Limit theorems for first passage times of multivariate perpetuity sequences

Abstract

We study the first passage time τu = ∈f \ n ≥ 1: |Vn| > u \ for the multivariate perpetuity sequence Vn = Q1 + M1 Q2 + ·s + (M1 … Mn-1) Qn, where (Mn, Qn) is a sequence of independent and identically distributed random variables with M1 a d × d (d ≥ 1) random matrix with nonnegative entries, and Q1 a nonnegative random vector in Rd. Here |·| denotes the vector norm. The exact asymptotic for the probability P (τu < ∞) as u ∞ has been found by Kesten (Acta Math. 1973). In this paper we prove a conditioned weak law of large numbers for τu: conditioned on the event \ τu < ∞ \, τu u converges in probability to a certain constant > 0 as u ∞. A conditioned central limit theorem for τu is also obtained. We further establish precise large deviation asymptotics for the lower probability P (τu ≤ (β - l) u) as u ∞, where β ∈ (0, ) and l ≥ 0 is a vanishing perturbation satisfying l 0 as u ∞. Our results extend those of Buraczewski et al. (Ann. Probab. 2016) from the univariate case (d=1) to the multivariate case (d>1). As consequences, we deduce exact asymptotics for the pointwise probability P (τu = [(β - l) u] ) and the local probability P (τu - (β - l) u ∈ (a, a + m ] ), where a<0 and m ∈ Z+. We also establish analogous results for the first passage time τuy = ∈f \ n ≥ 1: y, Vn > u \, where y is a nonnegative vector in Rd with |y| = 1.