Abstract
It is shown that the solution of a three-dimensional linear elasticity problem in a thin folded plate converges strongly inH 1 to a solution of a two-dimensional model as the thickness goes to 0. This model consists of two plate equations coupled through their common edge.
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References
Adams, R. A. (1975): Sobolev spaces. New York: Academic Press
Aganovič, I.; Tutek, Z. (1986): A justification of the one-dimensional model of elastic beam. Math. Meth. Appl. Sci. 8, 1–14
Bermudez, A.; Viaño, J. M. (1984): Une justification des équations de la thermoélasticité des poutres à section variable par des máthodes asymptotiques. R. A. I. R. O. Analyse Numérique 18, 347–376
Ciarlet, P. G.; Destuynder, P. (1979): A justification of a nonlinear model in plate theory. Comp. Meth. Appl. Mech. Engrg. 17/18, 227–258
Ciarlet, P. G. (1980): A justification of the von Kármán equations. Arch. Rat. Mech. Anal. 73, 349–389
Ciarlet, P. G. (1987): Recent progresses in the two-dimensional approximation of three-dimensional plate models in nonlinear elasticity. In: Ortiz, E. L. (Ed.): Numerical approximation of partial differential equations, pp. 3–19. Amsterdam: North-Holland
Ciarlet, P. G. (1988 a): Mathematical elasticity. Amsterdam: North-Holland
Ciarlet, P. G. (1988 b): Junctions between plates and rods (in preparation)
Ciarlet, P. G.; Le Dret, H.; Nzengwa, R. (1988): Junctions between three-dimensional and two-dimensional linearly elastic structures. To appear in J. Math. Pures Appl.
Cimetière, A.; Geymonat, G.; Le Dret, H.; Raoult, A.; Tutek, Z. (1988): Asymptotic theory and analysis for displacements and stress distribution in nonlinear elastic straight slender rods. J. Elasticity 19, 111–161
Colson, A. (1984): Modélisation des conditions aux limites de liaisons et d'assemblages en mécanique des structures métalliques. Doctoral Dissertation, Université Paris 6
Destuynder, P. (1986): Une théorie asymptotique des plaques minces en élasticité linéaire. Paris: R. M. A. Masson
Lions, J. L.; Magenes, E. (1968 a): Problèmes aux limites non homogenes et applications. Vol. 1 Paris: Dunod
Lions, J. L.; Magenes, E. (1968 b): Problèmes aux limites non homogènes et applications. Vol. 2 Paris: Dunod
Marsden, J. E.; Hughes, T. J. R. (1983): Mathematical foundations of elasticity. Englewood Cliffs: Prentice-Hall
Rigolot, A. (1976): Sur une théorie asymptotique des poutres. Doctoral Dissertation, Université Paris 6
Wang, C. C.; Truesdell, C. (1975): Introduction to rational elasticity. Groningen: Noordhoff
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Le Dret, H. Modeling of a folded plate. Computational Mechanics 5, 401–416 (1990). https://doi.org/10.1007/BF01113445
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DOI: https://doi.org/10.1007/BF01113445