The properties of acceleration fluctuations in isotropic turbulence are studied in direct numerical simulations (DNS) by decomposing the acceleration as the sum of local and convective contributions (aL = ?u/?t and aC = u??u), or alternatively as the sum of irrotational and solenoidal contributions [aI = ??(p/?) and aS = ??2u]. The main emphasis is on the nature of the mutual cancellation between aL and aC which must occur in order for the acceleration (a) to be small as predicted by the “random Taylor hypothesis” [Tennekes, J. Fluid Mech. 67, 561 (1975)] of small eddies in turbulent flow being passively “swept” past a stationary Eulerian observer. Results at Taylor-scale Reynolds number up to 240 show that the random-Taylor scenario ?a2???...
An asymptotic analysis is presented of the short-time behavior of second-order temporal velocity str...
The statistics describing variations of turbulent motions within the so called inertial range of len...
Taylor's hypothesis, or the frozen turbulence approximation, can be used to estimate also the specif...
The properties of acceleration fluctuations in isotropic turbulence are studied in direct numerical ...
G. I. Taylor (1) gave an important impetus to the statistical theory of turbulence by introducing th...
Lagrangian statistics of fluid-particle velocity and acceleration conditioned on fluctuations of dis...
International audienceThe alignment properties of different vector-valued flow quantities, including...
In this paper we study acceleration statistics from laboratory measurements and direct numerical sim...
Experimental investigations of turbulent velocity fields often invoke Taylor's hypothesis (also know...
Direct numerical simulations of turbulent channel flow at Re-tau = 205 and 932 have been carried out...
The scaling of acceleration statistics in turbulence is examined by combining data from the literatu...
International audienceThe acceleration statistics of sheared and rotating homogeneous turbulence are...
In this talk we focus on the velocity fluctuations in highly turbulent Taylor-Couette flow for the c...
Describes \u27current\u27 state of model developed by Taylor (1935), which is applicable to continuo...
42 pages, 13 figures, 8 tablesInternational audienceThe Lagrangian (LA) and Eulerian Acceleration (E...
An asymptotic analysis is presented of the short-time behavior of second-order temporal velocity str...
The statistics describing variations of turbulent motions within the so called inertial range of len...
Taylor's hypothesis, or the frozen turbulence approximation, can be used to estimate also the specif...
The properties of acceleration fluctuations in isotropic turbulence are studied in direct numerical ...
G. I. Taylor (1) gave an important impetus to the statistical theory of turbulence by introducing th...
Lagrangian statistics of fluid-particle velocity and acceleration conditioned on fluctuations of dis...
International audienceThe alignment properties of different vector-valued flow quantities, including...
In this paper we study acceleration statistics from laboratory measurements and direct numerical sim...
Experimental investigations of turbulent velocity fields often invoke Taylor's hypothesis (also know...
Direct numerical simulations of turbulent channel flow at Re-tau = 205 and 932 have been carried out...
The scaling of acceleration statistics in turbulence is examined by combining data from the literatu...
International audienceThe acceleration statistics of sheared and rotating homogeneous turbulence are...
In this talk we focus on the velocity fluctuations in highly turbulent Taylor-Couette flow for the c...
Describes \u27current\u27 state of model developed by Taylor (1935), which is applicable to continuo...
42 pages, 13 figures, 8 tablesInternational audienceThe Lagrangian (LA) and Eulerian Acceleration (E...
An asymptotic analysis is presented of the short-time behavior of second-order temporal velocity str...
The statistics describing variations of turbulent motions within the so called inertial range of len...
Taylor's hypothesis, or the frozen turbulence approximation, can be used to estimate also the specif...