Homogenization, dimension reduction and linearization of thin elastic plate
Abstract
This paper investigates the homogenization, dimension reduction, and linearization of a composite plate subjected to external loading within the framework of non-linear elasticity problem. The total elastic energy of the problem is of order h22a+3, where a≥1. The paper is divided into two parts: The first part presents the simultaneous homogenization, dimension reduction and linearization ((,h)(0,0)) of a composite plate without any coupling assumption of and h. The second part consists of the rigorous derivation of linearized elasticity as a limit of non-linear elasticity with small deformation and external loading conditions. The results obtained demonstrate that the limit energy remains unchanged when the first linearization (h 0) is performed, followed by simultaneous homogenization dimension reduction (0) and when both limits approach zero simultaneously, i.e. (,h) (0,0). The exact form of the limit energy(s) is obtained through the decomposition of plate deformations and plate displacements. By using the -convergence technique, the existence of a unique solution for the limit linearized homogenized energy problem is demonstrated. These results are then extended to certain periodic perforated plates.
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