On the uniqueness of higher order Gubinelli derivatives and an analogue of the Doob – Meyer theorem for rough paths of the arbitrary positive Holder index

On the uniqueness of higher order Gubinelli derivatives and an analogue of the Doob – Meyer theorem for rough paths of the arbitrary positive Holder index

In this paper, we investigate the features of higher order Gubinelli derivatives of controlled rough paths having an arbitrary positive Holder index. There is used a notion of the (α, β)-rough map on the basis of which the sufficient conditions are given for the higher order Gubinelli derivatives un...

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Bibliographic Details
Main Author:	Maksim M. Vaskovskii
Format:	Article
Language:	Belarusian
Published:	Belarusian State University 2022-07-01
Series:	Журнал Белорусского государственного университета: Математика, информатика
Subjects:	rough paths gubinelli derivative doob – meyer expansion fractional brownian motion
Online Access:	https://journals.bsu.by/index.php/mathematics/article/view/4362

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