The exceptional sets on the run-length function of beta-expansions

Abstract

Let β > 1 and the run-length function rn(x,β) be the maximal length of consecutive zeros amongst the first n digits in the β-expansion of x∈[0,1]. The exceptional set E=\x ∈ [0,1]:n→ ∞rn(x,β)(n)=0, n→ ∞rn(x,β)(n)=+∞\ is investigated, where : N → R+ is a monotonically increasing function with n→ ∞ (n)=+∞. We prove that the set E is either empty or of full Hausdorff dimension and residual in [0,1] according to the increasing rate of .