A magnetic version of the Smilansky-Solomyak model

Abstract

We analyze spectral properties of two mutually related families of magnetic Schr\"odinger operators, HSm(A)=(i ∇ +A)2+ω2 y2+λ y δ(x) and H(A)=(i ∇ +A)2+ω2 y2+ λ y2 V(x y) in L2(R2), with the parameters ω>0 and λ<0, where A is a vector potential corresponding to a homogeneous magnetic field perpendicular to the plane and V is a regular nonnegative and compactly supported potential. We show that the spectral properties of the operators depend crucially on the one-dimensional Schr\"odinger operators L= -d2dx2 +ω2 +λ δ (x) and L (V)= - d2dx2 +ω2 +λ V(x), respectively. Depending on whether the operators L and L(V) are positive or not, the spectrum of HSm(A) and H(V) exhibits a sharp transition.