Homogenization of linear elastic shells

~ generalized Hamilton's principle and the associated variational equation of motion for nonlinear elasticity theory are given in a previous paper (1). In this paper we present a modified linearized version, from which the corresponding variational principle for an isotropic shell of arbitrary unifo

The use of the boundary integral technique is extended to cylindrical shells through the . thickness shear using the Somigliana's approach. Orthotropic material is also considered. The use of the Green functional approach with its major disadvantage, is shown.

Thls work is a generalization to shallow shetl models of previous results for plates by B. Miara (1989). Using the same basis functions as in the plate case, we construct a Galerkin approximation of the three-dimensional linearized elasticity problem, and establish some error estimates as a function

Transient displacement and stress in thick inhomogeneous cylindrical and spherical shells is investigated for situations when the surfaces are subjected to dynamic loads consistent with the production of radial vibrations. In the first instance, transformation of the governing equations is sought to