Strong coupling asymptotics for a singular Schroedinger operator with an interaction supported by an open arc

Abstract

We consider a singular Schr\"odinger operator in L2(R2) written formally as - - βδ(x-γ) where γ is a C4 smooth open arc in R2 of length L with regular ends. It is shown that the jth negative eigenvalue of this operator behaves in the strong-coupling limit, β +∞, asymptotically as \[ Ej(β)=-β24 +μj +O(ββ), \] where μj is the jth Dirichlet eigenvalue of the operator \[ -d2ds2 -(s)24\, \] on L2(0,L) with (s) being the signed curvature of γ at the point s∈(0,L).