On the prospective minimum of the random walk conditioned to stay non-negative

Abstract

Let equation* S0=0, Sn=X1+...+Xn,\ n≥ 1, equation* be a random walk whose increments belong without centering to the domain of attraction of a stable law with scaling constants an, that provide convergence as n→ ∞ of the distributions of the elements of the sequence \ Sn/an,n=1,2,...\ to this stable law. Let Lr,n=r≤ m≤ nSm be the minimum of the random walk on the interval [r,n]. It is shown that equation* r,k,n→ ∞ P( Lr,n≤ yak|Sn≤ tak,L0,n≥ 0) ,\, t∈ ( 0,∞ ), equation* can have five different expressions, the forms of which depend on the relationships between the parameters r,k and n.