Taylor estimate for differential equations driven by -rough paths

Abstract

We obtain a remainder estimate for the truncated Taylor expansion for differential equations driven by weakly geometric -rough paths for =( p1,·s ,pk) , pi≥ 1. When there exists p≥ 1 such that pi=pki-1\ for some ki∈ \ 1,… , [ p] \ , we obtain a refined Taylor remainder estimate that contains a factorial decay component. The remainder estimates are in the right order as they are comparable to the next term in the Taylor expansion.