On the first-passage area of a Levy process

Abstract

Let be X(t)= x - μ t + σ Bt - Nt a Levy process starting from x >0, where μ 0, \ σ 0, \ Bt is a standard BM, and Nt is a homogeneous Poisson process with intensity θ >0, starting from zero. We study the joint distribution of the first-passage time below zero, τ (x), and the first-passage area, A(x), swept out by X till the time τ (x). In particular, we establish differential-difference equations with outer conditions for the Laplace transforms of τ(x) and A(x), and for their joint moments. In a special case (μ = σ =0), we show an algorithm to find recursively the moments E[τ(x)m A(x)n], for any integers m and n; moreover, we obtain the expected value of the time average of X till the time τ(x).