Smoothness of densities for path-dependent SDEs under H\"ormander's condition
Abstract
We establish the existence of smooth densities for solutions to a broad class of path-dependent SDEs under a H\"ormander-type condition. The classical scheme based on the reduced Malliavin matrix turns out to be unavailable in the path-dependent context. We approach the problem by lifting the given -dimensional path-dependent SDE into a suitable -type Banach space in such a way that the lifted Banach-space-valued equation becomes a state-dependent reformulation of the original SDE. We then formulate H\"ormander's bracket condition in for non-anticipative SDE coefficients defining the Lie brackets in terms of vertical derivatives in the sense of the functional It\^o calculus. Our pathway to the main result engages an interplay between the analysis of SDEs in Banach spaces, Malliavin calculus, and rough path techniques.
Cite
@article{arxiv.2011.04089,
title = {Smoothness of densities for path-dependent SDEs under H\"ormander's condition},
author = {Alberto Ohashi and Francesco Russo and Evelina Shamarova},
journal= {arXiv preprint arXiv:2011.04089},
year = {2021}
}
Comments
Accepted version in JFA