Three examples of Brownian flows on

Abstract

We show that the only flow solving the stochastic differential equation (SDE) on dXt = 1\Xt>0\W+(dt) + 1\Xt<0\dW-(dt), where W+ and W- are two independent white noises, is a coalescing flow we will denote . The flow is a Wiener solution. Moreover, K+=[δ|W+] is the unique solution (it is also a Wiener solution) of the SDE K+s,tf(x)=f(x)+∫st Ks,u(1+f')(x)W+(du)+(1/2) ∫st Ks,uf"(x) du for $s