Revisiting integral functionals of geometric Brownian motion

Abstract

In this paper we revisit the integral functional of geometric Brownian motion It= ∫0t e-(μ s +σ Ws)ds, where μ∈R, σ > 0, and (Ws )s>0 is a standard Brownian motion. Specifically, we calculate the Laplace transform in t of the cumulative distribution function and of the probability density function of this functional.