Large deviation probabilities for the range of a d-dimensional supercritical branching random walk

Abstract

Let \Zn\n≥ 0 be a d-dimensional supercritical branching random walk started from the origin. Write Zn(S) for the number of particles located in a set S⊂Rd at time n. Denote by Rn:=∈f\:Zi(\|x|≥ \)=0,∀~0≤ i≤ n\ the range of \Zn\n≥ 0 before time n. In this work, we show that under some mild conditions Rn/n converges in probability to some positive constant x* as n∞. Furthermore, we study its corresponding lower and upper deviation probabilities, i.e. the decay rates of P(Rn≤ xn)~for~x∈(0,x*);~P(Rn≥ xn) ~for~ x∈(x*,∞) as n∞. As a by-product, we confirm a conjecture of Engl\"ander Englander04.

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