Related references
Note: Only part of the references are listed.Transition from non-swirling to swirling axisymmetric turbulence
Zecong Qin et al.
PHYSICAL REVIEW FLUIDS (2020)
Linearly forced isotropic turbulence at low Reynolds numbers
Wouter J. T. Bos et al.
PHYSICAL REVIEW E (2020)
Cascades of energy and helicity in axisymmetric turbulence
Bo Qu et al.
PHYSICAL REVIEW FLUIDS (2018)
Hierarchy of antiparallel vortex tubes in spatially periodic turbulence at high Reynolds numbers
Susumu Goto et al.
PHYSICAL REVIEW FLUIDS (2017)
Direct numerical simulation of axisymmetric turbulence
Bo Qu et al.
PHYSICAL REVIEW FLUIDS (2017)
Critical transitions in thin layer turbulence
Santiago Jose Benavides et al.
JOURNAL OF FLUID MECHANICS (2017)
Exact two-dimensionalization of low-magnetic-Reynolds-number flows subject to a strong magnetic field
Basile Gallet et al.
JOURNAL OF FLUID MECHANICS (2015)
Exact two-dimensionalization of rapidly rotating large-Reynolds-number flows
Basile Gallet
JOURNAL OF FLUID MECHANICS (2015)
A statistical mechanics framework for the large-scale structure of turbulent von Karman flows
Simon Thalabard et al.
NEW JOURNAL OF PHYSICS (2015)
Turbulence on a Fractal Fourier Set
Alessandra S. Lanotte et al.
PHYSICAL REVIEW LETTERS (2015)
Quasi-cyclic evolution of turbulence driven by a steady force in a periodic cube
Tatsuya Yasuda et al.
FLUID DYNAMICS RESEARCH (2014)
Statistical mechanics of the 3D axisymmetric Euler equations in a Taylor-Couette geometry
Simon Thalabard et al.
JOURNAL OF STATISTICAL MECHANICS-THEORY AND EXPERIMENT (2014)
Inverse cascade and symmetry breaking in rapidly rotating Boussinesq convection
B. Favier et al.
PHYSICS OF FLUIDS (2014)
Scale by scale anisotropy in freely decaying rotating turbulence
Alexandre Delache et al.
PHYSICS OF FLUIDS (2014)
A 3D pseudospectral method for cylindrical coordinates. Application to the simulations of rotating cavity flows
Noele Peres et al.
JOURNAL OF COMPUTATIONAL PHYSICS (2012)
Turbulence in Noninteger Dimensions by Fractal Fourier Decimation
Uriel Frisch et al.
PHYSICAL REVIEW LETTERS (2012)
Upscale energy transfer in thick turbulent fluid layers
H. Xia et al.
NATURE PHYSICS (2011)
Two-dimensional state in driven magnetohydrodynamic turbulence
Barbara Bigot et al.
PHYSICAL REVIEW E (2011)
Energy Dissipating Structures Produced by Walls in Two-Dimensional Flows at Vanishing Viscosity
Romain Nguyen van Yen et al.
PHYSICAL REVIEW LETTERS (2011)
Statistical mechanics of Beltrami flows in axisymmetric geometry: equilibria and bifurcations
Aurore Naso et al.
JOURNAL OF STATISTICAL MECHANICS-THEORY AND EXPERIMENT (2010)
Statistical mechanics of Beltrami flows in axisymmetric geometry: Theory reexamined
Aurore Naso et al.
PHYSICAL REVIEW E (2010)
Turbulence in More than Two and Less than Three Dimensions
Antonio Celani et al.
PHYSICAL REVIEW LETTERS (2010)
On the two-dimensionalization of quasistatic magnetohydrodynamic turbulence
B. Favier et al.
PHYSICS OF FLUIDS (2010)
Fluctuation-Dissipation Relations and Statistical Temperatures in a Turbulent von Karman Flow
Romain Monchaux et al.
PHYSICAL REVIEW LETTERS (2008)
A spectral vanishing viscosity for the LES of turbulent flows within rotating cavities
E. Severac et al.
JOURNAL OF COMPUTATIONAL PHYSICS (2007)
Dynamics and thermodynamics of axisymmetric flows: Theory
N Leprovost et al.
PHYSICAL REVIEW E (2006)
Properties of steady states in turbulent axisymmetric flows
R Monchaux et al.
PHYSICAL REVIEW LETTERS (2006)
Toward an experimental von Karman dynamo:: Numerical studies for an optimized design -: art. no. 117104
F Ravelet et al.
PHYSICS OF FLUIDS (2005)
Linear forcing in numerical simulations of isotropic turbulence: Physical space implementations and convergence properties
C Rosales et al.
PHYSICS OF FLUIDS (2005)
Spectral collocation schemes on the unit disc
W Heinrichs
JOURNAL OF COMPUTATIONAL PHYSICS (2004)
A spectral projection method for the simulation of complex three-dimensional rotating flows
I Raspo et al.
COMPUTERS & FLUIDS (2002)
Statistical equilibrium theory for axisymmetric flows: Kelvin's variational principle and an explanation for the vortex ring pinch-off process
K Mohseni
PHYSICS OF FLUIDS (2001)
Share Paper
