Invariant measures of critical branching random walks in high dimension

Abstract

In this work, we characterize cluster-invariant point processes for critical branching spatial processes on R d for all large enough d when the motion law is α-stable or has a finite discrete range. More precisely, when the motion is α-stable with α 2 and the offspring law μ of the branching process has an heavy tail such that μ(k) k --2--β , then we need the dimension d to be strictly larger than the critical dimension α/β. In particular, when the motion is Brownian and the offspring law μ has a second moment, this critical dimension is 2. Contrary to the previous work of Bramson, Cox and Greven in [BCG97] whose proof used PDE techniques, our proof uses probabilistic tools only.