Eigenvalue asymptotics for the Schr\"odinger operator with a δ-interaction on a punctured surface
Abstract
Given n≥ 2, we put r=\i∈N; i>n/2 \. Let be acompact, Cr-smooth surface in Rn which contains the origin. Let further \Sε\0ε<η be a family of measurable subsets of such that x∈ Sε|x|= O(ε) as ε 0. We derive an asymptotic expansion for the discrete spectrum of the Schr\"odinger operator - -βδ(·- Sε) in L2(Rn), where β is a positive constant, as ε 0. An analogous result is given also for geometrically induced bound states due to a δ interaction supported by an infinite planar curve.
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