Non-uniqueness of Leray-Hopf solutions for stochastic forced Navier-Stokes equations

Abstract

We consider stochastic forced Navier--Stokes equations on R3 starting from zero initial condition. The noise is linear multiplicative and the equations are perturbed by an additional body force. Based on the ideas of Albritton, Bru\'e and Colombo ABC22, we prove non-uniqueness of local-in-time Leray--Hopf solutions as well as joint non-uniqueness in law for solutions on R+. In the deterministic setting, we show that the set of forces, for which Leray--Hopf solutions are non-unique, is dense in L1tL2x. In addition, by a simple controllability argument we show that for every divergence-free initial condition in L2x there is a force so that non-uniqueness of Leray--Hopf solutions holds.