On empty balls of critical 2-dimensional branching random walks

Abstract

Let \Zn\n≥ 0 be a critical d-dimensional branching random walk started from a Poisson random measure whose intensity measure is the Lebesgue measure on Rd. Denote by Rn:=\u>0:Zn(\x∈Rd:|x|<u\)=0\ the radius of the largest empty ball centered at the origin of Zn. In reves02, R\'ev\'esz shows that if d=1, then Rn/n converges in law to an exponential random variable as n∞. Moreover, R\'ev\'esz (2002) conjectured that n∞Rn nlaw=non-trival~distri.,~d=2; n∞Rnlaw=non-trival~distri.,~d≥3. Later, Hu (2005) hu05 confirmed the case of d≥3. This work confirms the case of d=2. It turns out that the limit distribution can be precisely characterized through the super-Brownian motion. Moreover, we also give complete results of empty balls of the branching random walk with infinite second moment offspring law. As a by-product, this article also improves the assumption of maximal displacements of branching random walks [Theorem 1]lalley2015.

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