Doob--Meyer for rough paths
Probability
2012-05-14 v1
Abstract
Recently, Hairer--Pillai proposed the notion of -roughness of a path which leads to a deterministic Norris lemma. In the Gubinelli framework (Hoelder, level 2) of rough paths, they were then able to prove a Hoermander type result (SDEs driven by fractional Brownian motion, ). We take a step back and propose a natural "roughness" condition relative to a given -rough path in the sense of Lyons; the aim being a Doob-Meyer result for rough integrals in the sense of Lyons. The interest in our (weaker) condition is that it is immediately verified for large classes of Gaussian processes, also in infinite dimensions. We conclude with an application to non-Markovian system under Hoermander's condition.
Cite
@article{arxiv.1205.2505,
title = {Doob--Meyer for rough paths},
author = {Peter Friz and Atul Shekhar},
journal= {arXiv preprint arXiv:1205.2505},
year = {2012}
}