Characterizations of the UMD property via tail estimates for tangent processes

Abstract

We characterize the UMD property of a Banach space by tail inequalities for maximal functions of tangent conditionally symmetric processes. More precisely, we prove that a Banach space V is UMD if and only if for some (equivalently, for all) p∈(0,∞) one has that \[ P(r≥ 0 \| Nr\|>t)p,V(sptp+ P(r≥ 0 \| Mr\|>s)), s,t>0, \] for all tangent conditionally symmetric V-valued processes M and N. We further show that this estimate is equivalent to suitable Lorentz norm inequalities for the associated maximal functions, and obtain analogous characterizations in the discrete-time, continuous-time, and purely discontinuous settings.