Coherent structures in an energy-enstrophy theory for axisymmetric flows
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Publication:3556359
DOI10.1063/1.1529660zbMath1185.76228OpenAlexW1972379194MaRDI QIDQ3556359
Publication date: 22 April 2010
Published in: Physics of Fluids (Search for Journal in Brave)
Full work available at URL: https://semanticscholar.org/paper/0870f5b0caf629cffe6a6ae98fb832d41456e5ec
Related Items (5)
Statistical mechanics of the 3D axisymmetric Euler equations in a Taylor–Couette geometry ⋮ Hyperviscosity and statistical equilibria of Euler turbulence on the torus and the sphere ⋮ Alternative statistical-mechanical descriptions of decaying two-dimensional turbulence in terms of “patches” and “points” ⋮ The spherical model of logarithmic potentials as examined by Monte Carlo methods ⋮ Phase Transition to Quadrupolar Vortices in a Spherical Model of the Energy-Enstrophy Theory — Exact Solution
Cites Work
- Ideal magnetofluid turbulence in two dimensions
- Dirichlet quotients and 2D periodic Navier-Stokes equations
- KAM theory analysis of the dynamics of three coaxial vortex rings
- Numerical experiments on vortex ring formation
- Statistical equilibrium theory for axisymmetric flows: Kelvin’s variational principle and an explanation for the vortex ring pinch-off process
- Nonlinear stability of axisymmetric swirling flows
- Theory of the vortex breakdown phenomenon
- Statistical equilibrium states for two-dimensional flows
- Statistical dynamics of two-dimensional flow
- A universal time scale for vortex ring formation
- Statistical mechanics of Euler equations in two dimensions
- Statistical Ensembles of Complex, Quaternion, and Real Matrices
- The Spherical Model of a Ferromagnet
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