Corrected diffusion approximation for random walks conditioned to stay positive

Abstract

Let Sn be a random walk with i.i.d. increments which have zero mean and finite variance. For every x0 we define the stopping time τx:=∈f\n1:x+Sn0\ and consider the probabilities P(x+Sn y,τx>n). We study the quality of the normal approximation for these probabilities and derive a Berry-Esseen-type inequality for P(x+Sn y|τx>n). Our Theorem 1 is an extension of the results in our previous paper (arXiv:2412.08502) where we have considered the special case x=0. It is also worth mentioning that Theorem 1 complements the results of Siegmund and Yuh (1982) on the corrected diffusion approximation.