Intersections of homogeneous Cantor sets and beta-expansions

Abstract

Let β,N be the N-part homogeneous Cantor set with β∈(1/(2N-1),1/N). Any string (j)=1 with j∈\0, 1,...,(N-1)\ such that t=Σ=1 jβ-1(1-β)/(N-1) is called a code of t. Let Uβ, N be the set of t∈[-1,1] having a unique code, and let Sβ, N be the set of t∈Uβ, N which make the intersection β,N(β,N+t) a self-similar set. We characterize the set Uβ, N in a geometrical and algebraical way, and give a sufficient and necessary condition for t∈Sβ, N. Using techniques from beta-expansions, we show that there is a critical point βc∈(1/(2N-1),1/N), which is a transcendental number, such that Uβ, N has positive Hausdorff dimension if β∈(1/(2N-1),βc), and contains countably infinite many elements if β∈(βc,1/N). Moreover, there exists a second critical point αc=[N+1-(N-1)(N+3)\,]/2∈(1/(2N-1),βc) such that Sβ, N has positive Hausdorff dimension if β∈(1/(2N-1),αc), and contains countably infinite many elements if β∈[αc,1/N).