Burkholder-Davis-Gundy inequalities in UMD Banach spaces

Abstract

In this paper we prove Burkholder-Davis-Gundy inequalities for a general martingale M with values in a UMD Banach space X. Assuming that M0=0, we show that the following two-sided inequality holds for all 1≤ p<∞: aligneq:main E 0≤ s≤ t \|Ms\|p p, X E γ([\![M]\!]t)p ,\;\;\; t≥ 0. align Here γ([\![M]\!]t) is the L2-norm of the unique Gaussian measure on X having [\![M]\!]t(x*,y*):= [ M,x*, M,y*]t as its covariance bilinear form. This extends to general UMD spaces a recent result by Veraar and the author, where a pointwise version of eq:main was proved for UMD Banach functions spaces X. We show that for continuous martingales, eq:main holds for all 0<p<∞, and that for purely discontinuous martingales the right-hand side of eq:main can be expressed more explicitly in terms of the jumps of M. For martingales with independent increments, eq:main is shown to hold more generally in reflexive Banach spaces X with finite cotype. In the converse direction, we show that the validity of eq:main for arbitrary martingales implies the UMD property for X. As an application we prove various It\o isomorphisms for vector-valued stochastic integrals with respect to general martingales, which extends earlier results by van Neerven, Veraar, and Weis for vector-valued stochastic integrals with respect to a Brownian motion. We also provide It\o isomorphisms for vector-valued stochastic integrals with respect to compensated Poisson and general random measures.