Pointwise estimates for first passage times of perpetuity sequences

Abstract

We consider first passage times τu = ∈f\n:\; Yn>u\ for the perpetuity sequence Yn = B1 + A1 B2 + ·s + (A1… An-1)Bn, where (An,Bn) are i.i.d. random variables with values in R +× R. Recently, a number of limit theorems related to τu were proved including the law of large numbers, the central limit theorem and large deviations theorems. We obtain a precise asymptotics of the sequence P[τu = u/ ], >0, u ∞ which considerably improves the previous results. There, probabilities P[τu ∈ Iu] were identified, for some large intervals Iu around ku, with lengths growing at least as u. Remarkable analogies and differences to random walks are discussed.