Pointwise densities of homogeneous Cantor measure and critical values

Abstract

Let N 2 and ∈(0,1/N2]. The homogenous Cantor set E is the self-similar set generated by the iterated function system \[ \fi(x)= x+i(1-)N-1: i=0,1,…, N-1\. \] Let s=H E be the Hausdorff dimension of E, and let μ= Hs|E be the s-dimensional Hausdorff measure restricted to E. In this paper we describe, for each x∈ E, the pointwise lower s-density *s(μ,x) and upper s-density *s(μ, x) of μ at x. This extends some early results of Feng et al. (2000). Furthermore, we determine two critical values ac and bc for the sets \[ E*(a)=\x∈ E: *s(μ, x) a\and E*(b)=\x∈ E: *s(μ, x) b\ \] respectively, such that H E*(a)>0 if and only if a<ac, and that H E*(b)>0 if and only if b>bc. We emphasize that both values ac and bc are related to the Thue-Morse type sequences, and our strategy to find them relies on ideas from open dynamics and techniques from combinatorics on words.