Long time growth of Sobolev norms in time dependent semiclassical anharmonic oscillators

Abstract

We consider the semiclassical Schr\"odinger equation on Rd given by i ∂t = (-22 + Wl(x) ) + V(t,x) , where Wl is an anharmonic trapping of the form Wl(x)= 12lΣj=1d xj2l, l≥ 2 is an integer and is a semiclassical small parameter. We construct a smooth potential V(t,x), bounded in time with its derivatives, and an initial datum such that the Sobolev norms of the solution grow at a logarithmic speed for all times of order 12(-1). The proof relies on two ingredients: first we construct an unbounded solution to a forced mechanical anharmonic oscillator, then we exploit semiclassical approximation with coherent states to obtain growth of Sobolev norms for the quantum system which are valid for semiclassical time scales.