Analysis of the Taylor dissipation surrogate in forced isotropic turbulence

Abstract

From the energy balance in wavenumber space expressed by the Lin equation, we derive a new form for the local Karman-Howarth equation for forced isotropic turbulence in real space. This equation is then cast into a dimensionless form, from which a combined analytical and numerical study leads us to deduce a new model for the scale-independent nondimensional dissipation rate , which takes the form = + CL/RL, where the asymptotic value can be evaluated from the third-order structure function. This is found to fit the numerical data with = 0.47 0.01 and CL= 18.5 1.3. By considering - on logarithmic scales, we show that RL-1 is indeed the correct Reynolds number behaviour. The model is compared to previous attempts in the literature, with encouraging agreement. The effects of the scale-dependence of the inertial and viscous terms due to finite forcing are then considered and shown to compensate one another, such that the model equation is applicable for systems subject to finite forcing. In addition, we also show that, contrary to the case of freely decaying turbulence, the characteristic decline in with increasing Reynolds number is due to the increase in the surrogate expression U3/L; the dissipation rate being maintained constant as a consequence of the fixed rate of forcing. A long-time non-turbulent stable state is found to exist for low Reynolds number numerical simulations which use negative damping as a means of energy injection.