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The Contact Problem for an Elastic Orthotropic Plate Supported by Periodically Located Bars of Equal Resistance

The Contact Problem for an Elastic Orthotropic Plate Supported by Periodically Located Bars of... The contact problem of the plane theory of elasticity is studied for an elastic orthotropic half-plane supported by periodically located (infinitely many) stringers of equal resistance. Using the methods of the theory of a complex variable, the problem is reduced to the Keldysh-Sedov type problem for a circle. The solution of the problem is constructed. http://www.deepdyve.com/assets/images/DeepDyve-Logo-lg.png Georgian Mathematical Journal Springer Journals

The Contact Problem for an Elastic Orthotropic Plate Supported by Periodically Located Bars of Equal Resistance

Gogolauri, L.
Georgian Mathematical Journal , Volume 5 (3) – Oct 4, 2004
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References (9)

Publisher
Springer Journals
Copyright
Copyright © 1998 by Plenum Publishing Corporation
Subject
Mathematics; Mathematics, general
ISSN
1072-947X
eISSN
1572-9176
DOI
10.1023/B:GEOR.0000008123.88506.8b
Publisher site
See Article on Publisher Site

Abstract

The contact problem of the plane theory of elasticity is studied for an elastic orthotropic half-plane supported by periodically located (infinitely many) stringers of equal resistance. Using the methods of the theory of a complex variable, the problem is reduced to the Keldysh-Sedov type problem for a circle. The solution of the problem is constructed.

Journal

Georgian Mathematical JournalSpringer Journals

Published: Oct 4, 2004

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