Spectral asymptotics of a strong δ' interaction on a planar loop

Abstract

We consider a generalized Schr\"odinger operator in L2(2) with an attractive strongly singular interaction of δ' type characterized by the coupling parameter β>0 and supported by a C4-smooth closed curve of length L without self-intersections. It is shown that in the strong coupling limit, β 0+, the number of eigenvalues behaves as 2Lπβ + (|β|), and furthermore, that the asymptotic behaviour of the j-th eigenvalue in the same limit is -4β2 +μj+(β|β|), where μj is the j-th eigenvalue of the Schr\"odinger operator on L2(0,L) with periodic boundary conditions and the potential -14 γ2 where γ is the signed curvature of .