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BRIEF NOTES

Nonsingular Boundary Integral Equations for Two-Dimensional Anisotropic Elasticity

[+] Author and Article Information
K.-C. Wu

Institute of Applied Mechanics, National Taiwan University, Taipei, Taiwan, R.O.C.

J. Appl. Mech 67(3), 618-621 (Jan 14, 2000) (4 pages) doi:10.1115/1.1308576 History: Received September 15, 1999; Revised January 14, 2000
Copyright © 2000 by ASME
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References

Wu,  K.-C., Chiu,  Y.-T., and Hwu,  Z.-H., 1992, “A New Boundary Integral Equation Formulation for Linear Elastic Solids,” ASME J. Appl. Mech., 9, pp. 344–348.
Stroh,  A. N., 1958, “Dislocations and Cracks in Anisotropic Elasticity,” Philos. Mag., 3, pp. 625–646.
Ting, T. C. T., 1996, Anisotropic Elasticity—Theory and Application, Oxford University Press, New York.
Barnett,  D. M., and Lothe,  J., 1973, “Synthesis of the Sextic and the Integral Formalism for Dislocations, Green’s Function and Surface Waves in Anisotropic Elastic Solids,” Phys. Norv., 7, pp. 13–19.
Filon,  L. N. G., 1903, “On an Approximate Solution for the Bending of a Beam of Rectangular Cross-Section Under Any System of Load, With Special Reference to Points of Concentrated or Discontinuous Loading,” Philosophical Transaction of the Royal Society of London, A201, pp. 63–155.
Chiu,  Y.-T., and Wu,  K.-C., 1998, “Analysis for Elastic Strips Under Concentrated Loads,” ASME J. Appl. Mech., 65, pp. 626–634.

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Grahic Jump Location
An infinite plate subjected to a pair of collinear compressive line forces

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