On strongly orthogonal martingales in UMD Banach spaces

Abstract

In the present paper we introduce the notion of strongly orthogonal martingales. Moreover, we show that for any UMD Banach space X and for any X-valued strongly orthogonal martingales M and N such that N is weakly differentially subordinate to M one has that for any 1<p<∞ \[ E \|Nt\|p ≤ p, Xp E \|Mt\|p,\;\;\; t≥ 0, \] with the sharp constant p, X being the norm of a decoupling-type martingale transform and being within the range \[ \βp, X, p,X\ ≤ \βp, Xγ,+, βp, Xγ, -\ ≤ p, X ≤ \βp, X, p,X\, \] where βp, X is the UMDp constant of X, p, X is the norm of the Hilbert transform on Lp( R; X), and βp, Xγ,+ and βp, Xγ, - are the Gaussian decoupling constants.