On the Robin eigenvalues of the Laplacian in the exterior of a convex polygon

Abstract

Let ⊂ R2 be the exterior of a convex polygon whose side lengths are 1,...,M. For α>0, let Hα denote the Laplacian in , u - u, with the Robin boundary conditions ∂ u/∂ =α u, where is the exterior unit normal at the boundary of . We show that, for any fixed m∈N, the mth eigenvalue Em(α) of Hα behaves as \[ Em(α)=-α2+μDm +O(1α) as α tends to +∞, \] where μDm stands for the mth eigenvalue of the operator D1... DM and Dn denotes the one-dimensional Laplacian f -f" on (0,n) with the Dirichlet boundary conditions.