Ciampa, Gennaro and Crippa, Gianluca and Spirito, Stefano. (2024) Propagation of logarithmic regularity and inviscid limit for the 2D Euler equations. Preprints Fachbereich Mathematik, 2024 (05).
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Official URL: https://edoc.unibas.ch/96518/
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Abstract
The aim of this note is to study the Cauchy problem for the 2D Euler equations under very low regularity assumptions on the initial datum. We prove propagation of regularity of logarithmic order in the class of weak solutions with $L^p$ initial vorticity, provided that $p\geq 4$. We also study the inviscid limit from the 2D Navier-Stokes equations for vorticity with logarithmic regularity in the Yudovich class, showing a rate of convergence of order $|\log\nu|^{-\alpha/2}$ with $\alpha>0$.
Faculties and Departments: | 05 Faculty of Science > Departement Mathematik und Informatik > Mathematik > Analysis (Crippa) 12 Special Collections > Preprints Fachbereich Mathematik |
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UniBasel Contributors: | Crippa, Gianluca |
Item Type: | Preprint |
Publisher: | Universität Basel |
Language: | English |
edoc DOI: | |
Last Modified: | 19 Jun 2024 06:46 |
Deposited On: | 19 Jun 2024 06:46 |
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