L1-Uniqueness of regularized 2D-Euler and stochastic Navier–Stokes equations

Abstract

A regularization of the 2D-Euler equation with periodic boundary conditions is introduced, having the same infinitesimal invariants as the Euler equation. A flow of measure-preserving transformations is constructed on L 1-spaces induced by the Gaussian measure with covariance given by the inverse of the enstrophy and it is shown that this flow is the only measure-preserving flow inducing a strongly continuous semigroup on the corresponding L 1-space. We also prove similar uniqueness results for a corresponding class of regularized stochastic 2D-Navier–Stokes equations.