Refined Weyl law for homogeneous perturbations of the harmonic oscillator

Abstract

Let H denote the harmonic oscillator Hamiltonian on Rd, perturbed by an isotropic pseudodifferential operator of order 1. We consider the Schr\"odinger propagator U(t)=e-itH, and find that while singsupp Tr U(t) ⊂ 2 π Z as in the unperturbed case, there exists a large class of perturbations in dimension d ≥ 2 for which the singularities of Tr U(t) at nonzero multiples of 2 π are weaker than the singularity at t=0. The remainder term in the Weyl law is of order o(λd-1), improving in these cases the O(λd-1) remainder previously established by Helffer--Robert.