Weakly coupled bound state of 2D Schr\"odinger operator with potential-measure

Abstract

We consider a self-adjoint two-dimensional Schr\"odinger operator Hαμ, which corresponds to the formal differential expression \[ - - αμ, \] where μ is a finite compactly supported positive Radon measure on R2 from the generalized Kato class and α >0 is the coupling constant. It was proven earlier that σ ess(Hαμ) = [0,+∞). We show that for sufficiently small α the condition σ d(Hαμ) = 1 holds and that the corresponding unique eigenvalue has the asymptotic expansion λ(α) = -(Cμ + o(1))(-4παμ( R2)), α→ 0+, with a certain constant Cμ > 0. We obtain also the formula for the computation of Cμ. The asymptotic expansion of the corresponding eigenfunction is provided. The statements of this paper extend Simon's results, see Si76, to the case of potentials-measures. Also for regular potentials our results are partially new.