Discretely sampled signals and the rough Hoff process
Abstract
We introduce a canonical method for transforming a discrete sequential data set into an associated rough path made up of lead-lag increments. In particular, by sampling a -dimensional continuous semimartingale at a set of times , we construct a piecewise linear, axis-directed process comprised of a past and future component. We call such an object the Hoff process associated with the discrete data . The Hoff process can be lifted to its natural rough path enhancement and we consider the question of convergence as the sampling frequency increases. We prove that the It\^{o} integral can be recovered from a sequence of random ODEs driven by the components of . This is in contrast to the usual Stratonovich integral limit suggested by the classical Wong-Zakai Theorem. Such random ODEs have a natural interpretation in the context of mathematical finance.
Cite
@article{arxiv.1310.4054,
title = {Discretely sampled signals and the rough Hoff process},
author = {Guy Flint and Ben Hambly and Terry Lyons},
journal= {arXiv preprint arXiv:1310.4054},
year = {2016}
}