The classical field and boundary equations governing the in-plane stretching and the transversal bending of a thin plate are obtained by means of an exact mathematical procedure consisting in integrating over the thickness the equilibrium equations for a three-dimensional cylindrical body, made of a homogeneous, linearly elastic, transversely isotropic material, and subject to suitable internal constraints.
Lembo, M. (1989). The Membranal and Flexural Equations of Thin Elastic Plates Deduced Exactly from the Three-Dimensional Linear Elasticity. MECCANICA, 24, 93-97.
The Membranal and Flexural Equations of Thin Elastic Plates Deduced Exactly from the Three-Dimensional Linear Elasticity
LEMBO, Marzio
1989-01-01
Abstract
The classical field and boundary equations governing the in-plane stretching and the transversal bending of a thin plate are obtained by means of an exact mathematical procedure consisting in integrating over the thickness the equilibrium equations for a three-dimensional cylindrical body, made of a homogeneous, linearly elastic, transversely isotropic material, and subject to suitable internal constraints.File in questo prodotto:
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