Stochastic Lagrangian path for Leray solutions of 3D Navier-Stokes equations

Abstract

In this paper we show the existence of stochastic Lagrangian particle trajectory for Leray's solution of 3D Navier-Stokes equations. More precisely, for any Leray's solution u of 3D-NSE and each (s,x)∈R+×R3, we show the existence of weak solutions to the following SDE, which has a density s,x(t,y) belonging to H1,pq provided p,q∈[1,2) with 3p+2q>4: d Xs,t= u (s,Xs,t)d t+2d Wt,\ \ Xs,s=x,\ \ t≥ s, where W is a three dimensional standard Brownian motion, >0 is the viscosity constant. Moreover, we also show that for Lebesgue almost all (s,x), the solution Xns,·(x) of the above SDE associated with the mollifying velocity field un weakly converges to Xs,·(x) so that X is a Markov process in almost sure sense.