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Main Authors: Du, Lili, Li, Xinliang, Ye, Weikui
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2506.15396
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author Du, Lili
Li, Xinliang
Ye, Weikui
author_facet Du, Lili
Li, Xinliang
Ye, Weikui
contents We show that for any $γ< \frac{1}{3}$ there exist Hölder continuous weak solutions $v \in C^γ([0,T] \times \mathbb{T}^2)$ of the two-dimensional incompressible Euler equations that strictly dissipate the total kinetic energy, improving upon the elegant work of Giri and Radu [Invent. Math., 238 (2), 2024]. Furthermore, we prove that the initial data of these \textit{admissible} solutions are dense in $B^γ_{\infty,r<\infty}$. Our approach introduces a new class of traveling waves, refining the traditional temporal oscillation function first proposed by Cheskidov and Luo [Invent. Math., 229(3), 2022], to effectively modulate energy on any time intervals. Additionally, we propose a novel ``multiple iteration scheme'' combining Newton-Nash iteration with a Picard-type iteration to generate an energy corrector for controlling total kinetic energy during the perturbation step. This framework enables us to construct dissipative weak solutions below the Onsager critical exponent in any dimension $d \geq 2$.
format Preprint
id arxiv_https___arxiv_org_abs_2506_15396
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Admissible solutions of the 2D Onsager's conjecture
Du, Lili
Li, Xinliang
Ye, Weikui
Analysis of PDEs
We show that for any $γ< \frac{1}{3}$ there exist Hölder continuous weak solutions $v \in C^γ([0,T] \times \mathbb{T}^2)$ of the two-dimensional incompressible Euler equations that strictly dissipate the total kinetic energy, improving upon the elegant work of Giri and Radu [Invent. Math., 238 (2), 2024]. Furthermore, we prove that the initial data of these \textit{admissible} solutions are dense in $B^γ_{\infty,r<\infty}$. Our approach introduces a new class of traveling waves, refining the traditional temporal oscillation function first proposed by Cheskidov and Luo [Invent. Math., 229(3), 2022], to effectively modulate energy on any time intervals. Additionally, we propose a novel ``multiple iteration scheme'' combining Newton-Nash iteration with a Picard-type iteration to generate an energy corrector for controlling total kinetic energy during the perturbation step. This framework enables us to construct dissipative weak solutions below the Onsager critical exponent in any dimension $d \geq 2$.
title Admissible solutions of the 2D Onsager's conjecture
topic Analysis of PDEs
url https://arxiv.org/abs/2506.15396