Extensions of Bougerol's identity in law and the associated anticipative path transformations

Abstract

Let B=\ Bt\ t 0 be a one-dimensional standard Brownian motion and denote by At,\,t 0, the quadratic variation of the geometric Brownian motion eBt,\,t 0. Bougerol's celebrated identity (1983) asserts that, if β =\ β (t)\ t 0 is another Brownian motion independent of B, then β (At) is identical in law with Bt for every fixed t>0. In this paper, we extend Bougerol's identity to an identity in law for processes up to time t, which exhibits a certain invariance of the law of Brownian motion. The extension is described in terms of anticipative transforms of B involving At as an anticipating factor. A Girsanov-type formula for those transforms is shown. An extension of a variant of Bougerol's identity is also presented.