Integration of nonsmooth 2-forms: from Young to It\o and Stratonovich

Abstract

We show that geometric integrals of the type ∫ f\, d g1 \, d g2 can be defined over a two-dimensional domain when the functions f, g1, g2 R2 R are just H\"older continuous with sufficiently large H\"older exponents and the boundary of has sufficiently small dimension, by summing over a refining sequence of partitions the discrete Stratonovich or It\o type terms. This leads to a two-dimensional extension of the classical Young integral that coincides with the integral introduced recently by R.~Z\"ust. We further show that the Stratonovich-type summation allows to weaken the requirements on H\"older exponents of the map g=(g1,g2) when f(x)=F(x,g(x)) with F sufficiently regular. The technique relies upon an extension of the sewing lemma from Rough paths theory to alternating functions of two-dimensional oriented simplices, also proven in the paper.