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Fractal dimension crossovers in turbulent passive scalar signals

arXiv:chao-dyn/9307008 · doi:10.1209/0295-5075/27/5/003

Abstract

The fractal dimension $δ_g^{(1)}$ of turbulent passive scalar signals is calculated from the fluid dynamical equation. $δ_g^{(1)}$ depends on the scale. For small Prandtl (or Schmidt) number $Pr<10^{-2}$ one gets two ranges, $δ_g^{(1)}=1$ for small scale r and $δ_g^{(1)}$=5/3 for large r, both as expected. But for large $Pr> 1$ one gets a third, intermediate range in which the signal is extremely wrinkled and has $δ_g^{(1)}=2$. In that range the passive scalar structure function $D_θ(r)$ has a plateau. We calculate the $Pr$-dependence of the crossovers. Comparison with a numerical reduced wave vector set calculation gives good agreement with our predictions.

7 pages, Revtex, 3 figures (postscript file on request)