Fully developed turbulence is characterized by markedly non-Gaussian statistics. Here, we discuss some aspects of the relation between non-Gaussianity, the emergence of coherent structures and phase correlations in turbulence. Direct numerical simulations of homogeneous isotropic turbulence are used to demonstrate a fairly rapid emergence of non-Gaussian statistics from Gaussian initial conditions
Motived by the work of Li and Meneveau (Phys. Rev. Lett. 95, 164502 (2005)), we propose and solve a ...
Fully developed homogeneous isotropic turbulent fields, computed by direct numerical simulation, are...
It is hypothesized that the transition to turbulence in nonclosed fluid flows and the formation of ...
Fully developed turbulence is characterized by markedly non-Gaussian statistics. Here, we discuss so...
Motivated by the need to capture statistical properties of turbulent systems in simple, analytically...
Spectral method simulations of ideal magnetohydrodynamics are used to investigate production of cohe...
Turbulent flows are notoriously difficult to describe and understand based on first principles. One ...
This paper reports an experimental study on the correlation between the deviation from Gaussianity o...
Turbulent systems exhibit a remarkable multiscale complexity, in which spatial structures induce sca...
We present results on the connection between the vorticity equation and the shape and evolution of t...
Fluid turbulence is often referred to as 'the unsolved problem of classical physics'. Yet, paradoxic...
We study the statistical properties of fully developed hydrodynamical turbulence. To this end, a the...
We investigate the single-point probability density function of the velocity in three-dimensional st...
Non-gaussianity represents the statistical signature of physical processes such as turbulence. It c...
We investigate the single-point velocity probability density function (PDF) in three-dimensional ful...
Motived by the work of Li and Meneveau (Phys. Rev. Lett. 95, 164502 (2005)), we propose and solve a ...
Fully developed homogeneous isotropic turbulent fields, computed by direct numerical simulation, are...
It is hypothesized that the transition to turbulence in nonclosed fluid flows and the formation of ...
Fully developed turbulence is characterized by markedly non-Gaussian statistics. Here, we discuss so...
Motivated by the need to capture statistical properties of turbulent systems in simple, analytically...
Spectral method simulations of ideal magnetohydrodynamics are used to investigate production of cohe...
Turbulent flows are notoriously difficult to describe and understand based on first principles. One ...
This paper reports an experimental study on the correlation between the deviation from Gaussianity o...
Turbulent systems exhibit a remarkable multiscale complexity, in which spatial structures induce sca...
We present results on the connection between the vorticity equation and the shape and evolution of t...
Fluid turbulence is often referred to as 'the unsolved problem of classical physics'. Yet, paradoxic...
We study the statistical properties of fully developed hydrodynamical turbulence. To this end, a the...
We investigate the single-point probability density function of the velocity in three-dimensional st...
Non-gaussianity represents the statistical signature of physical processes such as turbulence. It c...
We investigate the single-point velocity probability density function (PDF) in three-dimensional ful...
Motived by the work of Li and Meneveau (Phys. Rev. Lett. 95, 164502 (2005)), we propose and solve a ...
Fully developed homogeneous isotropic turbulent fields, computed by direct numerical simulation, are...
It is hypothesized that the transition to turbulence in nonclosed fluid flows and the formation of ...