A variational-hemivariational inequality approach to the laminated plate theory under subdifferential boundary conditions
Authors:
P. D. Panagiotopoulos and G. E. Stavroulakis
Journal:
Quart. Appl. Math. 46 (1988), 409-430
MSC:
Primary 73K20; Secondary 49A29, 73C60, 73K10
DOI:
https://doi.org/10.1090/qam/963579
MathSciNet review:
963579
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Abstract: In this paper the delamination problem for laminated plates is studied. A nonmonotone multivalued law is introduced in order to describe the interlaminar bonding forces. This law is written as the generalized gradient in the sense of F. H. Clarke of an appropriately defined nonconvex superpotential. Moreover, monotone boundary conditions of the subdifferential type are assumed to hold. The problem is formulated as a variational-hemivariational inequality expressing the principle of virtual work in inequality form. By using compactness and monotonicity arguments, the existence and the approximation of the solution of this inequality are investigated.
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P. D. Panagiotopoulos, Nonconvex energy functions. Hemivariational inequalities and substationarity principles, Acta Mech. 48, 160–183 (1983)
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P. D. Panagiotopoulos, Hemivariational inequalities and substationarity in the static theory of v. Kármán plates, Z. Angew. Math. Mech. 65, 219–229 (1985)
R. Jones, Mechanics of composite materials, McGraw-Hill-Scripta, New York, Washington, D. C., 1975
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J. Rauch, Discontinuous semilinear differential equations and multiple valued maps, Proc. Amer. Math. Soc. 64, 277–282 (1977)
R. T. Rockafellar, Convex analysis, Princeton University Press, Princeton, N. J., 1970
J. P. Aubin and F. H. Clarke, Shadow prices and duality for a class of optimal control problems, SIAM J. Control Optim. 17, 567–586 (1979)
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Article copyright:
© Copyright 1988
American Mathematical Society