English

Noncommutative Davis type decompositions and applications

Probability 2018-08-01 v1 Functional Analysis Operator Algebras

Abstract

We prove the noncommutative Davis decomposition for the column Hardy space \H_p^c for all 0<p10<p\leq 1. A new feature of our Davis decomposition is a simultaneous control of \H_1^c and \H_q^c norms for any noncommutative martingale in \H_1^c \cap \H_q^c when q2q\geq 2. As applications, we show that the Burkholder/Rosenthal inequality holds for bounded martingales in a noncommutative symmetric space associated with a function space EE that is either an interpolation of the couple (Lp,L2)(L_p, L_2) for some 1<p<21<p<2 or is an interpolation of the couple (L2,Lq)(L_2, L_q) for some 2<q<2<q<\infty. We also obtain the corresponding Φ\Phi-moment Burkholder/Rosenthal inequality for Orlicz functions that are either pp-convex and 22-concave for some 1<p<21<p<2 or are 22-convex and qq-concave for some 2<q<2<q<\infty.

Keywords

Cite

@article{arxiv.1712.01374,
  title  = {Noncommutative Davis type decompositions and applications},
  author = {Narcisse Randrianantoanina and Lian Wu and Quanhua Xu},
  journal= {arXiv preprint arXiv:1712.01374},
  year   = {2018}
}
R2 v1 2026-06-22T23:06:37.813Z