Schrödinger trace invariants for homogeneous perturbations of the harmonic oscillator

  • Moritz Doll

    University of Bremen, Germany
  • Steve Zelditch

    Northwestern University, Evanston, USA
Schrödinger trace invariants for homogeneous perturbations of the harmonic oscillator cover

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Abstract

Let denote the harmonic oscillator on perturbed by an isotropic pseudodifferential operator of order and let . We prove a Gutzwiller–Duistermaat–Guillemin type trace formula for The singularities occur at times and the coefficients involve the dynamics of the Hamilton flow of the symbol on the space of harmonic oscillator orbits of energy . This is a novel kind of sub-principal symbol effect on the trace. We generalize the averaging technique of Weinstein and Guillemin to this order of perturbation, and then present two completely different calculations of . The first proof directly constructs a parametrix of in the isotropic calculus, following earlier work of Doll–Gannot–Wunsch. The second proof conjugates the trace to the Bargmann–Fock setting, the order of the perturbation coincides with the 'central limit scaling' studied by Zelditch–Zhou for Toeplitz operators.

Cite this article

Moritz Doll, Steve Zelditch, Schrödinger trace invariants for homogeneous perturbations of the harmonic oscillator. J. Spectr. Theory 10 (2020), no. 4, pp. 1303–1332

DOI 10.4171/JST/328