Perturbations of Gibbs semigroups and the non-selfadjoint harmonic oscillator

Abstract

Let T be the generator of a C0-semigroup e-Tt which is of finite trace for all t>0 (a Gibbs semigroup). Let A be another closed operator, T-bounded with T-bound equal to zero. In general T+A might not be the generator of a Gibbs semigroup. In the first half of this paper we give sufficient conditions on A so that T+A is the generator of a Gibbs semigroup. We determine these conditions in terms of the convergence of the Dyson-Phillips expansion corresponding to the perturbed semigroup in suitable Schatten-von Neumann norms. In the second half of the paper we consider T=H=-e-i∂x2+eix2, the non-selfadjoint harmonic oscillator, on L2(R) and A=V, a locally integrable potential growing like |x|α for 0≤ α<2 at infinity. We establish that the Dyson-Phillips expansion converges in this case in an r Schatten-von Neumann norm for r>42-α and show that H+V is the generator of a Gibbs semigroup e-(H+V)τ for |τ|≤ π2-||. From this we determine asymptotics for the eigenvalues and for the resolvent norm of H+V.