ON NONUNIQUENESS OF HÖLDER CONTINUOUS GLOBALLY DISSIPATIVE EULER FLOWS

Camillo De Lellis; Hyunju Kwon

doi:10.2140/apde.2022.15.2003

Abstract

We show that for any $\alpha < {1 \over 7}$ there exist $\alpha$ -Hölder continuous weak solutions of the three-dimensional incompressible Euler equation, which satisfy the local energy inequality and strictly dissipate the total kinetic energy. The proof relies on the convex integration scheme and the main building blocks of the solution are various Mikado flows with disjoint supports in space and time.

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Camillo De Lellis. Hyunju Kwon. "ON NONUNIQUENESS OF HÖLDER CONTINUOUS GLOBALLY DISSIPATIVE EULER FLOWS." Anal. PDE 15 (8) 2003 - 2059, 2022. https://doi.org/10.2140/apde.2022.15.2003

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Received: 11 September 2020; Revised: 9 February 2021; Accepted: 25 March 2021; Published: 2022

First available in Project Euclid: 14 February 2023

MathSciNet: MR4546502

zbMATH: 1509.35196

Digital Object Identifier: 10.2140/apde.2022.15.2003

Subjects:

Primary: 35Q31

Secondary: 35D30 , 76B03

Keywords: convex integration , Euler equations , Onsager’s conjecture , the local energy inequality

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