Technologies (Oct 2020)
Asymptotic Justification of Models of Plates Containing Inside Hard Thin Inclusions
Abstract
An equilibrium problem of the Kirchhoff–Love plate containing a nonhomogeneous inclusion is considered. It is assumed that elastic properties of the inclusion depend on a small parameter characterizing the width of the inclusion ε as εN with N1. The passage to the limit as the parameter ε tends to zero is justified, and an asymptotic model of a plate containing a thin inhomogeneous hard inclusion is constructed. It is shown that there exists two types of thin inclusions: rigid inclusion (N−1) and elastic inclusion (N=−1). The inhomogeneity disappears in the case of N∈(−1,1).
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