Inertial range scaling, Kármán-Howarth theorem, and intermittency for forced and decaying Lagrangian averaged magnetohydrodynamic equations in two dimensions
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Publication:5756018
DOI10.1063/1.2194966zbMath1185.76714arXivphysics/0508173OpenAlexW2952581430WikidataQ57556329 ScholiaQ57556329MaRDI QIDQ5756018
J. Pietarila Graham, Annick Pouquet, Darryl D. Holm, Pablo D. Mininni
Publication date: 15 August 2007
Published in: Physics of Fluids (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/physics/0508173
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Cites Work
- Unnamed Item
- Direct numerical simulations of the Navier-Stokes alpha model
- The Euler-Poincaré equations and semidirect products with applications to continuum theories
- Exact results on stationary turbulence in 2D: Consequences of vorticity conservation
- On the validity of a nonlocal approach for MHD turbulence
- A numerical study of the alpha model for two-dimensional magnetohydrodynamic turbulent flows
- An alternative interpretation for the Holm “alpha model”
- Subgrid modeling for magnetohydrodynamic turbulent shear flows
- Kármán–Howarth theorem for the Lagrangian-averaged Navier–Stokes–alpha model of turbulence
- Local 4/5-law and energy dissipation anomaly in turbulence
- Lagrangian averages, averaged Lagrangians, and the mean effects of fluctuations in fluid dynamics
- Intermittency and relative scaling of subgrid-scale energy dissipation in isotropic turbulence
- On the Statistical Theory of Isotropic Turbulence
- The theory of axisymmetric turbulence
- The invariant theory of isotropic turbulence in magneto-hydrodynamics
- The Navier-Stokes-alpha model of fluid turbulence
