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15.—The Propagation of Second-order Lipschitz Discontinuities in Quasi-linear Hyperbolic Systems with Discontinuous Coefficients

Published online by Cambridge University Press:  14 February 2012

Alan Jeffrey  and
Esin Inan
Alan Jeffrey
Affiliation:
Department of Engineering Mathematics, University of Newcastle upon Tyne.
Esin Inan
Affiliation:
Department of Engineering Mathematics, University of Newcastle upon Tyne.
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Synopsis

This paper develops the general theory of the propagation of Lipschitz discontinuities in first- and second-order partial derivatives of the initial data for a conservative quasi-linear hyperbolic system with discontinuous coefficients. After establishing that such weak discontinuities propagate along characteristics the appropriate transport equations are derived. The effect on this form of wave propagation of the strong discontinuity associatedwith the discontinuous coefficients is then studied and the transmission and reflection characteristics of the resulting waves are analysed. In conclusion, an application of this general theory is made to the propagation of plane shear waves through two different continuous hyperelastic solids to determine the transmitted and reflected waves.

Type
Research Article
Information
Proceedings of the Royal Society of Edinburgh Section A: Mathematics , Volume 74 , 1976 , pp. 205 - 224
Copyright
Copyright © Royal Society of Edinburgh 1976

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References

1Courant, R. and Hilbert, D.. Methods of mathematical physics, II(New York: Interscience, 1962).Google Scholar
2Friedrichs, K. O.. Nonlinear hyperbolic differential equations for functions of two independent variables. Amer. J. Math. 70 (1948), 555.CrossRefGoogle Scholar
3Courant, R. and Friedrichs, K. O.. Supersonic flow and shock waves (New York: Interscience, 1948).Google Scholar
4Douglis, A.. Existence theorems for hyperbolic systems. Comm. Pure Appl. Math 5 (1952), 119154.CrossRefGoogle Scholar
5Lax, P. D.. Nonlinear hyperbolic equations. Comm. Pure Appl. Math. 6 (1953), 231258.CrossRefGoogle Scholar
6Jeffrey, A. and Taniuti, T.. Nonlinear wave propagation (New York: Academic, 1964).Google Scholar
7Jeffrey, A.. The propagation of weak discontinuities in quasi-linear hyperbolic systems with discontinuous coefficients. Part I. Fundamental Theory. Applicable Anal. 3 (1973), 79100.CrossRefGoogle Scholar
8Jeffrey, A.. The propagation of weak discontinuities in quasi-linear hyperbolic systems with discontinuous coefficients. Part II. Special cases and application. Applicable Anal. 3 (1974), 359375.CrossRefGoogle Scholar
9Hill, R.. Progress in solid mechanics, II, 245276. Sneddon, I. N. and Hill, R., eds. (Amsterdam: North Holland, 1961).Google Scholar
10Green, W. A.. The growth of plane discontinuities propagating into a homogeneously deformed elastic material. Arch. Rational Anal. 16 (1964),7988.CrossRefGoogle Scholar
11Chu, B. T.. Finite amplitude waves in incompressible perfectly elastic materials. J. Mech. Phys. Solids. 12 (1964), 4557.CrossRefGoogle Scholar
12Collins, W. D.. One dimensional nonlinear wave propagation in incompressible elastic materials. Q. J. Mech. Appl. Math. 19 (1966), 259328.CrossRefGoogle Scholar
13Jeffrey, A. and Teymur, M.. Formation of shock waves in hyperelastic solids. Acta. Mech. 20 (1974), 133149.CrossRefGoogle Scholar
14Jeffrey, A.. Smooth fronted waves in the shallow water approximation. Proc. Roy. Soc. Edinburgh Sect. A, 73 (1975), 107116.CrossRefGoogle Scholar