Self-similar and self-affine sets; measure of the intersection of two copies

Abstract

Let K be a self-similar or self-affine set in Rd, let μ be a self-similar or self-affine measure on it, and let G be the group of affine maps, similitudes, isometries or translations of Rd. Under various assumptions (such as separation conditions or we assume that the transformations are small perturbations or that K is a so called Sierpinski sponge) we prove theorems of the following types, which are closely related to each other; Non-stability: There exists a constant c<1 such that for every g∈ G we have either μ(K g(K)) <c μ(K) or K⊂ g(K). Measure and topology: For every g∈ G we have μ(K g(K)) > 0 intK (K g(K)) is nonempty (where intK is interior relative to K). Extension: The measure μ has a G-invariant extension to Rd. Moreover, in many situations we characterize those g's for which μ(K g(K) > 0, and we also get results about those g's for which g(K) K or g(K)⊃ K holds.