Upper deviation probabilities for the range of a supercritical super-Brownian motion

Abstract

Let \Xt\t≥ 0 be a d-dimensional supercritical super-Brownian motion started from the origin with branching mechanism . Denote by Rt:=∈f\r>0:Xs(\x∈ Rd:|x|≥ r\)=0,~∀~0≤ s≤ t\ the radius of the minimal ball (centered at the origin) containing the range of \Xs\s≥ 0 up to time t. In Pinsky, Pinsky proved that condition on non-extinction, t∞Rt/t=2β in probability, where β:=-'(0). Afterwards, Engl\"ander Englander04 studied the lower deviation probabilities of Rt. For the upper deviation probabilities, he [Conjecture 8]Englander04 conjectured that for > 2β, t∞1t(Rt≥ t)=-(22-β). In this note, we confirmed this conjecture.

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