Disintegration results for fractal measures and applications to Diophantine approximation

Abstract

In this paper we prove disintegration results for self-conformal measures and affinely irreducible self-similar measures. The measures appearing in the disintegration resemble self-conformal/self-similar measures for iterated function systems satisfying the strong separation condition. As an application of our results, we prove the following Diophantine statements: 1. Using a result of Pollington and Velani, we show that if μ is a self-conformal measure in R or an affinely irreducible self-similar measure, then there exists α>0 such that for all β>α we have μ(\x∈ Rd:1≤ i≤ d|xi-pi/q|≤ 1qd+1d( q)β for i.m. (p1,…,pd,q)∈ Zd× N\)=0. 2. Using a result of Kleinbock and Weiss, we show that if μ is an affinely irreducible self-similar measure, then μ almost every x is not a singular vector.