Dimension spectrum of digit frequency sets for beta-expansions

Abstract

For any beta-shift (Xβ,σ) on two symbols, i.e., the symbolic coding of the beta-map for 1<β≤2, we give an exact formula for the Hausdorff dimension H α(t) as a function of t∈R, where α denotes the frequency set of the digit 1 defined by \[α=\(xi)i=1∞∈ Xβ;\ n∞1nΣi=1nxi=α \\] for α∈[0,1] and α(t) is an explicit function related to the quasi-greedy expansion of 1. The formula is derived from explicit formulae for eigenfunctions and eigenfunctionals corresponding to the leading eigenvalue λt of the transfer operator Lt with the potential tC1 for t∈R, where C1 denotes the indicator function of the cylinder set C1=\(xi)i=1∞∈ Xβ; x1=1\. These formulae can be applied not only to the leading eigenvalue but also to the other isolated eigenvalues of Lt, which yields a precise spectral decomposition of Lt. As a further application, we investigate the distribution function of the push-forward of the eigenmeasure corresponding to λt by the inverse map of the coding map. We show that the distribution function after a change of variables for t is equal to the Lebesgue singular function if β=2 and satisfies an analogy of the Hata-Yamaguchi formula, which yields a generalization of the Takagi function for beta-expansions with the base 1<β<2.