Stability analysis of the two-phase torsional rigidity near a radial configuration

Abstract

Let 0 denote the unit ball of RN (N 2) centered at the origin. We suppose that 0 contains a core, given by a smaller concentric ball D0, made of a (possibly) different material. We discover that, depending on the relative hardness of the two materials, this radial configuration can either be a local maximizer for the torsional rigidity functional E or a saddle shape. In this paper we consider perturbations that simultaneously act on the boundaries ∂ D0 and ∂0. This gives rise to resonance effects that are not present when ∂ D0 or ∂0 are perturbed in isolation. A detailed analysis of the sign of the second order shape derivative of E is then made possible by employing the use of spherical harmonics.