Hausdorff dimension of the arithmetic sum of self-similar sets

Abstract

Let β>1. We define a class of similitudes \[S:=\fi(x)=xβni+ai:ni∈ N+, ai∈ R\.\] Taking any finite similitudes \fi(x)\i=1m from S, it is well known that there is a unique self-similar set K1 satisfying K1=i=1m fi(K1). Similarly, another self-similar set K2 can be generated via the finite contractive maps of S. We call K1+K2=\x+y:x∈ K1, y∈ K2\ the arithmetic sum of two self-similar sets. In this paper, we prove that K1+K2 is either a self-similar set or a unique attractor of some infinite iterated function system. Using this result we can then calculate the exact Hausdorff dimension of K1+K2 under some conditions, which partially provides the dimensional result of K1+K2 if the IFS's of K1 and K2 fail the irrational assumption, see Peres and Shmerkin PS.