Square functions for noncommutative differentially subordinate martingales

Abstract

We prove inequalities involving noncommutative differentially subordinate martingales. More precisely, we prove that if x is a self-adjoint noncommutative martingale and y is weakly differentially subordinate to x then y admits a decomposition dy=a +b +c (resp. dy=z +w) where a, b, and c are adapted sequences (resp. z and w are martingale difference sequences) such that: \| (an)n≥ 1\|L1,∞( M∞) +\| (Σn≥ 1 En-1|bn|2 )1/2\|1, ∞ + \| (Σn≥ 1 En-1|cn*|2 )1/2\|1, ∞ ≤ C\| x \|1 (resp. \| (Σn≥1 |zn|2 )1/2\|1, ∞ + \| (Σn≥ 1 |wn*|2 )1/2\|1, ∞ ≤ C\| x \|1). We also prove strong-type (p,p) versions of the above weak-type results for 1<p<2. In order to provide more insights into the interactions between noncommutative differential subordinations and martingale Hardy spaces when 1≤ p<2, we also provide several martingale inequalities with sharp constants which are new and of independent interest. As a byproduct of our approach, we obtain new and constructive proofs of both the noncommutative Burkholder-Gundy inequalities and the noncommutative Burkholder/Rosenthal inequalities for 1<p<2 with the optimal order of the constants when p 1.