Hitting time of a half-line by a two-dimensional nonsymmetric random walk

Abstract

We consider the probability that a two-dimensional random walk starting from the origin never returns to the half-line (- ∞,0] × 0 before time n. Let X(1)=(X1,X2) be the increment of the two-dimensional random walk. For an aperiodic random walk with moment conditions (E[X2]=0 and E[|X1|δ]<∞, E[|X2|2+ δ]< ∞ for some δ ∈ (0,1)), we obtain an asymptotic estimate (as n → ∞ ) of this probability by assuming the behavior of the characteristic function of X1 near zero.