Graph-directed systems and self-similar measures on limit spaces of self-similar groups

Abstract

Let G be a group and φ:H G be a contracting homomorphism from a subgroup H<G of finite index. V.Nekrashevych [25] associated with the pair (G,φ) the limit dynamical system (,) and the limit G-space together with the covering g∈ G· g by the tile . We develop the theory of self-similar measures μ on these limit spaces. It is shown that (,,μ) is conjugated to the one-sided Bernoulli shift. Using sofic subshifts we prove that the tile has integer measure and we give an algorithmic way to compute it. In addition we give an algorithm to find the measure of the intersection of tiles (· g) for g∈ G. We present applications to the invariant measures for the rational functions on the Riemann sphere and to the evaluation of the Lebesgue measure of integral self-affine tiles.