The 2D Euler equations are well-posed for generic initial data in L2

Abstract

In this note we show the existence of a residual set (in the sense of Baire) of divergence free initial data u0∈ L2(D), D=R2 or T2, for which global existence and uniqueness of weak solutions to the incompressible 2D Euler equations holds. The associated solutions u satisfy the energy balance and are recovered in the vanishing viscosity limit from solutions to 2D Navier-Stokes, which as a consequence cannot display anomalous dissipation of energy. Additionally, there exists a unique regular Lagrangian flow associated to such u, and the associated transport equation is well-posed. Finally, when D=T2, the solution u is recovered as the limit of Galerkin approximations. The proof relies on global existence of smooth solutions and weak-strong uniqueness arguments.