On new surface-localized transmission eigenmodes

Abstract

Consider the transmission eigenvalue problem \[ (+k2n2) w=0,\ \ (+k2)v=0\ \ in\ \ ; w=v,\ \ ∂ w=∂ v=0\ \ on \ ∂. \] It is shown in [12] that there exists a sequence of eigenfunctions (wm, vm)m∈N associated with km→ ∞ such that either \wm\m∈N or \vm\m∈N are surface-localized, depending on n>1 or 0<n<1. In this paper, we discover a new type of surface-localized transmission eigenmodes by constructing a sequence of transmission eigenfunctions (wm, vm)m∈N associated with km→ ∞ such that both \wm\m∈N and \vm\m∈N are surface-localized, no matter n>1 or 0<n<1. Though our study is confined within the radial geometry, the construction is subtle and technical.