Reflection principle and Ocone martingales

Abstract

Let M =(Mt)t≥ 0 be any continuous real-valued stochastic process. We prove that if there exists a sequence (an)n≥ 1 of real numbers which converges to 0 and such that M satisfies the reflection property at all levels an and 2an with n≥ 1, then M is an Ocone local martingale with respect to its natural filtration. We state the subsequent open question: is this result still true when the property only holds at levels an? Then we prove that the later question is equivalent to the fact that for Brownian motion, the σ-field of the invariant events by all reflections at levels an, n1 is trivial. We establish similar results for skip free Z-valued processes and use them for the proof in continuous time, via a discretisation in space.