Symmetry in the composite plate problem

Abstract

In this paper we deal with the composite plate problem, namely the following optimization eigenvalue problem ∈f ∈ P ∈fu ∈ W\0\ ∫( u)2∫ u2, where P is a class of admissible densities, W= H20() for Dirichlet boundary conditions and W= H2() H10() for Navier boundary conditions. The associated Euler-Lagrange equation is a fourth-order elliptic PDE governed by the biharmonic operator 2. In the spirit of [10], we study qualitative properties of the optimal pairs (u,). In particular, we prove existence and regularity and we find the explicit expression of . When is a ball, we can also prove uniqueness of the optimal pair, as well as positivity of u and radial symmetry of both u and .