Tail behavior of solutions of linear recursions on trees

Abstract

Consider the linear nonhomogeneous fixed point equation R =d sumi=1N Ci Ri + Q, where (Q,N,C1,...,CN) is a random vector with N in0,1,2,3,...Uinfty, Cii=1N >= 0, P(|Q|>0) > 0, and Rii=1N is a sequence of i.i.d. random variables independent of (Q,N,C1,...,CN) having the same distribution as R. It is known that R will have a heavy-tailed distribution under several different sets of assumptions on the vector (Q,N,C1,...,CN). This paper investigates the settings where either ZN = sumi=1N Ci or Q are regularly varying with index -alpha < -1 and E[sumi=1N Cialpha] < 1. This work complements previous results showing that P(R>t) Ht-alpha provided there exists a solution alpha > 0 to the equation E[sumi=1N|Ci|alpha] = 1, and both Q and ZN have lighter tails.