A note on anti-plane shear for compressible materials in finite elastostatics

James K. Knowles

doi:10.1017/S0334270000001399

Abstract

Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.

This note gives a necessary and sufficient condition that a compressible, isotropic elastic material should admit non-trivial states of finite anti-plane shear.

References

[1]Adkins, J. E., “Some generalizations of the shear problem for isotropic incompressible materials”, Proc. Cambridge Philos. Soc. 50 (1954), 334.CrossRef Google Scholar

[2]Blatz, P. J. and Ko, W. L., “Application of finite elastic theory to the deformation of rubbery materials”, Trans. Soc. Rheology 6 (1962), 223.CrossRef Google Scholar

[3]Courant, R. and Hilbert, D., Methods of Mathematical Physics, Vol 2, Interscience, New York (1962).Google Scholar

[4]Green, A. E. and Adkins, J. E., Large Elastic Deformations, Clarendon Press, Oxford (1960).Google Scholar

[5]John, F., “Plane elastic waves of finite amplitude. Hadamard materials and harmonic materials”, Communications on Pure and Applied Mathematics 19 (1966), 309.CrossRef Google Scholar

[6]Knowles, J. K., “On finite anti-plane shear for incompressible elastic materials”, J. Aust. Math. Soc. Series B Vol. 21 Part 4, (1976).Google Scholar

[7]Truesdell, C. and Noll, W., “The nonlinear field theories of mechanics”, Handbuch der Physik, Vol. 3/1, Springer, Berlin (1965).Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Knowles, James K. 1979. On the dissipation associated with equilibrium shocks in finite elasticity. Journal of Elasticity, Vol. 9, Issue. 2, p. 131.

Agarwal, V. K. 1979. On finite anti-plane shear for compressible elastic circular tube. Journal of Elasticity, Vol. 9, Issue. 3, p. 311.

Knowles, James K. 1979. Universal States of Finite Anti-Plane Shear: Ericksen's Problem in Miniature. The American Mathematical Monthly, Vol. 86, Issue. 2, p. 109.

Gurtin, Morton E. and Temam, Roger 1981. On the anti-plane shear problem in finite elasticity. Journal of Elasticity, Vol. 11, Issue. 2, p. 197.

Ertepinar, A. 1985. Finite deformations of compressible hyperelastic tubes subjected to circumferential shear. International Journal of Engineering Science, Vol. 23, Issue. 11, p. 1187.

Aron, M. 1988. A note on undistorted states of isotropic elastic solids. Journal of Elasticity, Vol. 19, Issue. 2, p. 179.

Abeyaratne, Rohan and Guo-Hua, Jiang 1989. Dilatationally nonlinear elastic materials—I. Some theory. International Journal of Solids and Structures, Vol. 25, Issue. 10, p. 1201.

1990. Nonlinear Theory of Elasticity. Vol. 36, Issue. , p. 595.

Ertepinar, A. and Erarslanoğlu, G. 1990. Finite anti-plane shear of compressible hyperelastic tubes. International Journal of Engineering Science, Vol. 28, Issue. 5, p. 399.

Jiang, Qing and Knowles, James K. 1991. A class of compressible elastic materials capable of sustaining finite anti-plane shear. Journal of Elasticity, Vol. 25, Issue. 3, p. 193.

Ertepinar, Aybar 1991. Compressible, hyperelastic, spinning tubes subjected to radial pressure. International Journal of Non-Linear Mechanics, Vol. 26, Issue. 5, p. 753.

Ertepinar, A. 1991. Compressible, hyperelastic spinning tubes subjected to circumferential shear. International Journal of Engineering Science, Vol. 29, Issue. 2, p. 203.

Jiang, Qing 1993. On the modeling of thermo-mechanical phase transformations in solids. Journal of Elasticity, Vol. 32, Issue. 1, p. 61.

1994. Stability in Viscoelasticity. Vol. 38, Issue. , p. 1.

Tsai, Hungyu and Rosakis, Phoebus 1994. On anisotropic compressible materials that can sustain elastodynamic anti-plane shear. Journal of Elasticity, Vol. 35, Issue. 1-3, p. 213.

Horgan, C. O. 1995. Anti-Plane Shear Deformations in Linear and Nonlinear Solid Mechanics. SIAM Review, Vol. 37, Issue. 1, p. 53.

Beatty, M. F. 1996. Nonlinear Effects in Fluids and Solids. p. 13.

Gao, Xin-Lin 1996. A mathematical analysis of the elastoplastic anti-plane shear problem of a power-law material and one class of closed-form solutions. International Journal of Solids and Structures, Vol. 33, Issue. 15, p. 2213.

Jiang, X. and Ogden, R.W. 2000. Some new solutions for the axial shear of a circular cylindrical tube of compressible elastic material. International Journal of Non-Linear Mechanics, Vol. 35, Issue. 2, p. 361.

Beatty, Millard F. 2001. Topics in Finite Elasticity. p. 31.

Download full list

Article contents

A note on anti-plane shear for compressible materials in finite elastostatics

Abstract

References

Save article to Kindle

Save article to Dropbox

Save article to Google Drive

Reply to: Submit a response

Your details

You have entered the maximum number of contributors

Conflicting interests