Relation between the moments of longitudinal velocity derivatives and of dissipation in turbulence

Abstract

In homogeneous and isotropic turbulence, measurements of the longitudinal velocity derivative, ∂1 u1, make it possible to estimate a surrogate of the rate of energy dissipation per unit mass, ε: εs = 15 (∂1 u1)2 , where is the fluid viscosity, in the sense that the averages of ε and εs are equal. We show here that the nth moments of the fluctuations ε and εs, for n > 2, are not exactly proportional to each other, and that the expression for the moment εsn for n 3 involves in addition to a term proportional to εn , other contributions involving the invariant of the strain tensor, : tr( 3). The contribution of this term depends on the distribution of the dimensionless ratio R tr(3)/ tr(2)3/2. We find, however, that the relation obtained by assuming that R is uniformly distributed in the interval -1/6 R 1/6, which is obtained when the matrix has a Gaussian distribution, differs by no more than a few percents from the exact distribution.