A note on martingale inequalities for fluid models

## Abstract For 1 < __p__ < ∞, the almost surely finiteness of $ E \left(v ^{- {p^{\prime} \over p}} \vert {\cal F}\_{1} \right) $ is a necessary and sufficient condition in order to have almost surely convergence of the sequences {__E__(__f__|ℱ~__n__~)} with __f__ ∈ __L__^__p__^(__v dP__). This co

Sufficient conditions are given to get weighted inequalities between two maximal operators on Banach valued regular martingales. As an application we obtain generalizations with weights of the inequalities in the definitions of UMD- and MT-Banach spaces and weighted estimates for the vector valued s

In this paper, we get a general downcrossing inequality for g-martingales introduced via a class of backwards stochastic di erential equations (shortly BSDEs).

We develop a non-commutative L p stochastic calculus for the Clifford stochastic integral, an L 2 theory of which has been developed by Barnett, Streater, and Wilde. The main results are certain non-commutative L p inequalities relating Clifford integrals and their integrands. These results are appl