Spectral evolution of weakly nonlinear random waves: kinetic description versus direct numerical simulations

Annenkov, Sergei; Shrira, Victor I.

doi:10.1017/jfm.2018.185

Cited by 31 publications

(46 citation statements)

References 47 publications

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“…4b). In this case it exhibits a rapid growth and subsequent slow decrease in agreement with numerous previous studies (e.g., [5,[9][10][11][12]), while short-crested waves are characterized by a smaller value of λ 4 which almost does not vary in time.…”

supporting

confidence: 91%

“…Meanwhile, it was shown in [11], that the relation derived in [7] does not hold in such transition wave regimes. Furthermore, in [12] the evolution of the wave kurtosis simulated by means of the primitive Euler equations, by the Zakharov equations and within the kinetic theory was shown to differ significantly. The remarkably better agreement was provided by the simulation of the primitive Euler equations.…”

mentioning

confidence: 99%

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Strongly coherent dynamics of stochastic waves causes abnormal sea states

Slunyaev¹

2020

Preprint

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The dynamic kurtosis (i.e., produced by the free wave component) is shown to contribute essentially to the abnormally large values of the surface displacement kurtosis, according to the direct numerical simulations of realistic sea waves. In this situation the free wave stochastic dynamics is strongly non-Gaussian, and the kinetic approach is inapplicable. Traces of coherent wave patterns are found in the Fourier transform of the directional irregular sea waves; they strongly violate the classic dispersion relation.

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supporting

confidence: 91%

mentioning

confidence: 99%

Strongly coherent dynamics of stochastic waves causes abnormal sea states

Slunyaev¹

2020

Preprint

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“…These very relations also arise in the expansion of the water wave problem in a small parameter (like the wave slope ka), where the dispersion relation is given by (8). In the limit of infinite depth (h → ∞) (8) reduces to ω(k) = g|k|, and (9) cannot be fulfilled nontrivially.…”

Section: Nonlinear Waves and Interactionmentioning

confidence: 99%

Nonlinear Wave Interaction in Coastal and Open Seas: Deterministic and Stochastic Theory

Stuhlmeier

Vrecica

Toledo

2019

Tutorials, Schools, and Workshops in the Mathematical Sciences

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We review the theory of wave interaction in finite and infinite depth. Both of these strands of water-wave research begin with the deterministic governing equations for water waves, from which simplified equations can be derived to model situations of interest, such as the mild slope and modified mild slope equations, the Zakharov equation, or the nonlinear Schrödinger equation. These deterministic equations yield accompanying stochastic equations for averaged quantities of the sea-state, like the spectrum or bispectrum. We discuss several of these in depth, touching on recent results about the stability of open ocean spectra to inhomogeneous disturbances, as well as new stochastic equations for the nearshore. * raphael.stuhlmeier@plymouth.ac.uk † teodorv@post.tau.ac.il ‡ toledo@tau.ac.il arXiv:1909.04348v1 [physics.flu-dyn]

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“…Whether or not equation 8 has resonant triads depends on the linear properties of the physical system. The resonance conditions play an important role in the stochastic theory [e.g., Zakharov et al, 1992, Nazarenko, 2011, Anenkov and Shrira, 2018].…”

Section: The Weak Turbulence Modelmentioning

confidence: 99%

“…The kinetic equation . With some standard simplifications [e.g., Zakharov et al, 1992, Zakharov, 1999, Anenkov and Shrira, 2018], the system 33-36 may be simplified further. Assuming that the spectrum varies with time much slower than the linear phase ( averaging the modulus squared eliminates the fast oscillatory time-dependence), equation 13b can be integrated approximately for to obtain If the initial bispectrum is zero ( ℱ k;12 (0) = 0) and factoring out of the integral the expression J k ;12 containing the spectra obtains where .…”

mentioning

confidence: 99%

Turbulence in the Hippocampus: An Ansatz for the Energy Cascade Hypothesis

Sheremet¹,

Qin²,

Kennedy³

et al. 2018

Preprint

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A. Mesoscopic neural activity may play an important role in the cross-scale integration of brain activity and in the emergence of cognitive behavior. Mesoscale activity in the cortex can be de ined as the organization of activity of large populations of neurons into collective actions, such as traveling waves in the hippocampus. A comprehensive description of collective activity is still lacking, in part because it cannot be built directly with methods and models developed for the microscale (individual neurons): the laws governing mesoscale dynamics are different from those governing a few neurons. To identify the characteristic features of mesoscopic dynamics, and to lay the foundations for a theoretical description of mesoscopic activity in the hippocampus, we conduct a comprehensive examination of observational data of hippocampal local ield potential (LFP) recordings. We use the strong correlation between rat running-speed and the LFP power to parameterize the energy input into the hippocampus, and show that both the power, and the nonlinearity of mesoscopic scales of collective action (e.g., theta and gamma rhythms) increase as with energy input. Our results point to a few fundamental characteristics: collective-action dynamics are stochastic (the precise state of a single neuron is irrelevant), weakly nonlinear, and weakly dissipative. These are the principles of the theory of weak turbulence. Therefore, we propose weak turbulence as an ansatz for the development of a theoretical description of mesoscopic activity. The perspective of weak turbulence provides simple and meaningful explanations for the major features observed in the evolution of LFP spectra and bispectra with energy input, such as spectral slopes and their evolution, the increased nonlinear coupling observed between theta and gamma, as well as speci ic phase lags associated with their interaction. The weak turbulence ansatz is consistent with the theory of self organized criticality, which provides a simple explanation for the existence of the powerlaw background spectrum, and could provide a unifying approach to modeling the dynamics of mesoscopic activity.

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Spectral evolution of weakly nonlinear random waves: kinetic description versus direct numerical simulations

Cited by 31 publications

References 47 publications

Strongly coherent dynamics of stochastic waves causes abnormal sea states

Strongly coherent dynamics of stochastic waves causes abnormal sea states

Nonlinear Wave Interaction in Coastal and Open Seas: Deterministic and Stochastic Theory

Turbulence in the Hippocampus: An Ansatz for the Energy Cascade Hypothesis

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