论文信息 - New results on the fractal and multifractal structure of the large Schmidt number passive scalars in fully turbulent flows

New results on the fractal and multifractal structure of the large Schmidt number passive scalars in fully turbulent flows

Abstract By measuring concentration fluctuations of a dye with very fine spatial and temporal resolution in typical unconfined turbulent water flows, we obtain the fractal dimension characteristic of the scalar interface in the range between Kolmogorov and Batchelor scales. We use one-dimensional intersection methods and invoke Taylor's hypothesis, but both of them are amply justified. We obtain a theoretical estimate for the fractal dimension by modifying our earlier arguments for finite (though large) Schmidt number effects. Finally, the multifractal characteristics of the scalar dissipation rate in the same scale range are also presented.

Katepalli R. Sreenivasan | K. Sreenivasan | R. R. Prasad | Rahul R. Prasad

[1] Benoit B. Mandelbrot,et al. Fractal Geometry of Nature , 1984 .

[2] G. Batchelor. Small-scale variation of convected quantities like temperature in turbulent fluid Part 1. General discussion and the case of small conductivity , 1959, Journal of Fluid Mechanics.

[3] Prasad,et al. Multifractal nature of the dissipation field of passive scalars in fully turbulent flows. , 1988, Physical review letters.

[4] Jensen,et al. Erratum: Fractal measures and their singularities: The characterization of strange sets , 1986, Physical review. A, General physics.

[5] H. G. E. Hentschel,et al. The infinite number of generalized dimensions of fractals and strange attractors , 1983 .

[6] K. Sreenivasan,et al. Scalar interfaces in digital images of turbulent flows , 1989 .

[7] C. Meneveau,et al. The fractal geometry of interfaces and the multifractal distribution of dissipation in fully turbulent flows , 1989 .

[8] Charles Meneveau,et al. The fractal facets of turbulence , 1986, Journal of Fluid Mechanics.