A regular analogue of the Smilansky model: spectral properties

Abstract

We analyze spectral properties of the operator H=∂2∂ x2 -∂2∂ y2 +ω2y2-λ y2V(x y) in L2(R2), where ω 0 and V 0 is a compactly supported and sufficiently regular potential. It is known that the spectrum of H depends on the one-dimensional Schr\"odinger operator L=-d2dx2+ω2-λ V(x) and it changes substantially as ∈fσ(L) switches sign. We prove that in the critical case, ∈fσ(L)=0, the spectrum of H is purely essential and covers the interval [0,∞). In the subcritical case, ∈fσ(L)>0, the essential spectrum starts from ω and there is a non-void discrete spectrum in the interval [0,ω). We also derive a bound on the corresponding eigenvalue moments.