Almost reducibility and oscillatory growth of Sobolev norms

Abstract

For 1D quantum harmonic oscillator perturbed by a time quasi-periodic quadratic form of (x,- i∂x), we show its almost reducibility. The growth of Sobolev norms of solution is described based on the scheme of almost reducibility. In particular, an o(ts)-upper bound is shown for the s-norm if the equation is non-reducible. Moreover, by Anosov-Katok construction, we also show the optimality of this upper bound, i.e., the existence of quasi-periodic quadratic perturbation for which the growth of Hs-norm of the solution is o(ts) as t∞ but arbitrarily ``close" to ts in an oscillatory way.