Non-linear Rough Heat Equations

Abstract

This article is devoted to define and solve an evolution equation of the form dyt= yt dt+ dXt(yt), where stands for the Laplace operator on a space of the form Lp(Rn), and X is a finite dimensional noisy nonlinearity whose typical form is given by Xt()=Σi=1N xit fi(), where each x=(x(1),...,x(N)) is a γ-H\"older function generating a rough path and each fi is a smooth enough function defined on Lp(Rn). The generalization of the usual rough path theory allowing to cope with such kind of systems is carefully constructed.