A Weak Approximation for the Extrema's Distributions of L\'evy Processes

Abstract

Suppose Xt is a one-dimensional and real-valued L\'evy process started from X0=0, which ( 1) its nonnegative jumps measure satisfying ∫ R\1,x2\(dx)<∞ and ( 2) its stopping time τ(q) is either a geometric or an exponential distribution with parameter q independent of Xt and τ(0)=∞. This article employs the Wiener-Hopf Factorization (WHF) to find, an Lp*( R) (where 1/p*+1/p=1 and 1<p≤2), approximation for the extrema's distributions of Xt. Approximating the finite (infinite)-time ruin probability as a direct application of our findings has been given. Estimation bounds, for such approximation method, along with two approximation procedures and several examples are explored.