Multifractal analysis and Erdös-Rényi laws of large numbers for branching random walks in $\R^d$

Abstract: We revisit the multifractal analysis of R d -valued branching random walks averages by considering subsets of full Hausdorff dimension of the standard level sets, over each infinite branch of which a quantified version of the Erdös-Rényi law of large numbers holds. Assuming that the exponential moments of the increments of the walks are finite, we can indeed control simultaneously such sets when the levels belong to the interior of the compact convex domain I of possible levels, i.e. when they are associated t… Show more