English

Statistical solutions to the barotropic Navier-Stokes system

Analysis of PDEs 2020-07-15 v1

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}t0\{ M_t \}_{t \geq 0} of Markov operators on the set of probability measures P[D]\mathfrak{P}[\mathcal{D}] on the data space D\mathcal{D} containing the initial data [ϱ0,m0][\varrho_0, \mathbf{m}_0] and the boundary data dB\mathbf{d}_B. (1) {Mt}t0\{ M_t \}_{t \geq 0} possesses a.a. semigroup property, Mt+s(ν)=MtMs(ν) M_{t + s}(\nu) = M_t \circ M_s(\nu) for any t0t \geq 0, a.a. s0s \geq 0, and any νP[D]\nu \in \mathfrak{P}[\mathcal{D}]. (2) {Mt}t0\{ M_t \}_{t \geq 0} is deterministic when restricted to deterministic data, specifically Mt(δ[ϱ0,m0,dB])=δ[ϱ(t,),m(t,),dB], M_t(\delta_{[\varrho_0, \mathbf{m}_0, \mathbf{d}_B]}) = \delta_{[\varrho(t, \cdot), \mathbf{m}(t, \cdot), \mathbf{d}_B]}, where [ϱ,m][\varrho, \mathbf{m}] is a finite energy weak solution of the Navier--Stokes system corresponding to the data [ϱ0,m0,dB]D[\varrho_0, \mathbf{m}_0, \mathbf{d}_B] \in \mathcal{D}. (3) Mt:P[D]P[D]M_t: \mathfrak{P}[\mathcal{D}] \to \mathfrak{P}[\mathcal{D}] is continuous in a suitable Bregman--Wasserstein metric at measures supported by the data giving rise to regular solutions.

Keywords

Cite

@article{arxiv.2003.04431,
  title  = {Statistical solutions to the barotropic Navier-Stokes system},
  author = {Francesco Fanelli and Eduard Feireisl},
  journal= {arXiv preprint arXiv:2003.04431},
  year   = {2020}
}

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Submitted

R2 v1 2026-06-23T14:09:28.225Z