Volume 93, №5
ANALYTICAL AND NUMERICAL SOLUTION OF THE EQUATION FOR THE PROBABILITY DENSITY FUNCTION OF THE PARTICLE VELOCITY IN A TURBULENT FLOW
A study has been made of the random motion of inertial particles in a homogeneous isotropic turbulent gas fl ow. Fluctuations of the gas velocity along the particle path were modeled by the Gaussian random process with a fi nite time of degeneracy of the autocorrelation function. A closed equation has been obtained for the probability density function of the particle velocity, for which two methods of numerical solution have been proposed: using the fi nitedifference scheme and using one based on direct numerical modeling of an empirical probability density function. The empirical probability density function was obtained as a result of the averaging of random particle paths, which are a solution of a system of ordinary stochastic differential equations. The results of numerical calculation have been compared with the analytical solution describing the dynamics of the probability density function of the particle-velocity distribution.
Author: I. V. Derevich and A. K. Klochkov
Keywords: probability density function, stochastic ordinary differential equation, two-phase turbulence, difference scheme, autocorrelation function, Green′s function, direct numerical modeling
Page: 1043
I. V. Derevich and A. K. Klochkov.
ANALYTICAL AND NUMERICAL SOLUTION OF THE EQUATION FOR THE PROBABILITY DENSITY FUNCTION OF THE PARTICLE VELOCITY IN A TURBULENT FLOW //Journal of engineering physics and thermophysics.
. Volume 93, №5. P. 1043.
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