Variational Dual Solutions for Incompressible Fluids

arXiv - MATH - Analysis of PDEs Pub Date : 2024-09-07 DOI:arxiv-2409.04911
Amit Acharya, Bianca Stroffolini, Arghir Zarnescu
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Abstract

We consider a construction proposed in \cite{acharyaQAM} that builds on the notion of weak solutions for incompressible fluids to provide a scheme that generates variationally a certain type of dual solutions. If these dual solutions are regular enough one can use them to recover standard solutions. The scheme provides a generalisation of a construction of Y. Brenier for the Euler equations. We rigorously analyze the scheme, extending the work of Y.Brenier for Euler, and also provide an extension of it to the case of the Navier-Stokes equations. Furthermore we obtain the inviscid limit of Navier-Stokes to Euler as a $\Gamma$-limit.
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不可压缩流体的变分二元解法
我们考虑了 \cite{acharyaQAM}中提出的一种构造,它以不可压缩流体的弱解运动为基础,提供了一种以变化方式生成某类对偶解的方案。如果这些对偶解足够正则,我们就可以用它们来恢复标准解。该方案提供了布雷尼尔(Y. Brenier)对欧拉方程构造的概括。我们对该方案进行了严格分析,扩展了 Y. Brenier 针对欧拉方程的工作,并将其扩展到纳维尔-斯托克斯方程的情况。此外,我们还以 $\Gamma$ 极限的形式得到了纳维尔-斯托克斯到欧拉的粘性极限。
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arXiv - MATH - Analysis of PDEs
arXiv - MATH - Analysis of PDEs
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