Effect of confinement on the transition from 2D to 3D fast rotating flows
| Autor: | Lohani, Chandra Shekhar, Nayak, Suraj Kumar, Seshasayanan, Kannabiran |
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| Rok vydání: | 2023 |
| Předmět: | |
| Druh dokumentu: | Working Paper |
| DOI: | 10.1103/PhysRevFluids.9.034604 |
| Popis: | We study the effect of confinement on the three-dimensional linear instability of fastly rotating two-dimensional turbulent flows. Using the large scale friction to model the effect of top and bottom boundaries, we study the onset of three-dimensional perturbations on a rapidly rotating flow. The friction term is taken to affect both the evolution of the two-dimensional turbulent flow and the perturbations that evolve on top of it. Using direct numerical simulations, the threshold for the onset of three-dimensional perturbations is traced out as a function of the control parameters. As reported in the earlier work (K. Seshasayanan and B. Gallet. 2020. Onset of three-dimensionality in rapidly rotating turbulent flows), two different mechanisms, namely the centrifugal and parametric type instabilities, are responsible for the destabilisation across the wide range of parameters explored in this study. In the turbulent regime, we find that the large scale friction term does not affect the threshold in the case of centrifugal instability while in the case of the parametric instability the instability threshold is shifted to larger Rossby numbers. For the parametric instability, the length scale of the unstable mode is found to scale as the inverse square root of the rotation rate and the growth rate of the unstable mode is found to be correlated with the minimum of the determinant of the strain rate tensor of the underlying two-dimensional turbulent flow, showing resemblance with elliptical type instabilities. Results from the turbulent flow are then compared with the oscillatory Kolmogorov flow, which undergoes a parametric instability resulting into inertial waves. The dependence of the threshold on the aspect ratio of the system is discussed for both the turbulent and the oscillating Kolmogorov flows. Comment: 13 pages, 9 figures |
| Databáze: | arXiv |
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