Gibbs-like measure for spectrum of a class of one-dimensional Schr\"odinger operator with Sturm potentials

Abstract

Let α∈(0,1) be an irrational, and [0;a1,a2,...] the continued fraction expansion of α. Let Hα,V be the one-dimensional Schr\"odinger operator with Sturm potential of frequency α. Suppose the potential strength V is large enough and (ai)i1 is bounded. We prove that the spectral generating bands possess properties of bounded distortion, bounded covariation and there exists Gibbs-like measure on the spectrum σ(Hα,V). As an application, we prove that H σ(Hα,V)=s*, B σ(Hα,V)=s*, where s* and s* are lower and upper pre-dimensions.