On decoupling in Banach spaces
Abstract
We consider decoupling inequalities for random variables taking values in a Banach space . We restrict the class of distributions that appear as conditional distributions while decoupling and show that each adapted process can be approximated by a Haar type expansion in which only the same conditional distributions appear. Moreover, we show that in our framework a progressive enlargement of the underlying filtration does not effect the decoupling properties (e.g., the constants involved). As special case we deal with one-sided moment inequalities when decoupling dyadic (i.e., Paley-Walsh) martingales. We establish the decoupling constant of with the -norm. As an example of an application, we demonstrate that Burkholder-Davis-Gundy type inequalities for stochastic integrals of -valued processes can be obtained from decoupling inequalities for -valued dyadic martingales.
Cite
@article{arxiv.1805.12377,
title = {On decoupling in Banach spaces},
author = {Sonja Cox and Stefan Geiss},
journal= {arXiv preprint arXiv:1805.12377},
year = {2018}
}