Effects of forcing in three dimensional turbulent flows
Abstract
We present the results of a numerical investigation of three-dimensional homogeneous and isotropic turbulence, stirred by a random forcing with a power law spectrum, Ef(k) k3-y. Numerical simulations are performed at different resolutions up to 5123. We show that at varying the spectrum slope y, small-scale turbulent fluctuations change from a forcing independent to a forcing dominated statistics. We argue that the critical value separating the two behaviours, in three dimensions, is yc=4. When the statistics is forcing dominated, for y<yc, we find dimensional scaling, i.e. intermittency is vanishingly small. On the other hand, for y>yc, we find the same anomalous scaling measured in flows forced only at large scales. We connect these results with the issue of universality in turbulent flows.
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