Arithmetic on self-similar sets

Abstract

Let K1 and K2 be two one-dimensional homogeneous self-similar sets. Let f be a continuous function defined on an open set U⊂ R2. Denote the continuous image of f by fU(K1,K2)=\f(x,y):(x,y)∈ (K1× K2) U\. In this paper we give an sufficient condition which guarantees that fU(K1,K2) contains some interiors. Our result is different from Simon and Taylor's [Proposition 2.9]ST as we do not need the condition that the multiplication of the thickness of K1 and K2 is strictly greater than 1. As a consequence, we give an application to the univoque sets in the setting of q-expansions.