2001
DOI: 10.1143/ptp.105.355
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Analysis of Fully Developed Turbulence by a Generalized Statistics

Abstract: In order to reveal the underlying statistics properly describing fully developed turbulence, the probability density function of the local dissipation is determined by taking the extreme of a generalized entropy (Tsallis entropy). With the density function, the scaling exponents ζ m of the velocity structure function are derived analytically. It is found that these scaling exponents are consistent with experimental data. The asymptotic expression of ζ m for m 1 has a log term.In a previous paper, 1) we showed … Show more

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Cited by 22 publications
(79 citation statements)
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“…We have already made clear in [20] that the present theory can also explain quite well the PDF's of longitudinal velocity fluctuations reported by Gotoh et al [21], and have revealed the superiority of our PDF to the one derived in [23] when the accuracy is raised up to the order of 10 −9 . Assured by the success of these rather preliminary tests, we will apply our theory for further precise analyses of the data obtained in [21] including the PDF's of transverse velocity fluctuations in addition to those of longitudinal fluctuations.…”
supporting
confidence: 83%
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“…We have already made clear in [20] that the present theory can also explain quite well the PDF's of longitudinal velocity fluctuations reported by Gotoh et al [21], and have revealed the superiority of our PDF to the one derived in [23] when the accuracy is raised up to the order of 10 −9 . Assured by the success of these rather preliminary tests, we will apply our theory for further precise analyses of the data obtained in [21] including the PDF's of transverse velocity fluctuations in addition to those of longitudinal fluctuations.…”
supporting
confidence: 83%
“…We will deal with the data at the Taylor microscale Reynolds number R λ = 381, since at this Reynolds number Gotoh et al observed the PDF with accuracy up to order of 10 −9 ∼ 10 −10 , in contrast with any previous experiments, real or numerical. We showed in [19] that our formulae can explain quite well the PDF's observed in the real experiment by Lewis and Swinney [22] for turbulent Couette-Taylor flow at R λ = 270 (Re = 5.4 × 10 5 ) produced in a concentric cylinder system in which, however, the PDF's were measured only with accuracy of order of 10 −5 . Note that the success of the present theory in the analysis of this turbulent Couette-Taylor flow may indicate the robustness of singularities associated with velocity gradient even for the case of no inertial range.…”
supporting
confidence: 68%
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