Localization and Cantor spectrum for quasiperiodic discrete Schr\"odinger operators with asymmetric, smooth, cosine-like sampling functions

Abstract

We prove Cantor spectrum and almost-sure Anderson localization for quasiperiodic discrete Schr\"odinger operators H = + V with potential V sampled with Diophantine frequency α from an asymmetric, smooth, cosine-like function v ∈ C2(T,[-1,1]) for sufficiently small interaction ≤ 0(v,α). We prove this result via an inductive analysis on scales, whereby we show that locally the Rellich functions of Dirichlet restrictions of H inherit the cosine-like structure of v and are uniformly well-separated.