Precise Large Deviations For The Total Population Of Heavy-Tailed Subcritical Branching Process With Immigration

Abstract

In this article we focus on the partial sum Sn=X1+·s+Xn of the subcritical branching process with immigration \Xn\n∈N+, under the condition that one of the offspring or immigration η is regularly varying. The tail distribution of Sn is heavily dependent on that of and η, and a precise large deviation probability for Sn is specified. (i)When the tail of offspring is lighter than immigration η, uniformly for x≥ xn, P(Sn-ESn>x) c1nP(η>x) with some constant c1 and sequence \xn\, where c1 is only related to the mean of offspring; (ii) When the tail of immigration η is not heavier than offspring , uniformly for x≥ xn,P(Sn ESn>x) c2nP(>x) with some constant c2 and sequence \xn\, where c2 is related to both the mean of offspring and the mean of immigration.

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