Spectral analysis of a class of Schroedinger operators exhibiting a parameter-dependent spectral transition

Abstract

We analyze two-dimensional Schr\"odinger operators with the potential |xy|p - λ (x2+y2)p/(p+2) where p 1 and λ 0, which exhibit an abrupt change of its spectral properties at a critical value of the coupling constant λ. We show that in the supercritical case the spectrum covers the whole real axis. In contrast, for λ below the critical value the spectrum is purely discrete and we establish a Lieb-Thirring-type bound on its moments. In the critical case the essential spectrum covers the positive halfline while the negative spectrum can be only discrete, we demonstrate numerically the existence of a ground state eigenvalue.