Quantum dynamical bounds for ergodic potentials with underlying dynamics of zero topological entropy

Abstract

In this paper we obtain upper quantum dynamical bounds as a corollary of positive Lyapunov exponent for Schr\"odinger operators Hf,θ u(n)=u(n+1)+u(n-1)+ φ(fnθ)u(n), where φ : M R is a piecewise H\"older function on a compact Riemannian manifold M, and f:M is a uniquely ergodic volume preserving map with zero topological entropy. As corollaries we obtain localization-type statements for shifts and skew-shifts on higher dimensional tori with arithmetic conditions on the parameters. These are the first localization-type results with precise arithmetic conditions for multi-frequency quasiperiodic and skew-shift potentials.