The contact problem in a compressible hyperelastic material

G. F. Wang; T. J. Wang; P. Schiavone

doi:10.1115/1.2711229

The contact problem in a compressible hyperelastic material

G. F. Wang
, T. J. Wang
, P. Schiavone

School of Aerospace Engineering

University of Alberta

Research output: Contribution to journal › Article › peer-review

3 Scopus citations

Abstract

We consider the contact problem for a particular class of compressible hyperelastic materials of harmonic type undergoing finite plane deformations. Using complex variable techniques, we derive subsidiary results concerning a half-plane problem corresponding to this class of materials. Using these results, we solve the contact problem for a harmonic material in the case of a uniform load acting on a finite area. Finally, we show how we can then deduce the corresponding results for the case of a point load.

Original language	English
Pages (from-to)	829-831
Number of pages	3
Journal	Journal of Applied Mechanics, Transactions ASME
Volume	74
Issue number	4
DOIs	https://doi.org/10.1115/1.2711229
State	Published - Jul 2007

Keywords

Contact problem
Finite elastic deformations
Harmonic materials

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10.1115/1.2711229

Cite this

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title = "The contact problem in a compressible hyperelastic material",

abstract = "We consider the contact problem for a particular class of compressible hyperelastic materials of harmonic type undergoing finite plane deformations. Using complex variable techniques, we derive subsidiary results concerning a half-plane problem corresponding to this class of materials. Using these results, we solve the contact problem for a harmonic material in the case of a uniform load acting on a finite area. Finally, we show how we can then deduce the corresponding results for the case of a point load.",

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AU - Schiavone, P.

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N2 - We consider the contact problem for a particular class of compressible hyperelastic materials of harmonic type undergoing finite plane deformations. Using complex variable techniques, we derive subsidiary results concerning a half-plane problem corresponding to this class of materials. Using these results, we solve the contact problem for a harmonic material in the case of a uniform load acting on a finite area. Finally, we show how we can then deduce the corresponding results for the case of a point load.

AB - We consider the contact problem for a particular class of compressible hyperelastic materials of harmonic type undergoing finite plane deformations. Using complex variable techniques, we derive subsidiary results concerning a half-plane problem corresponding to this class of materials. Using these results, we solve the contact problem for a harmonic material in the case of a uniform load acting on a finite area. Finally, we show how we can then deduce the corresponding results for the case of a point load.

KW - Contact problem

KW - Finite elastic deformations

KW - Harmonic materials

UR - https://www.scopus.com/pages/publications/34548260324

U2 - 10.1115/1.2711229

DO - 10.1115/1.2711229

M3 - 文章

AN - SCOPUS:34548260324

SN - 0021-8936

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SP - 829

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JO - Journal of Applied Mechanics, Transactions ASME

JF - Journal of Applied Mechanics, Transactions ASME

IS - 4

ER -

The contact problem in a compressible hyperelastic material

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Keywords

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