How likely can a point be in different Cantor sets

Abstract

Let m∈ N 2, and let K=\Kλ: λ∈(0, 1/m]\ be a class of Cantor sets, where Kλ=\Σi=1∞ diλi: di∈\0,1,…, m-1\, i 1\. We investigate in this paper the likelyhood of a fixed point in the Cantor sets of K. More precisely, for a fixed point x∈(0,1) we consider the parameter set (x)=\λ∈(0,1/m]: x∈ Kλ\, and show that (x) is a topological Cantor set having zero Lebesgue measure and full Hausdorff dimension. Furthermore, by constructing a sequence of Cantor subsets with large thickness in (x) we prove that the intersection (x)(y) also has full Hausdorff dimension for any x, y∈(0,1).