Asymptotic behavior of an elastic beam fixed on a small part of one of its extremities

Abstract

We study the asymptotic behavior of the solution of an anisotropic, heterogeneous, linearized elasticity problem in a cylinder whose diameter ε tends to zero. The cylinder is assumed to be fixed (homogeneous Dirichlet boundary condition) on the whole of one of its extremities, but only on a small part (of size ε rε) of the second one; the Neumann boundary condition is assumed on the remainder of the boundary. We show that the result depends on rε, and that there are 3 critical sizes, namely rε=ε3, rε=ε, and rε=ε1/3, and in total 7 different regimes. We also prove a corrector result for each behavior of rε.

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