Asymptotics of eigenvalues of the zero-range perturbation of the discrete bilaplacian

Abstract

We consider the family hμ:= - μ v,μ∈R, of discrete Schr\"odinger-type operators in one-dimensional lattice Z, where is the discrete Laplacian and v is of zero-range. We prove that for any μ0 the discrete spectrum of hμ is a singleton \e(μ)\, and e(μ)<0 for μ>0 and e(μ)>4 for μ<0. Moreover, we study the properties of e(μ) as a function of μ, in particular, we find the asymptotics of e(μ) as μ0 and μ0.