Invariance times

Abstract

On a probability space (,A,Q) we consider two filtrations F⊂ G and a G stopping time θ such that the G predictable processes coincide with F predictable processes on (0,θ]. In this setup it is well-known that, for any F semimartingale X, the process Xθ- (X stopped "right before θ") is a G semimartingale.Given a positive constant T, we call θ an invariance time if there exists a probability measure P equivalent to Q on F\T such that, for any (F,P) local martingale X, Xθ- is a (G,Q) local martingale. We characterize invariance times in terms of the (F,Q) Az\'ema supermartingale of θ and we derive a mild and tractable invariance time sufficiency condition. We discuss invariance times in mathematical finance and BSDE applications.