Tail asymptotics for the total progeny of the critical killed branching random walk

Elie E.F. Aidekon (Technische Universiteit Eindhoven)

Abstract


We consider a branching random walk on $R$ with a killing barrier at zero. At criticality, the process becomes eventually extinct, and the total progeny $Z$ is therefore finite. We show that $P(Z>n)$ is of orderĀ  $(n\ln^2(n))^{-1}$, which confirms the prediction of Addario-Berry and Broutin [1].

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Pages: 522-533

Publication Date: November 2, 2010

DOI: 10.1214/ECP.v15-1583

References

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