Multifractal structure of Bernoulli convolutions

Abstract

Let λp be the distribution of the random series Σn=1∞ in λn, where in is a sequence of i.i.d. random variables taking the values 0,1 with probabilities p,1-p. These measures are the well-known (biased) Bernoulli convolutions. In this paper we study the multifractal spectrum of λp for typical λ. Namely, we investigate the size of the sets \[ λ,p(α) = \x∈: r 0 λp(B(x,r)) r =α\. \] Our main results highlight the fact that for almost all, and in some cases all, λ in an appropriate range, λ,p(α) is nonempty and, moreover, has positive Hausdorff dimension, for many values of α. This happens even in parameter regions for which λp is typically absolutely continuous.