Asymptotic Derivation of Nonlinear Plate Models from Three-Dimensional Elasticity Theory

Tipo de material: Texto

TextoSeries ; In Recent Developments in the Theory of Shells. Springer, Cham., p.591-614, 2019Trabajos contenidos:

Shirani, M
Steigmann, D. J

Tema(s):

ASYMPTOTIC DERIVATION

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Resumen: A framework for the asymptotic derivation of plate models from three-dimensional elasticity theory is reviewed and extended. This is shown to subsume the pure membrane and bending limits that have been derived via gamma convergence or alternative asymptotic methods, and to incorporate Koiter's model for finite deformations with small midsurface strains. A model that accommodates large midsurface strains and which satisfies the relevant Legendre-Hadamard necessary condition for energy minimizers is also proposed.

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Item type	Current library	Collection	Call number	Status	Date due	Barcode
Documentos solicitados	CICY Documento préstamo interbibliotecario	Ref1	B-17927 (Browse shelf(Opens below))	Available

A framework for the asymptotic derivation of plate models from three-dimensional elasticity theory is reviewed and extended. This is shown to subsume the pure membrane and bending limits that have been derived via gamma convergence or alternative asymptotic methods, and to incorporate Koiter's model for finite deformations with small midsurface strains. A model that accommodates large midsurface strains and which satisfies the relevant Legendre-Hadamard necessary condition for energy minimizers is also proposed.

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