On vanishing near corners of transmission eigenfunctions

Abstract

Let be a bounded domain in Rn, n≥ 2, and V∈ L∞() be a potential function. Consider the following transmission eigenvalue problem for nontrivial v, w∈ L2() and k∈R+, \[(+k2)v= 0 in ,\] \[(+k2(1+V))w= 0 in ,\] \[w-v ∈ H20(), v L2()=1. \] We show that the transmission eigenfunctions v and w carry the geometric information of supp(V). Indeed, it is proved that v and w vanish near a corner point on ∂ in a generic situation where the corner possesses an interior angle less than π and the potential function V does not vanish at the corner point. This is the first quantitative result concerning the intrinsic property of transmission eigenfunctions and enriches the classical spectral theory for Dirichlet/Neumann Laplacian. We also discuss its implications to inverse scattering theory and invisibility.