Dimension approximation of attractors of graph directed IFSs by self-similar sets

Abstract

We show that for the attractor (K1,…,Kq) of a graph directed iterated function system, for each 1≤ j≤ q and >0 there exits a self-similar set K⊂eq Kj that satisfies the strong separation condition and HKj-<HK. We show that we can further assume convenient conditions on the orthogonal parts and similarity ratios of the defining similarities of K. Using this property as a `black box' we obtain results on a range of topics including on dimensions of projections, intersections, distance sets and sums and products of sets.