Characterising Ocone local martingales with reflections

Abstract

Let M = (Mt)t 0 be any continuous real-valued stochastic process such that M0=0. Chaumont and Vostrikova proved that if there exists a sequence (an)n 1 of positive real numbers converging to 0 such that M satisfies the reflection principle at levels 0, an and 2an, for each n 1, then M is an Ocone local martingale. They also asked whether the reflection principle at levels 0 and an only (for each n 1) is sufficient to ensure that M is an Ocone local martingale. We give a positive answer to this question, using a slightly different approach, which provides the following intermediate result. Let a and b be two positive real numbers such that a/(a+b) is not dyadic. If M satisfies the reflection principle at the level 0 and at the first passage-time in \-a,b\, then M is close to a local martingale in the following sense: |[MS M]| a+b for every stopping time S in the canonical filtration of = \w ∈ (+,) : w(0)=0\ such that the stopped process M· (S M) is uniformly bounded.