A reason has been given for the inverse energy cascade in the two-dimensionalised rapidly rotating 3D incompressible turbulence. For such system, literature shows a possibility of the exponent of wavenumber in the energy spectrum's relation to lie between -2 and -3. We argue the existence of a more strict range of -2 to -7/3 for the exponent in the case of rapidly rotating turbulence which is in accordance with the recent experiments. Also, a rigorous derivation for the two point third order structure function has been provided helping one to argue that even with slow rotation one gets, though dominated, a spectrum with the exponent -2.87, thereby hinting at the initiation of the two-dimensionalisation effect with rotation
It is known that rapidly rotating turbulent flows are characterized by the emergence of simultaneous...
We present numerical evidence of how three-dimensionalization occurs at small scale in rotating turb...
Applying a modified version of the Gledzer-Ohkitani-Yamada (GOY) shell model, the signatures of so-c...
We first summarize briefly several properties concerning the dynamics of two-dimensional (2D) turbul...
Rotating turbulence is an example of a three-dimensional system in which an inverse cascade of energ...
International audienceIn this work we investigate, by means of direct numerical hyperviscous simulat...
The inertial-range properties of quasi-stationary hydrodynamic turbulence under solid-body rotation ...
The transition between three-dimensional and quasi-two-dimensional turbulence in a rotating frame is...
A fundamental problem in uid dynamics that remains a mystery, even after half a century of dedicate...
Rapidly rotating turbulent flow is characterized by the emergence of columnar structures that are re...
The existence of energy cascades as signatures of conserved magnitudes is one of the universal chara...
textMotivated by the variation of Coriolis effects on planetary scale flows, we explore rotating tu...
We examine the inverse cascade of kinetic energy to large scales in rotating stratified turbulence a...
The swirling structure of fluid motion has fascinated people since the earliest recorded observation...
We study the statistical properties of homogeneous and isotropic three-dimensional (3D) turbulent fl...
It is known that rapidly rotating turbulent flows are characterized by the emergence of simultaneous...
We present numerical evidence of how three-dimensionalization occurs at small scale in rotating turb...
Applying a modified version of the Gledzer-Ohkitani-Yamada (GOY) shell model, the signatures of so-c...
We first summarize briefly several properties concerning the dynamics of two-dimensional (2D) turbul...
Rotating turbulence is an example of a three-dimensional system in which an inverse cascade of energ...
International audienceIn this work we investigate, by means of direct numerical hyperviscous simulat...
The inertial-range properties of quasi-stationary hydrodynamic turbulence under solid-body rotation ...
The transition between three-dimensional and quasi-two-dimensional turbulence in a rotating frame is...
A fundamental problem in uid dynamics that remains a mystery, even after half a century of dedicate...
Rapidly rotating turbulent flow is characterized by the emergence of columnar structures that are re...
The existence of energy cascades as signatures of conserved magnitudes is one of the universal chara...
textMotivated by the variation of Coriolis effects on planetary scale flows, we explore rotating tu...
We examine the inverse cascade of kinetic energy to large scales in rotating stratified turbulence a...
The swirling structure of fluid motion has fascinated people since the earliest recorded observation...
We study the statistical properties of homogeneous and isotropic three-dimensional (3D) turbulent fl...
It is known that rapidly rotating turbulent flows are characterized by the emergence of simultaneous...
We present numerical evidence of how three-dimensionalization occurs at small scale in rotating turb...
Applying a modified version of the Gledzer-Ohkitani-Yamada (GOY) shell model, the signatures of so-c...