On the bifurcation set of unique expansions

Abstract

Given a positive integer M, for q∈(1, M+1] let Uq be the set of x∈[0, M/(q-1)] having a unique q-expansion with the digit set \0, 1,…, M\, and let Uq be the set of corresponding q-expansions. Recently, Komornik et al.~(Adv. Math., 2017) showed that the topological entropy function H: q htop(Uq) is a Devil's staircase in (1, M+1]. Let B be the bifurcation set of H defined by \[ B=\q∈(1, M+1]: H(p) H(q)for any p q\. \] In this paper we analyze the fractal properties of B, and show that for any q∈ B, \[ δ→ 0 H(B(q-δ, q+δ))=HUq, \] where H denotes the Hausdorff dimension. Moreover, when q∈B the univoque set Uq is dimensionally homogeneous, i.e., H(Uq V)=HUq for any open set V that intersect Uq. As an application we obtain a dimensional spectrum result for the set U containing all bases q∈(1, M+1] such that 1 admits a unique q-expansion. In particular, we prove that for any t>1 we have \[ H(U(1, t])= q tHUq. \] We also consider the variations of the sets U=U(M) when M changes.