On two-dimensional extensions of Bougerol's identity in law

Abstract

Let B=\ Bt\ t 0 be a one-dimensional standard Brownian motion and denote by At,\,t 0, the quadratic variation of eBt,\,t 0. The celebrated Bougerol's identity in law (1983) asserts that, if β =\ β t\ t 0 is another Brownian motion independent of B, then β At has the same law as Bt for every fixed t>0. Bertoin, Dufresne and Yor (2013) obtained a two-dimensional extension of the identity involving as the second coordinates the local times of B and β at level zero. In this paper, we present a generalization of their extension in a situation that the levels of those local times are not restricted to zero. Our argument provides a short elementary proof of the original extension and sheds new light on that subtle identity.