Author:
Berselli Luigi C.,Georgiadis Stefanos
Abstract
AbstractWe consider the 3D Euler equations for incompressible homogeneous fluids and we study the problem of energy conservation for weak solutions in the space-periodic case. First, we prove the energy conservation for a full scale of Besov spaces, by extending some classical results to a wider range of exponents. Next, we consider the energy conservation in the case of conditions on the gradient, recovering some results which were known, up to now, only for the Navier–Stokes equations and for weak solutions of the Leray-Hopf type. Finally, we make some remarks on the Onsager singularity problem, identifying conditions which allow to pass to the limit from solutions of the Navier–Stokes equations to solution of the Euler ones, producing weak solutions which are energy conserving.
Publisher
Springer Science and Business Media LLC
Reference20 articles.
1. Beirão da Veiga, H., Yang, J.: On the energy equality for solutions to Newtonian and non-Newtonian fluids. Nonlinear Anal. 185, 388–402 (2019)
2. Berselli, L.C.: Three-Dimensional Navier–Stokes Equations for Turbulence. Mathematics in Science and Engineering, p. 2021. Academic Press, London (2021)
3. Berselli, L.C.: Energy conservation for weak solutions of incompressible fluid equations: The Hölder case and connections with Onsager’s conjecture. J. Differ. Equ. 368, 350–375 (2023)
4. Berselli, L.C.: Remarks on the “Onsager Singularity Theorem’’ for Leray-Hopf weak solutions: The Hölder continuous case. Mathematics 11(4), 2023 (2023)
5. Berselli, L.C., Chiodaroli, E.: On the energy equality for the 3D Navier–Stokes equations. Nonlinear Anal. 192, 111704 (2020)
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4 articles.
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