On the joint distribution of first-passage time and first-passage area of drifted Brownian motion

Abstract

For drifted Brownian motion X(t)= x - μ t + Bt \ (μ >0) starting from x>0, 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 equations with boundary conditions for the joint moments E[τ(x)m A(x)n], and we present an algorithm to find recursively them, for any m and n. Finally, the expected value of the time average of X till the time τ(x) is obtained.