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Beijing–Moscow Mathematics Colloquium
19 мая 2023 г. 12:00–13:00, г. Москва, online
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Folding in fluids
E. A. Kuznetsov P. N. Lebedev Physical Institute of the Russian Academy of Sciences, Moscow
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Количество просмотров: |
Эта страница: | 152 |
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Аннотация:
The formation of the coherent vortical structures in the form of thin pancakes for three-dimensional flows is studied at the high Reynolds regime when, in the leading order, the development of such structures can be described within the Euler equations for ideal incompressible fluids. Numerically and analytically on the base of the vortex line representation [1, 2] we show that compression of such structures and respectively increase of their amplitudes are possible due to the compressibility of the vorticity ω in the 3D case [3]. It is demonstrated that this growth has an exponential behavior and can be considered as folding (analog of breaking) for the divergence-free fields of vorticity. At high amplitudes this process in 3D has a self-similar behavior connected the maximal vorticity and the pancake width by the relation of the universal type [4]: $\omega_{\max} \propto l^{-2/3}$
Язык доклада: английский
Список литературы
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E.A. Kuznetsov, V.P. Ruban, “Hamiltonian dynamics of vortex lines for systems of the hydrodynamic type”, Pis'ma ZhETF, 76 (1998), 1015 [JETP Letters, 67 (1998), 1076–1081]
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E.A. Kuznetsov, “Vortex line representation for flows of ideal and viscous fluids”, Pis'ma v ZHETF, 76 (2002), 406–410 [JETP Letters, 76 (2002), 346–350]
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D.S. Agafontsev, E.A. Kuznetsov, A.A. Mailybaev, and E.V. Sereshchenko, “Compressible vortical structures and their role in the hydrodynamical turbulence onset”, UFN, 192 (2022), 205–225 [Physics Uspekhi, 65 (2022), 189–208]
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D.S. Agafontsev, E.A. Kuznetsov and A.A. Mailybaev, “Development of high vorticity structures and geometrical properties of the vortex line representation”, Phys. Fluids, 30 (2018), 095104-13; “Stability of tangential discontinuity for the vortex pancakes”, Pisma ZHETF, 114 (2021), 67–71 [JETP Letters, 114 (2021), 71–75]
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