Three-dimensional coherent structures in a curved pipe flow

arXiv - PHYS - Fluid Dynamics Pub Date : 2024-09-17 DOI:arxiv-2409.11105

Runjie Song, Kengo Deguchi

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Abstract

Dean's approximation for curved pipe flow, valid under loose coiling and high Reynolds numbers, is extended to study three-dimensional travelling waves. Two distinct types of solutions bifurcate from the Dean's classic two-vortex solution. The first type arises through a supercritical bifurcation from inviscid linear instability, and the corresponding self-consistent asymptotic structure aligns with the vortex-wave interaction theory. The second type emerges from a subcritical bifurcation by curvature-induced instabilities and satisfies the boundary region equations. Despite the subcritical nature of the second type of solutions, it is not possible to connect their solution branches to the zero-curvature limit of the pipe. However, by continuing from known self-sustained exact coherent structures in the straight pipe flow problem, another family of three-dimensional travelling waves can be shown to exist across all Dean numbers. The self-sustained solutions also possess the two high-Reynolds-number limits. While the vortex-wave interaction type of solutions can be computed at large Dean numbers, their branch remains unconnected to the Dean vortex solution branch.

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弯曲管流中的三维相干结构

迪安曲线管道流近似法在松散卷曲和高雷诺数条件下有效，被扩展用于研究三维行波。从 Dean 的经典双涡解中分叉出两种不同类型的解。第一类是从粘性线性不稳定性的超临界分岔产生的，相应的自洽渐近结构与涡-波相互作用理论一致。第二种类型是由曲率诱导的不稳定性引起的亚临界分岔，并满足边界区域方程。尽管这些第二类解具有亚临界性质，但不可能将其解支与管道的零曲率极限连接起来。然而，通过延续直管流问题中已知的自持精确相干结构，可以证明存在跨越所有迪安数的另一个三维行波族。自持解也具有两个高雷诺数极限。虽然在大迪恩数下可以计算涡-波相互作用类型的解，但它们的分支仍然与迪恩涡解分支无关。

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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arXiv - PHYS - Fluid Dynamics

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