On a family of self-affine sets: topology, uniqueness, simultaneous expansions

Abstract

Let β1,β2>1 and Ti(x,y) = (x+iβ1, y+iβ2),\ i∈\1\. Let A := Aβ1, β2 be the unique compact set satisfying A = T1(A) T-1(A). In this paper we give a detailed analysis of A, and the parameters (β1, β2) whereA satisfies various topological properties. In particular, we show that if β1<β2<1.202,then A has a non-empty interior, thus significantly improving the bound from [1]. In the opposite direction,we prove that the connectedness locus for this family studied in [16] is not simply connected.We prove that the set of points of A which have a unique address has positive Hausdorff dimension for all (β1,β2).Finally, we investigate simultaneous (β1,β2)-expansions of reals, which were the initial motivation for studying this family in [5].