On eigenvalue asymptotics for strong delta-interactions supported by surfaces with boundaries

Abstract

Let S⊂R3 be a C4-smooth relatively compact orientable surface with a sufficiently regular boundary. For β∈R+, let Ej(β) denote the jth negative eigenvalue of the operator associated with the quadratic form \[ H1(R3) u R3 |∇ u|2dx -β S |u|2dσ, \] where σ is the two-dimensional Hausdorff measure on S. We show that for each fixed j one has the asymptotic expansion \[ Ej(β)=-β24+μDj+ o(1) \; as \; β+∞\,, \] where μjD is the jth eigenvalue of the operator -S+K-M2 on L2(S), in which K and M are the Gauss and mean curvatures, respectively, and -S is the Laplace-Beltrami operator with the Dirichlet condition at the boundary of S. If, in addition, the boundary of S is C2-smooth, then the remainder estimate can be improved to O(β-1β).