The topological property of the irregular sets on the lengths of basic intervals in beta-expansions

Abstract

Let β > 1 be a real number and (ε1(x, β), ε2(x, β), …) be the β-expansion of a point x ∈ (0, 1]. For all x ∈ (0,1], let A(D(x)) be the set of accumulation points of -β |In(x)|n as n → ∞, where |In(x)| is the length of the basic interval of order n containing x ∈ (0, 1]. In this paper, we prove that A(D(x)) is always a closed interval for any x ∈ (0,1]. Furthermore, if λ(β)>0, the extremely irregular set containing points x ∈ [0, 1] whose upper limit of -β |In(x)|n equals to 1+(β) is residual, where 1+(β) is a constant depending on β. As a consequence, the irregular set with x∈ [0, 1] whose limit of -β |In(x)|n does not exist is residual for every λ(β)>0.