2D Schr\"odinger operators with singular potentials concentrated near curves

Abstract

We investigate the Schr\"odinger operators H=- +W+V in R2 with the short-range potentials V which are localized around a smooth closed curve γ. The operators H can be viewed as an approximation of the heuristic Hamiltonian H=-+W+a∂δγ+bδγ, where δγ is Dirac's δ-function supported on γ and ∂δγ is its normal derivative on γ. Assuming that the operator - +W has only discrete spectrum, we analyze the asymptotic behaviour of eigenvalues and eigenfunctions of H. The transmission conditions on γ for the eigenfunctions u+=α u-, α\, ∂ u+-∂ u-=β u-, which arise in the limit as 0, reveal a nontrivial connection between spectral properties of H and the geometry of γ.