Strong coupling asymptotics for δ-interactions supported by curves with cusps

Abstract

Let ⊂ R2 be a simple closed curve which is smooth except at the origin, at which it has a power cusp and coincides with the curve |x2|=x1p for some p>1. We study the eigenvalues of the Schr\"odinger operator Hα with the attractive δ-potential of strength α>0 supported by , which is defined by its quadratic form \[ H1(R2) u R2 |∇ u|2\,dx-α∫ u2\, ds, \] where ds stands for the one-dimensional Hausdorff measure on . It is shown that if n∈N is fixed and α is large, then the well-defined nth eigenvalue En(Hα) of Hα behaves as \[ En(Hα)=-α2 + 22p+2 En \,α6p+2 + O(α6p+2-η), \] where the constants En>0 are the eigenvalues of an explicitly given one-dimensional Schr\"odinger operator determined by the cusp, and η>0. Both main and secondary terms in this asymptotic expansion are different from what was observed previously for the cases when~ is smooth or piecewise smooth with non-zero angles.