Expansion of eigenvalues of rank-one perturbations of the discrete bilaplacian

Abstract

We consider the family hμ:= - μ v, μ∈R, of discrete Schr\"odinger-type operators in d-dimensional lattice Zd, where is the discrete Laplacian and v is of rank-one. We prove that there exist coupling constant thresholds μo,μo0 such that for any μ∈[-μo,μo] the discrete spectrum of hμ is empty and for any μ∈ R[-μo,μo] the discrete spectrum of hμ is a singleton \e(μ)\, and e(μ)<0 for μ>μo and e(μ)>4d2 for μ<-μo. Moreover, we study the asymptotics of e(μ) as μμo and μ -μo as well as μ∞. The asymptotics highly depend on d and v.