Spectral properties of higher order anharmonic oscillators

Abstract

We discuss spectral properties of the self-adjoint operator \[ -d2/dt2 + (tk+1/(k+1)-α)2 \] in L2(R) for odd integers k. We prove that the minimum over α of the ground state energy of this operator is attained at a unique point which tends to zero as k tends to infinity. Moreover, we show that the minimum is non-degenerate. These questions arise naturally in the spectral analysis of Schr\"odinger operators with magnetic field. This extends or clarifies previous results by Pan-Kwek, Helffer-Morame, Aramaki, Helffer-Kordyukov and Helffer.