Existence and uniqueness by Kraichnan noise for 2D Euler equations with unbounded vorticity

Abstract

We consider the 2D Euler equations on 2 in vorticity form, with unbounded initial vorticity, perturbed by a suitable non-smooth Kraichnan transport noise, with regularity index α∈ (0,1). We show weak existence for every H-1 initial vorticity. Thanks to the noise, the solutions that we construct are limits in law of a regularized stochastic Euler equation and enjoy an additional L2([0,T];H-α) regularity. For every p>3/2 and for certain regularity indices α ∈ (0,1/2) of the Kraichnan noise, we show also pathwise uniqueness for every Lp initial vorticity. This result is not known without noise.