Circulation in High Reynolds Number Isotropic Turbulence is a Bifractal

Iyer, Kartik P.; Sreenivasan, Katepalli R.; Yeung, P. K.

doi:10.1103/physrevx.9.041006

Cited by 56 publications

(98 citation statements)

References 39 publications

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“…This analysis reveals that chromosome contact maps are bifractal, i.e. multifractal objects characterized by two distinct fractal dimensions, a behavior previously reported in studies of surface roughness 21 , distribution of matter in the universe 22 and turbulence 23 .…”

supporting

confidence: 63%

Bifractal nature of chromosome contact maps

Pigolotti

Jensen²,

Zhan

et al. 2019

Preprint

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Modern biological techniques such as Hi-C permit to measure probabilities that different chromosomal regions are close in space. These probabilities can be visualised as matrices called contact maps. Contact maps are characterized by self-similar blocks along the diagonal, corresponding to a hierarchy of tightly packed chromosomal domains. Statistical properties of these maps, and thus of chromosomal interactions, are usually summarized by the scaling of the contact probability as a function of the genomic distance. This approach is fraught with limitations, since such scaling is usually rather noisy. Here, we introduce a multifractal analysis of chromosomal contact maps. Our analysis reveals that Hi-C maps are bifractal, i.e. they are complex geometrical objects characterized by two distinct fractal dimensions. To rationalize this observation, we introduce a model that describes chromosomes

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supporting

confidence: 63%

Bifractal nature of chromosome contact maps

Pigolotti

Jensen²,

Zhan

et al. 2019

Preprint

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“…This value is above the value of Re obtained in the largest DNS for isotropic turbulence to date, that reaches a value of Re ≈ 2 × 10 5 in runs with short averaging times (Iyer et al 2019). This Re value is substantially lower than in Clark et al (2021b), due to the higher temporal resolution requirements of the E W (k, t) equation as Re is increased.…”

Section: Resultsmentioning

confidence: 58%

“…For the case of d = 3 and 4, this allows us to explore the parameter space in far greater detail than is possible for current DNS. For d > 4, DNS is not achievable in practice, a lattice box of 16 384 3 collocation points, which is the largest one achieved by DNS to date (Iyer, Sreenivasan & Yeung 2019) is approximately equivalent in computational power to having a box with a size of 338 5 points, which will not allow for the required scale separation for an inertial range to exist. Running DNS simulations at high Re values come with massive computational expense, and the resolution required increases as Re 3d/4 .…”

Section: Chaos and Predictability In Turbulencementioning

confidence: 99%

Critical transition to a non-chaotic regime in isotropic turbulence

Clark

Armua

et al. 2021

J. Fluid Mech.

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We study the properties of homogeneous and isotropic turbulence in higher spatial dimensions through the lens of chaos and predictability using numerical simulations. We employ both direct numerical simulations and numerical calculations of the eddy damped quasi-normal Markovian closure approximation. Our closure results show a remarkable transition to a non-chaotic regime above the critical dimension, $d_c$ , which is found to be approximately 5.88. We relate these results to the properties of the energy cascade as a function of spatial dimension in the context of the idea of a critical dimension for turbulence where Kolmogorov's 1941 theory becomes exact.

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“…Uma expressiva mudança de cenário ocorreu a partir do ano de 2019, com o advento de simulações numéricas de alta performance [219]. Densidades de probabilidade de circulação e momentos estatísticos de ordens altas foram determinados com precisão.…”

Section: Estatística Da Circulaçãounclassified

A física estatística da turbulência

Moriconi

Pereira

2021

Rev. Bras. Ensino Fís.

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Realizamos um sobrevoo abrangente sobre a teoria estatística da turbulência, com a preocupação de embasá-la em noções importantes e consolidadas da dinâmica de fluidos, antes de nos aprofundarmos em discussões de modelos mais específicos, sujeitos a debates contemporâneos. A complexidade da turbulência traduz-se, na chamada abordagem estrutural, como o desafio de compreender, a partir da dinâmica de tubos de vorticidade, o transporte de energia das grandes para as pequenas escalas do escoamento, no limite singular de viscosidade nula. Propriedades estatísticas da cascata de energia, como o fenômeno da intermitência, são modeladas por meio de narrativas aparentemente diversas, associadas a processos estocásticos multiplicativos e, alternativamente, à formulação multifractal do espectro de singularidades do campo de velocidade turbulento. A síntese, fundamentação de primeiros princípios e integração dessas duas visões de modelagem à abordagem estrutural forma o corpo essencial das dificuldades teóricas atuais da turbulência.

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Circulation in High Reynolds Number Isotropic Turbulence is a Bifractal

Cited by 56 publications

References 39 publications

Bifractal nature of chromosome contact maps

Bifractal nature of chromosome contact maps

Critical transition to a non-chaotic regime in isotropic turbulence

A física estatística da turbulência

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