Characterisation of L0-boundedness for a general set of processes with no strictly positive element

Abstract

We consider a general set X of adapted nonnegative stochastic processes in infinite continuous time. X is assumed to satisfy mild convexity conditions, but in contrast to earlier papers need not contain a strictly positive process. We introduce two boundedness conditions on X -- DSV corresponds to an asymptotic L0-boundedness at the first time all processes in X vanish, whereas NUPBR loc states that Xt = \ Xt : X ∈ X\ is bounded in L0 for each t ∈ [0,∞). We show that both conditions are equivalent to the existence of a strictly positive adapted process Y such that XY is a supermartingale for all X ∈ X, with an additional asymptotic strict positivity property for Y in the case of DSV.