an iterative method with the goal of gaining a long vector length. The strategy for vectorization by means of multipoint stencils used for discretization of the partial differential equations is discussed. Numerical experiments show that the strategy that requires certain restrictions on the number of grid points in the x and y directions improves the performance on the vector supercomputer.

Publication: IEICE TRANSACTIONS on Information Vol.E80-D No.4 pp.518-523

Publication Date: 1997/04/25

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Type of Manuscript: Special Section PAPER (Special Issue on Parallel and Distributed Supercomputing)

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Seiji FUJINO, Ryutaro HIMENO, Akira KOJIMA, Kazuo TERADA, "Implementation of the Multicolored SOR Method on a Vector Supercomputer" in IEICE TRANSACTIONS on Information, vol. E80-D, no. 4, pp. 518-523, April 1997, doi: .
Abstract: We describe the implementation of an iterative method with the goal of gaining a long vector length. The strategy for vectorization by means of multipoint stencils used for discretization of the partial differential equations is discussed. Numerical experiments show that the strategy that requires certain restrictions on the number of grid points in the x and y directions improves the performance on the vector supercomputer.
URL: https://global.ieice.org/en_transactions/information/10.1587/e80-d_4_518/_p

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author={Seiji FUJINO, Ryutaro HIMENO, Akira KOJIMA, Kazuo TERADA, },
journal={IEICE TRANSACTIONS on Information},
title={Implementation of the Multicolored SOR Method on a Vector Supercomputer},
year={1997},
volume={E80-D},
number={4},
pages={518-523},
abstract={We describe the implementation of an iterative method with the goal of gaining a long vector length. The strategy for vectorization by means of multipoint stencils used for discretization of the partial differential equations is discussed. Numerical experiments show that the strategy that requires certain restrictions on the number of grid points in the x and y directions improves the performance on the vector supercomputer.},
keywords={},
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month={April},}

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TY - JOUR
TI - Implementation of the Multicolored SOR Method on a Vector Supercomputer
T2 - IEICE TRANSACTIONS on Information
SP - 518
EP - 523
AU - Seiji FUJINO
AU - Ryutaro HIMENO
AU - Akira KOJIMA
AU - Kazuo TERADA
PY - 1997
DO -
JO - IEICE TRANSACTIONS on Information
SN -
VL - E80-D
IS - 4
JA - IEICE TRANSACTIONS on Information
Y1 - April 1997
AB - We describe the implementation of an iterative method with the goal of gaining a long vector length. The strategy for vectorization by means of multipoint stencils used for discretization of the partial differential equations is discussed. Numerical experiments show that the strategy that requires certain restrictions on the number of grid points in the x and y directions improves the performance on the vector supercomputer.
ER -