Lower bounds on the growth of Sobolev norms in some linear time dependent Schr\"odinger equations

Abstract

In this paper we consider linear, time dependent Schr\"odinger equations of the form i ∂t = K0 + V(t) , where K0 is a positive self-adjoint operator with discrete spectrum and whose spectral gaps are asymptotically constant. We give a strategy to construct bounded perturbations V(t) such that the Hamiltonian K0 + V(t) generates unbounded orbits. We apply our abstract construction to three cases: (i) the Harmonic oscillator on R, (ii) the half-wave equation on T and (iii) the Dirac-Schr\"odinger equation on the sphere. In each case, V(t) is a smooth and periodic in time pseudodifferential operator and the Schr\"odinger equation has solutions fulfilling \| (t) \|r |t|r as |t| 1.