Content area
Abstract
In this article, we develop integration by parts formulae on Wiener space for solutions of SDEs with general McKean–Vlasov interaction and uniformly elliptic coefficients. These integration by parts formulae hold both for derivatives with respect to a real variable and derivatives with respect to a measure understood in the sense of Lions. They allows us to prove the existence of a classical solution to a related PDE with irregular terminal condition. We also develop bounds for the derivatives of the density of the solutions of McKean–Vlasov SDEs.
Details
Title
Smoothing properties of McKean–Vlasov SDEs
Author
Crisan, Dan 1
; McMurray, Eamon 1
1 Department of Mathematics, Imperial College London, London, UK
; McMurray, Eamon 1 1 Department of Mathematics, Imperial College London, London, UK
Pages
97-148
Publication year
2018
Publication date
Jun 2018
ISSN
01788051
e-ISSN
14322064
Source type
Scholarly Journal
Language of publication
English
ProQuest document ID
2037919582
Copyright
Probability Theory and Related Fields is a copyright of Springer, (2017). All Rights Reserved.