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Dynamics of Partial Differential Equations
Volume 19 (2022)
Number 1
On the well-posedness of the incompressible Euler equations in a larger space of Besov–Morrey type
Pages: 23 – 49
DOI: https://dx.doi.org/10.4310/DPDE.2022.v19.n1.a2
Authors
Abstract
We obtain a local-in-time well-posedness result and blow-up criterion for the incompressible Euler equations in a new framework, namely Besov spaces based on modified weak-Morrey spaces, covering critical and supercritical cases of the regularity. In comparison with some previous results and considering the same level of regularity, we provide a larger initial-data class for the well-posedness of the Euler equations. For that matter, following the Chemin approach, we need to prove some properties and estimates in those spaces such as preduality, the action of volume preserving diffeomorphism, product and commutator-type estimates, logarithmic-type inequalities, among others.
Keywords
Euler equations, well-posedness, Besov-type spaces, blow up, volume-preserving map, commutator estimates, Morrey-type spaces
2010 Mathematics Subject Classification
35Axx, 35Q31, 42B35, 46E30, 46E35, 76B03
L. C. F. Ferreira was supported by FAPESP and CNPq, Brazil.
J. E. Pérez-López was supported by Vicerrectoría de Investigación y Extensión, UIS, Project C-2020-05, Colombia.
Received 16 December 2020
Published 2 December 2021