Martingale decompositions and weak differential subordination in UMD Banach spaces

Abstract

In this paper we consider Meyer-Yoeurp decompositions for UMD Banach space-valued martingales. Namely, we prove that X is a UMD Banach space if and only if for any fixed p∈ (1,∞), any X-valued Lp-martingale M has a unique decomposition M = Md + Mc such that Md is a purely discontinuous martingale, Mc is a continuous martingale, Mc0=0 and \[ E \|Md∞\|p + E \|Mc∞\|p≤ cp,X E \|M∞\|p. \] An analogous assertion is shown for the Yoeurp decomposition of a purely discontinuous martingales into a sum of a quasi-left continuous martingale and a martingale with accessible jumps. As an application we show that X is a UMD Banach space if and only if for any fixed p∈ (1,∞) and for all X-valued martingales M and N such that N is weakly differentially subordinated to M, one has the estimate E \|N∞\|p ≤ Cp,X E \|M∞\|p.