Wave kinetics of drift-wave turbulence and zonal flows beyond the ray approximation

Zhu, Hongxuan; Zhou, Yao; Ruiz, D. E.; Dodin, I. Y.

doi:10.1103/physreve.97.053210

Cited by 19 publications

(60 citation statements)

References 44 publications

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“…(Note that this estimate reinstates the dependence on q, which is absent in M.) Second, the RK criterion does not describe the ZF saturation but rather determines the threshold of the instability of the Kelvin-Helmholtz type that destroys the ZF. (It is also called the 'tertiary instability' by some authors [3,35,36,[55][56][57][58][59], and in our earlier studies we showed that this instability does not exist in the GO limit [35,36,55].) Since the RK threshold corresponds to u>u c,2 (section 3.2), and u u c c ,2 ,1  in the GO regime, we claim that ZFs saturate before the RK threshold is reached.…”

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confidence: 54%

“…Some progress in this area has been made by applying quasilinear (QL) models (section 2.4), such as the secondorder cumulant expansion theory (CE2) [9][10][11][12][13][14], or the stochastic structural stability theory [30][31][32]; however, those are not particularly intuitive. A more intuitive paradigm was proposed based on a simpler QL model known as the wave-kinetic equation (WKE) [6,7,[33][34][35][36][37][38][39]. The WKE treats DW turbulence as a collection of DW quanta ('driftons'), for which the ZF velocity serves as a collective field.…”

Section: Introductionmentioning

confidence: 99%

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Nonlinear saturation and oscillations of collisionless zonal flows

2019

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In homogeneous drift-wave turbulence, zonal flows (ZFs) can be generated via a modulational instability (MI) that either saturates monotonically or leads to oscillations of the ZF energy at the nonlinear stage. This dynamics is often attributed as the predator-prey oscillations induced by ZF collisional damping; however, similar dynamics is also observed in collisionless ZFs, in which case a different mechanism must be involved. Here, we propose a semi-analytic theory that explains the transition between the oscillations and saturation of collisionless ZFs within the quasilinear Hasegawa-Mima model. By analyzing phase-space trajectories of DW quanta (driftons) within the geometrical-optics (GO) approximation, we argue that the parameter that controls this transition is N∼γ MI /ω DW , where γ MI is the MI growth rate and ω DW is the linear DW frequency. We argue that at N=1, ZFs oscillate due to the presence of so-called passing drifton trajectories, and we derive an approximate formula for the ZF amplitude as a function of time in this regime. We also show that at N 1, the passing trajectories vanish and ZFs saturate monotonically, which can be attributed to phase mixing of higher-order sidebands. A modification of N that accounts for effects beyond the GO limit is also proposed. These analytic results are tested against both quasilinear and fully-nonlinear simulations. They also explain the earlier numerical results by Connaughton et al (2010 J. Fluid Mech. 654 207) and Gallagher et al (2012 Phys. Plasmas 19 122115) and offer a different perspective on what the control parameter actually is that determines the transition from the oscillations to saturation of collisionless ZFs.

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confidence: 54%

Section: Introductionmentioning

confidence: 99%

Nonlinear saturation and oscillations of collisionless zonal flows

2019

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“…Among statistical QL theories, the wave kinetic equation (WKE) is a popular model that captures the essential basic physics of DW turbulence, e.g. the formation of ZFs (Parker 2016;Ruiz et al 2016;Zhu et al 2018c;Parker 2018;Zhu et al 2018a,b;Diamond et al 2005;Smolyakov & Diamond 1999;Smolyakov et al 2000; † Email address for correspondence: deruiz@sandia.gov arXiv:1901.02518v1 [physics.plasm-ph] 8 Jan 2019…”

Section: Introductionmentioning

confidence: 99%

“…Singh et al 2014). The WKE has the intuitive form of the Liouville equation for the DW action density J in the ray phase space (Parker 2016;Ruiz et al 2016;Zhu et al 2018c;Parker 2018; Zhu et al 2018a,b):where Ω is the local DW frequency, Γ is a dissipation rate due to interactions with ZFs, and {·, ·} is the canonical Poisson bracket. (For the sake of clarity, terms related to external forcing and dissipation are omitted here.)…”

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confidence: 99%

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Wave kinetic equation for inhomogeneous drift-wave turbulence beyond the quasilinear approximation

2019

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The formation of zonal flows from inhomogeneous drift-wave (DW) turbulence is often described using statistical theories derived within the quasilinear approximation. However, this approximation neglects wave-wave collisions. Hence, some important effects such as the Batchelor-Kraichnan inverse-energy cascade are not captured within this approach. Here we derive a wave kinetic equation that includes a DW collision operator in the presence of zonal flows. Our derivation makes use of the Weyl calculus, the quasinormal statistical closure, and the geometrical-optics approximation. The obtained model conserves both the total enstrophy and energy of the system. The derived DW collision operator breaks down at the Rayleigh-Kuo threshold. This threshold is missed by homogeneous-turbulence theory but expected from a full-wave quasilinear analysis. In the future, this theory might help better understand the interactions between drift waves and zonal flows, including the validity domain of the quasilinear approximation that is commonly used in literature. Singh et al. 2014). The WKE has the intuitive form of the Liouville equation for the DW action density J in the ray phase space (Parker 2016;Ruiz et al. 2016;Zhu et al. 2018c;Parker 2018; Zhu et al. 2018a,b):where Ω is the local DW frequency, Γ is a dissipation rate due to interactions with ZFs, and {·, ·} is the canonical Poisson bracket. (For the sake of clarity, terms related to external forcing and dissipation are omitted here.) However, as with all QL models, Eq. (1.1) neglects nonlinear wave-wave scattering, and in consequence, is not able to capture the Batchelor-Kraichnan inverse-energy cascade (Srinivasan & Young 2012) or produce the Kolmogorov-Zakharov spectra for DWs (Connaughton et al. 2015). Hence, a question remains as to whether the existing WKE for inhomogeneous turbulence can be complemented with a wave-wave collision operator C[J, J]. The goal of this work is to calculate C[J, J] explicitly. Starting from the generalized Hasegawa-Mima equations (gHME) (Krommes & Kim 2000; Smolyakov & Diamond 1999), we derive a WKE with a DW collision operator C[J, J] for inhomogeneous DW turbulence. Our derivation is based on the Weyl calculus (Weyl 1931), which makes our approach similar to that in Ruiz et al. (2016) where the QL approximation was used. However, in contrast to Ruiz et al. (2016), we do not rely on the QL approximation here but instead account for DW collisions perturbatively using the quasinormal approximation. The main result of this work are Eqs. (4.12) and (4.22). In this final result, DWs are modeled in a similar manner as in Eq. (1.1). The difference is that Eq. (4.12) includes nonlinear DW scattering, which is described by a wave-wave collision operator C[J, J] that is bilinear in the DW wave-action density J. The resulting model conserves the two nonlinear invariants of the gHME, which are the total enstrophy and the total energy. The present formulation is fundamentally different from the previously reported homogeneous weak-wave-turbulence mode...

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Probability density of irradiance for electromagnetic waves propagating through turbulent magnetized plasma

Shishter

Young

Ali

2022

Int J Communication

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Summary Numerous physical mediums can be modelled as turbulent magnetized plasma, for example, the solar corona, and the ionosphere. Scintillation effects on the intensity of electromagnetic beam wave propagating through magnetized plasma necessitate the introduction of a statistical distribution valid over a large range of scintillation conditions, and incorporating the plasma physical properties. Under some simplifying assumptions, such a theoretical model can be derived based on the Rytov solution, the external magnetic field variation, and the space permeating plasma electron density variation. The resultant wave intensity distribution is compared with the Lognormal, Rician, and the Nakagami distributions for different scintillations conditions. The work presented in this paper is applicable to the analysis and design of optical wireless communication links through the ionosphere and deep space plasma.

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Wave kinetics of drift-wave turbulence and zonal flows beyond the ray approximation

Cited by 19 publications

References 44 publications

Nonlinear saturation and oscillations of collisionless zonal flows

Nonlinear saturation and oscillations of collisionless zonal flows

Wave kinetic equation for inhomogeneous drift-wave turbulence beyond the quasilinear approximation

Probability density of irradiance for electromagnetic waves propagating through turbulent magnetized plasma

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