Precise large deviations of the first passage time

Abstract

Let Sn be partial sums of an i.i.d. sequence \Xi\. We assume that E X1 <0 and P[X1>0]>0. In this paper we study the first passage time τu = ∈f\n:\; Sn > u\. The classical Cram\'er's estimate of the ruin probability says that P[τu<∞] C e-α0 u as u ∞, for some parameter α0. The aim of the paper is to describe precise large deviations of the first crossing by Sn a linear boundary, more precisely for a fixed parameter we study asymptotic behavior of P[τu = u/ ] as u tends to infinity.