Asymptotics of Robin eigenvalues for non-isotropic peaks

Abstract

Let ⊂ R3 be an open set such that align* & (-δ,δ)3=\(x1,x2,x3)∈ R2×(0,δ): \, (x1x3p,x2x3q)∈(-1,1)2\⊂R3, \\ & [-δ,δ]3 is a bounded Lipschitz domain, align* for some δ>0 and 1<p<q<2. If a set satisfies the first condition one says that it has a non-isotropic peak at 0. Now consider the operator Qα acting as the Laplacian u- u on with the Robin boundary condition ∂ u=α u on ∂, where ∂ is the outward normal derivative. We are interested in the strong coupling asymptotics of Qα. We prove that for large α the jth eigenvalue Ej(Qα) behaves as Ej(Qα)≈ Ajα22-q, where the constants Aj<0 are eigenvalues of a one dimensional Schr\"odinger operator which depends on p and q.