We study inertial motions of the coupled system, , constituted by a rigid body containing a cavity entirely filled with a viscous liquid. We show that for arbitrary initial data having only finite kinetic energy, every corresponding weak solution (A la Leray-Hopf) converges, as time goes to infinity, to a uniform rotation, unless two central moments of inertia of coincide and are strictly greater than the third one. This corroborates a famous "conjecture" of N.Ye. Zhukovskii in several physically relevant cases. Moreover, we show that, in a known range of initial data, this rotation may only occur along the central axis of inertia of with the larger moment of inertia. We also provide necessary and sufficient conditions for the rigorous nonlinear stability of permanent rotations, which improve and/or generalize results previously given by other authors under different types of approximation. Finally, we present results obtained by a targeted numerical simulation that, on the one hand, complement the analytical findings, whereas, on the other hand, point out new features that the analysis is yet not able to catch, and, as such, lay the foundation for interesting and challenging future investigation.
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机译:我们研究耦合系统的惯性运动,该系统由一个刚体构成,该刚体包含一个完全充满粘性液体的空腔。我们表明,对于仅具有有限动能的任意初始数据,除非时间的两个无穷大中心惯性矩一致且严格大于,否则每个相应的弱解(A la Leray-Hopf)都会随着时间趋于无穷而收敛到均匀旋转。第三个。这证实了叶N的一个著名的“猜想”。茹科夫斯基在几个与身体相关的案例中。此外,我们表明,在已知的初始数据范围内,此旋转可能仅沿具有较大惯性矩的惯性中心轴发生。我们还为永久旋转的严格非线性稳定性提供了必要和充分的条件,这些条件改善和/或概括了以前其他作者在不同近似类型下给出的结果。最后,我们介绍了通过有针对性的数值模拟获得的结果,该数值模拟一方面补充了分析结果,另一方面,指出了分析仍无法捕捉的新功能,因此,进行有趣且具有挑战性的未来调查的基础。
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