On some identities in law involving exponential functionals of Brownian motion and Cauchy variable

Abstract

Let B=\ Bt\ t 0 be a one-dimensional standard Brownian motion, to which we associate the exponential additive functional At=∫ 0te2Bsds,\,t 0. Starting from a simple observation of generalized inverse Gaussian distributions with particular sets of parameters, we show, with the help of a result by Matsumoto--Yor (2000), that for every x∈ R and for every finite stopping time τ of the process \ e-BtAt\ t 0, there holds the identity in law align* ( eBτ\! x+β (Aτ ), \, CeBτ\! x+β(Aτ ), \, e-Bτ \!Aτ ) (d)= ( (x+Bτ ), \, C (x+Bτ ), \, e-Bτ \!Aτ ) , align* which extends an identity due to Bougerol (1983) in several aspects. Here β =\ β (t)\ t 0 and β=\ β(t)\ t 0 are one-dimensional standard Brownian motions, C is a standard Cauchy variable, and B, β , β and C are independent. Using an argument relevant to derivation of the above identity, we also present some invariance formulae for Cauchy variable involving an independent Rademacher variable.