Zero-one law of Hausdorff dimensions of the recurrent sets

Abstract

Let (, σ) be the one-sided shift space with m symbols and Rn(x) be the first return time of x∈ to the n-th cylinder containing x. Denote Eα,β=\x∈: n∞ Rn(x)(n)=α,\ n∞ Rn(x)(n)=β\, where : N R+ is a monotonically increasing function and 0≤α≤β≤ +∞. We show that the Hausdorff dimension of the set Eα,β admits a dichotomy: it is either zero or one depending on , α and β.