Integration of rough paths - the truncated variation approach

Abstract

Using truncated variation techniques we obtain an improved version of the Loeve-Young inequality for the Riemann-Stieltjes integrals driven by rough paths. This allowed us to strenghten some result on the existence of solutions of integral equations driven by moderately irregular signals. We introduce also a new Banach space, containing as a proper subspace the paths with finite p-variation, and develop, in a systematic way, several parallel results for the paths from this space, obtained so far for the paths with finite p-variation. We start the paper with a general theorem on the existence of the Riemann-Stieltjes integral.