A Multifractal Decomposition for Self-similar Measures with Exact Overlaps

Abstract

We study self-similar measures in R satisfying the weak separation condition along with weak technical assumptions which are satisfied in all known examples. For such a measure μ, we show that there is a finite set of concave functions \τ1,…,τm\ such that the Lq-spectrum of μ is given by \τ1,…,τm\ and the multifractal spectrum of μ is given by \τ1*,…,τm*\, where τi* denotes the concave conjugate of τi. In particular, the measure μ satisfies the multifractal formalism if and only if its multifractal spectrum is a concave function. This implies that μ satisfies the multifractal formalism at values corresponding to points of differentiability of the Lq-spectrum. We also verify existence of the limit for the Lq-spectra of such measures for every q∈R. As a direct application, we obtain many new results and simple proofs of well-known results in the multifractal analysis of self-similar measures satisfying the weak separation condition.