Well-posedness theory for non-homogeneous incompressible fluids with odd viscosity

IF 4.6 Q2 MATERIALS SCIENCE, BIOMATERIALS
Francesco Fanelli , Rafael Granero-Belinchón , Stefano Scrobogna
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引用次数: 0

Abstract

Several fluid systems are characterised by time reversal and parity breaking. Examples of such phenomena arise both in quantum and classical hydrodynamics. In these situations, the viscosity tensor, often dubbed “odd viscosity”, becomes non-dissipative. At the mathematical level, this fact translates into a loss of derivatives at the level of a priori estimates: while the odd viscosity term depends on derivatives of the velocity field, no parabolic smoothing effect can be expected.

In the present paper, we establish a well-posedness theory in Sobolev spaces for a system of incompressible non-homogeneous fluids with odd viscosity. The crucial point of the analysis is the introduction of a set of good unknowns, which allow for the emerging of a hidden hyperbolic structure underlying the system of equations. It is exactly this hyperbolic structure which makes it possible to circumvent the derivative loss and propagate high enough Sobolev norms of the solution. The well-posedness result is local in time; two continuation criteria are also established.

具有奇数粘度的非均质不可压缩流体的解析理论
一些流体系统具有时间逆转和奇偶性破缺的特征。量子流体力学和经典流体力学中都有此类现象。在这些情况下,粘度张量(通常被称为 "奇异粘度")变得非消散。在数学层面上,这一事实转化为先验估计层面上导数的损失:虽然奇异粘度项取决于速度场的导数,但并不预期会产生抛物线平滑效应。在本文中,我们为具有奇异粘度的不可压缩非均相流体系统建立了索波列夫空间中的好求理论。分析的关键点在于引入一组良好的未知数,从而在方程系统的基础上出现一个隐藏的双曲结构。正是这种双曲结构使我们有可能规避导数损失,并传播足够高的解的 Sobolev 准则。好求解结果在时间上是局部的;同时还建立了两个延续准则。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
ACS Applied Bio Materials
ACS Applied Bio Materials Chemistry-Chemistry (all)
CiteScore
9.40
自引率
2.10%
发文量
464
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