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

Mario Abundo, Danilo Del Vescovo

Published 2016-09-22Version 1

For drifted Brownian motion $X(t)= x - \mu t + B_t \ (\mu >0)$ starting from $x>0,$ we study the joint distribution of the first-passage time below zero, $\tau(x),$ and the first-passage area, $A(x),$ swept out by $X$ till the time $\tau(x).$ In particular, we establish differential equations with boundary conditions for the joint moments $E[\tau(x)^m A(x)^n],$ 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 $\tau(x)$ is obtained.