Boundary localization of transmission eigenfunctions in spherically stratified media

Abstract

Consider the transmission eigenvalue problem for u ∈ H1() and v∈ H1() associated with (; σ, n2), where is a ball in RN, N=2,3. If σ and n are both radially symmetric, namely they are functions of the radial parameter r only, we show that there exists a sequence of transmission eigenfunctions \um, vm\m∈N associated with km→+∞ as m→+∞ such that the L2-energies of vm's are concentrated around ∂. If σ and n are both constant, we show the existence of transmission eigenfunctions \uj, vj\j∈N such that both uj and vj are localized around ∂. Our results extend the recent studies in [15,16]. Through numerics, we also discuss the effects of the medium parameters, namely σ and n, on the geometric patterns of the transmission eigenfunctions.