Finite energy of generalized suitable weak solutions to the navier-stokes equations and liouville-type theorems in two dimensional domains

Hideo Kozono, Yutaka Terasawa, Yuta Wakasugi

Research output: Contribution to journalArticlepeer-review

Abstract

Introducing a new notion of generalized suitable weak solutions, we first prove validity of the energy inequality for such a class of weak solutions to the Navier-Stokes equations in the whole space Rn. Although we need certain growth condition on the pressure, we may treat the class even with infinite energy quantity except for the initial velocity. We next handle the equation for vorticity in 2D unbounded domains. Under a certain condition on the asymptotic behavior at infinity, we prove that the vorticity and its gradient of solutions are both globally square integrable. As their applications, Loiuville- type theorems are obtained.

35Q30, 35B53, 76D05

Original languageEnglish
JournalUnknown Journal
Publication statusPublished - 2017 Aug 25

Keywords

  • Energy inequalities
  • Liouville-type theorems
  • Navier-Stokes equations

ASJC Scopus subject areas

  • General

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