The large-time asymptotics of 2D micropolar flows depend only on kinematic viscosity μ, independent of χ, γ, and κ, via a new enstrophy-like identity relating fluid vorticity to micro-angular velocity.
Lions.Quelques m´ ethodes de r´ esolution des probl` emes aux limites non lin´ eaires
2 Pith papers cite this work. Polarity classification is still indexing.
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2026 2verdicts
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Existence of weak solutions satisfying natural bounds and an expanded Leray-Hopf energy inequality is proved for the 3D Beris-Edwards system with stable Landau-de Gennes potential.
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On the Role of the Viscosity Parameters in the Large Time Asymptotics of 2D Micropolar Flows
The large-time asymptotics of 2D micropolar flows depend only on kinematic viscosity μ, independent of χ, γ, and κ, via a new enstrophy-like identity relating fluid vorticity to micro-angular velocity.
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Leray--Hopf Type Weak Solutions for the Three-Dimensional Beris--Edwards System with Stable Landau--de Gennes Potential
Existence of weak solutions satisfying natural bounds and an expanded Leray-Hopf energy inequality is proved for the 3D Beris-Edwards system with stable Landau-de Gennes potential.