We investigate the scaling form of appropriate time-scales extracted from time-dependent correlation functions in rotating, turbulent flows. In particular, we obtain precise estimates of the dynamic exponents $z_p$, associated with the time-scales, and their relation with the more commonly measured equal-time exponents $\zeta_p$. These theoretical predictions, obtained by using the multifractal formalism, are validated through extensive numerical simulations of a shell model for such rotating flows.Comment: 7 pages, 2 figure
We describe numerical experiments of freely decaying, rapidly rotating turbulence in which the Rossb...
We discuss a stochastic closure for the equation of motion satisfied by multiscale correlation funct...
We obtain, by extensive direct numerical simulations, time-dependent and equal-time structure functi...
We show that different ways of extracting time scales from time-dependent velocity structure functio...
We give an overview of the progress that has been made in recent years in understanding dynamic mult...
We investigate the predictability aspects of rotating turbulent flows through extensive numerical si...
The objective of this research has been to develop a consistent theory of the scaling behaviour of t...
Inertial range scaling exponents for both Lagrangian and Eulerian structure functions are obtained f...
We show that different ways of extracting time scales from time-dependent velocity structure functio...
We systematize the study of dynamic multiscaling of time-dependent structure functions in different ...
We systematize the study of dynamic multiscaling of timedependent structure functions in different m...
Using a novel device that enables the real-time measurement of high-order structure functions in tur...
We discuss a stochastic closure for the equation of motion satisfied by multiscale correlation funct...
A multifractal-like representation for multi-time, multi-scale velocity correlation in turbulence an...
We describe numerical experiments of freely decaying, rapidly rotating turbulence in which the Rossb...
We discuss a stochastic closure for the equation of motion satisfied by multiscale correlation funct...
We obtain, by extensive direct numerical simulations, time-dependent and equal-time structure functi...
We show that different ways of extracting time scales from time-dependent velocity structure functio...
We give an overview of the progress that has been made in recent years in understanding dynamic mult...
We investigate the predictability aspects of rotating turbulent flows through extensive numerical si...
The objective of this research has been to develop a consistent theory of the scaling behaviour of t...
Inertial range scaling exponents for both Lagrangian and Eulerian structure functions are obtained f...
We show that different ways of extracting time scales from time-dependent velocity structure functio...
We systematize the study of dynamic multiscaling of time-dependent structure functions in different ...
We systematize the study of dynamic multiscaling of timedependent structure functions in different m...
Using a novel device that enables the real-time measurement of high-order structure functions in tur...
We discuss a stochastic closure for the equation of motion satisfied by multiscale correlation funct...
A multifractal-like representation for multi-time, multi-scale velocity correlation in turbulence an...
We describe numerical experiments of freely decaying, rapidly rotating turbulence in which the Rossb...
We discuss a stochastic closure for the equation of motion satisfied by multiscale correlation funct...
We obtain, by extensive direct numerical simulations, time-dependent and equal-time structure functi...