尽管存在源和汇,但二维不可压缩Euler方程Yudovich解的唯一性

IF 1.3 2区 数学 Q1 MATHEMATICS Revista Matematica Iberoamericana Pub Date : 2021-06-22 DOI:10.4171/rmi/1370
Florent Noisette, F. Sueur
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引用次数: 4

摘要

1962年,Yudovich证明了二维不可压缩欧拉方程经典解的存在唯一性,当流体占据一个有界区域,边界的某些部分有进出流时。在整个边界上规定了法向速度,并规定了进入涡量。Yudovich的结果的唯一性部分适用于Hölder涡度,与他1961年关于不渗透边界的结果相反,在不渗透边界上规定法向速度为零,并且证明初始涡度有界的假设足以保证唯一性。在进入和退出流动的情况下,是否唯一性也适用于有界涡,这个问题直到2014年才得到解决,当时Weigant和Papin成功地解决了域是矩形的情况。本文将Weigant和Papin的结果应用于具有多个内部源和汇的光滑域。
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Uniqueness of Yudovich’s solutions to the 2D incompressible Euler equation despite the presence of sources and sinks
In 1962, Yudovich proved the existence and uniqueness of classical solutions to the 2D incompressible Euler equations in the case where the fluid occupies a bounded domain with entering and exiting flows on some parts of the boundary. The normal velocity is prescribed on the whole boundary, as well as the entering vorticity. The uniqueness part of Yudovich’s result holds for Hölder vorticity, by contrast with his 1961 result on the case of an impermeable boundary, for which the normal velocity is prescribed as zero on the boundary, and for which the assumption that the initial vorticity is bounded was shown to be sufficient to guarantee uniqueness. Whether or not uniqueness holds as well for bounded vorticities in the case of entering and exiting flows has been left open until 2014, when Weigant and Papin succeeded to tackle the case where the domain is a rectangle. In this paper we adapt Weigant and Papin’s result to the case of a smooth domain with several internal sources and sinks.
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来源期刊
CiteScore
2.40
自引率
0.00%
发文量
61
审稿时长
>12 weeks
期刊介绍: Revista Matemática Iberoamericana publishes original research articles on all areas of mathematics. Its distinguished Editorial Board selects papers according to the highest standards. Founded in 1985, Revista is a scientific journal of Real Sociedad Matemática Española.
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