Statistical solutions to the barotropic Navier-Stokes system

Abstract

We introduce a new concept of statistical solution in the framework of weak solutions to the barotropic Navier--Stokes system with inhomogeneous boundary conditions. Statistical solution is a family \ Mt \t ≥ 0 of Markov operators on the set of probability measures P[D] on the data space D containing the initial data [0, m0] and the boundary data dB. (1) \ Mt \t ≥ 0 possesses a.a. semigroup property, Mt + s() = Mt Ms() for any t ≥ 0, a.a. s ≥ 0, and any ∈ P[D]. (2) \ Mt \t ≥ 0 is deterministic when restricted to deterministic data, specifically Mt(δ[0, m0, dB]) = δ[(t, ·), m(t, ·), dB], where [, m] is a finite energy weak solution of the Navier--Stokes system corresponding to the data [0, m0, dB] ∈ D. (3) Mt: P[D] P[D] is continuous in a suitable Bregman--Wasserstein metric at measures supported by the data giving rise to regular solutions.