Anderson Localization for Schr\"odinger Operators with Monotone Potentials Generated by the Doubling Map

Abstract

In this paper, we consider the Schr\"odinger operators on 2() , defined for all x∈T by equation (H(x)u)n = un+1 + un-1 + λ f(2n x) un, for n ≥ 0, equation with the Dirichlet boundary condition u-1=0 . Building on Zhang's recent breakthrough work [Comm.Math.Phys.405:231(2024)] that resolved Damanik's open problem [Proc.Sympos. Pure Math.76,Amer.Math.Soc.(2007)] on the uniform positivity of the Lyapunov exponent, for the potential f ∈ C1(0,1) with \|f\|C1(0,1) < C and ∈fx ∈ (0,1) |f(x)| > c>0 , we obtain the large deviation estimate and prove that for a.e. x ∈ T and sufficiently large λ > λ0 , the operators H(x) display Anderson localization. Furthermore, if the potentials also have zero mean, our analysis reveals that the doubling map models can exhibit localization behavior for both small and large coupling constants λ .