Hostname: page-component-cd9895bd7-dzt6s Total loading time: 0 Render date: 2024-12-26T03:28:34.225Z Has data issue: false hasContentIssue false

Nonlinear electromagnetic interplay between fast ions and ion-temperature-gradient plasma turbulence

Published online by Cambridge University Press:  03 May 2021

A. Di Siena*
Affiliation:
The University of Texas at Austin, 201 E 24th St, 78712Austin, TX, USA
T. Görler
Affiliation:
Max Planck Institute for Plasma Physics, Boltzmannstr 2, 85748Garching, Germany
E. Poli
Affiliation:
Max Planck Institute for Plasma Physics, Boltzmannstr 2, 85748Garching, Germany
A. Bañón Navarro
Affiliation:
Max Planck Institute for Plasma Physics, Boltzmannstr 2, 85748Garching, Germany
A. Biancalani
Affiliation:
Max Planck Institute for Plasma Physics, Boltzmannstr 2, 85748Garching, Germany
R. Bilato
Affiliation:
Max Planck Institute for Plasma Physics, Boltzmannstr 2, 85748Garching, Germany
N. Bonanomi
Affiliation:
Max Planck Institute for Plasma Physics, Boltzmannstr 2, 85748Garching, Germany
I. Novikau
Affiliation:
Max Planck Institute for Plasma Physics, Boltzmannstr 2, 85748Garching, Germany
F. Vannini
Affiliation:
Max Planck Institute for Plasma Physics, Boltzmannstr 2, 85748Garching, Germany
F. Jenko
Affiliation:
Max Planck Institute for Plasma Physics, Boltzmannstr 2, 85748Garching, Germany
*
Email address for correspondence: alessandro.disiena@austin.utexas.edu
Rights & Permissions [Opens in a new window]

Abstract

In strong electromagnetic regimes, gyrokinetic simulations have linked a substantial ion-scale turbulence stabilization to the presence of supra-thermal particles, capturing qualitatively well the experimental observations in different devices worldwide. An explanation for the underlying physical mechanism responsible for the fast-ion-induced turbulent transport reduction observed in the numerical simulations has been proposed only recently by Di Siena et al. (Nucl. Fusion, vol. 59, 2019, p. 124001; Nucl. Fusion, vol. 60, 2020, p. 089501). It involves a nonlinear cross-scale coupling (nonlinear interaction involving different modes at different wavenumbers) between ion-temperature-gradient and marginally stable Alfvén eigenmodes, which in turn increases zonal flow activity. In view of an optimization of this turbulence-stabilizing effect, the key parameters controlling the nonlinear cross-scale coupling are here identified. At the same time, these findings provide useful insights for reduced-turbulence models and integrative approaches, which might be trained on the results presented in this paper to grasp the underlying physics and the parameter scaling of the beneficial effects of fast particles on plasma turbulence.

Type
Research Article
Creative Commons
Creative Common License - CCCreative Common License - BY
This is an Open Access article, distributed under the terms of the Creative Commons Attribution licence (http://creativecommons.org/licenses/by/4.0/), which permits unrestricted re-use, distribution, and reproduction in any medium, provided the original work is properly cited.
Copyright
Copyright © The Author(s), 2021. Published by Cambridge University Press

1. Introduction

A long-standing challenge in magnetic fusion research is the identification of mechanisms able to suppress turbulent transport – the drive in free energy is provided by steep gradients – with the ultimate goal of improving reactor performances. An important breakthrough along these lines is given by local gyrokinetic simulations showing a beneficial impact of supra-thermal particles – generated through auxiliary heating schemes – on ion-temperature-gradient (ITG) turbulence transport (Romanelli, Zocco & Crisanti Reference Romanelli, Zocco and Crisanti2010; Citrin et al. Reference Citrin, Jenko, Mantica, Told, Bourdelle, Garcia, Haverkort, Hogeweij, Johnson and Pueschel2013; Garcia et al. Reference Garcia, Challis, Citrin, Doerk, Giruzzi, Görler, Jenko and Maget2015; Doerk et al. Reference Doerk, Bock, Di Siena, Fable, Görler, Jenko and Stober2017; Di Siena et al. Reference Di Siena, Görler, Doerk, Poli and Bilato2018, Reference Di Siena, Görler, Poli, Bañón Navarro, Biancalani and Jenko2019a). Signatures of this turbulence regulation via fast particles – generated via auxiliary heating systems – have also been observed in experiments at AUG (see e.g. Tardini et al. (Reference Tardini, Hobirk, Igochine, Maggi, Martin, McCune, Peeters, Sips, Stäbler and Stober2007), Bock et al. (Reference Bock, Fable, Fischer, Reich, Rittich, Stober, Bernert, Burckhart, Doerk and Dunne2017), Di Siena et al. (Reference Di Siena, Bilato, Görler, Bañón Navarro, Poli, Bobkov, Jarema, Fable, Angioni and Kazakov2020)), JET (see e.g. Mantica et al. (Reference Mantica, Strintzi, Tala, Giroud, Johnson, Leggate, Lerche, Loarer, Peeters and Salmi2009, Reference Mantica, Angioni, Challis, Colyer, Frassinetti, Hawkes, Johnson, Tsalas, de Vries and Weiland2011), Citrin et al. (Reference Citrin, Jenko, Mantica, Told, Bourdelle, Garcia, Haverkort, Hogeweij, Johnson and Pueschel2013), Garcia et al. (Reference Garcia, Challis, Citrin, Doerk, Giruzzi, Görler, Jenko and Maget2015), Bonanomi et al. (Reference Bonanomi, Mantica, Citrin, Görler and Teaca2018)) and DIII-D (see e.g. Holland et al. (Reference Holland, Petty, Schmitz, Burrell, McKee, Rhodes and Candy2012)) in different plasma conditions. A coherent physical picture able to explain the main mechanisms responsible for the interaction between energetic particles and plasma micro-turbulence observed in flux-tube simulations has been proposed only recently (Di Siena et al. Reference Di Siena, Görler, Doerk, Poli and Bilato2018, Reference Di Siena, Görler, Poli, Bañón Navarro, Biancalani and Jenko2019a,Reference Di Siena, Görler, Poli, Bilato, Doerk and Zoccob). As it turns out, this interplay involves two distinct effects, namely a wave–particle and a wave–wave interaction.

The former is an electrostatic resonance mechanism acting between supra-thermal particles and bulk ITG micro-turbulence. It becomes increasingly effective when the energetic-particle diamagnetic drift frequencies get close to the linear ITG frequencies, and the fast-ion temperature gradient exceeds the density one. The relevance of this effect on ion-scale turbulent transport has been demonstrated in both numerical simulations (Di Siena et al. Reference Di Siena, Görler, Doerk, Poli and Bilato2018, Reference Di Siena, Görler, Poli, Bilato, Doerk and Zocco2019b; Di Siena, Bañón Navarro & Jenko Reference Di Siena, Bañón Navarro and Jenko2020b) and experiments (Bonanomi et al. Reference Bonanomi, Mantica, Citrin, Görler and Teaca2018; Di Siena et al. Reference Di Siena, Bilato, Görler, Bañón Navarro, Poli, Jarema, Fable, Angioni, Bobkov and Ochoukov2020a). However, it can only partially explain the numerical results (Citrin et al. Reference Citrin, Jenko, Mantica, Told, Bourdelle, Garcia, Haverkort, Hogeweij, Johnson and Pueschel2013, Reference Citrin, Garcia, Görler, Jenko, Mantica, Told, Bourdelle, Hatch, Hogeweij and Johnson2015; Doerk et al. Reference Doerk, Bock, Di Siena, Fable, Görler, Jenko and Stober2018; Bonanomi et al. Reference Bonanomi, Mantica, Citrin, Görler and Teaca2018) in strong electromagnetic regimes. More precisely, in these cases the previously mentioned wave–wave interaction (Di Siena et al. Reference Di Siena, Görler, Poli, Bañón Navarro, Biancalani and Jenko2019a) becomes the dominant turbulence-stabilizing effect. As revealed by Di Siena et al. (Reference Di Siena, Görler, Poli, Bañón Navarro, Biancalani and Jenko2019a), supra-thermal ions drive linearly stable Alfvén eigenmodes (AEs), to which the bulk ITG turbulence can couple nonlinearly. This cross-scale interaction leads to a free energy redistribution from ion-scale turbulence to linearly stable fast-ion modes and, hence, to partial dissipation. When this nonlinear interaction is sufficiently large, the AEs will start to interact with the zonal flows, which increase in amplitude, further decreasing the transport levels. An interaction between AEs and zonal structures in the presence of turbulence has also been observed in different scenarios (see e.g. Biancalani et al. (Reference Biancalani, Bottino, Di Siena, Görler, Novikau, Gürcan, Morel, Jenko, Lanti and Ohana2018, Reference Biancalani, Bottino, Di Siena, Gürcan, Hayward-Schneider, Jenko, Lauber, Mishchenko, Morel and Novikau2020)), and possible mechanisms have been discussed in Zonca et al. (Reference Zonca, Chen, Briguglio, Fogaccia, Milovanov, Qiu, Vlad and Wang2015). Although AEs are also known to saturate because of the energetic-particle density flattening, the saturation level of AEs is considered here as dominated by wave–wave interaction, consistently with the forced-driven excitation of zonal flows (Chen & Zonca Reference Chen and Zonca2012; Qiu, Chen & Zonca Reference Qiu, Chen and Zonca2016). It is worth mentioning that modifications of the energetic-particle profiles in the phase space are not allowed by the numerical set-up employed throughout this manuscript. These effects will be retained in future radially-global analyses.

The positive impact of this wave–wave energetic-particle mechanism on ITG turbulence is limited by large-scale instabilities, destabilized if the total plasma pressure and its radial gradient exceed a critical value. These modes strongly increase particle/heat fluxes (see e.g. Pueschel, Kammerer & Jenko (Reference Pueschel, Kammerer and Jenko2008), Romanelli et al. (Reference Romanelli, Zocco and Crisanti2010), Pueschel & Jenko (Reference Pueschel and Jenko2010), Biancalani et al. (Reference Biancalani, Bottino, Di Siena, Gürcan, Hayward-Schneider, Jenko, Lauber, Mishchenko, Morel and Novikau2020), and references therein), thus causing degradation of the overall plasma confinement. Therefore, an essential task is to identify (i) the main parameter dependencies affecting this nonlinear threshold, to keep electromagnetic instabilities driven by supra-thermal particles sub-marginal, and (ii) the parameters leading to the most effective enhancement of the fast-particle turbulence suppression. For this reason, in this paper, we extend upon the previously published results of Di Siena et al. (Reference Di Siena, Görler, Poli, Bañón Navarro, Biancalani and Jenko2019a) (summarized above) and show new evidence for the nonlinear wave–wave interplay between fast-ion-driven modes and ITG turbulence. In addition, we present scans over several plasma parameters, thus providing guidelines on how to best exploit such nonlinear electromagnetic fast-ion turbulence stabilization. These findings, besides providing meaningful insights on the scaling of this fast-particle effect, might be used to improve the level of realism of reduced models (e.g. the trapped gyro-Landau fluid (TGLF) model of Staebler, Kinsey & Waltz (Reference Staebler, Kinsey and Waltz2005, Reference Staebler, Kinsey and Waltz2007) and Staebler et al. (Reference Staebler, Howard, Candy and Holland2017)) by incorporating these fast-particle effects and scaling.

It is worth mentioning that the range of supra-thermal particle parameters employed throughout this paper reflects the one typically achieved in present-day experiments with auxiliary heating systems (e.g., neutral-beam injection and ion cyclotron resonance heating). For such cases, the energetic-particle temperature is sub-critical (with energy lower than the critical energy, where the slowing-down rate on electrons is equal to the scattering rate on thermal ions). This is an important remark to be made, since the ion-scale turbulence regulation observed with such fast-ion parameters might not extrapolate to fusion-born alpha particles. To describe alpha particles correctly, radially global simulations might be required and the underlying interaction between them and ITG turbulence might change. However, sub-critical energetic-particle scenarios remain of high importance for ITER and DEMO ramp-up/-down scenarios.

This paper is organized as follows. In § 2, we describe the plasma parameters and numerical set-up employed for the gyrokinetic simulations. In § 3 we compare the impact of nonlinear electromagnetic effects in simulations with and without energetic particles, providing additional insights into the destabilization of high-frequency modes due to wave–wave nonlinear coupling. The nature of these modes is further investigated in § 4 with linear gyrokinetic simulations, while in § 5 the range of validity of the flux-tube approximation to study them is discussed. In § 6 the main dependencies of the nonlinear energetic-particle stabilizing effects on ITG turbulence are presented. Conclusions are drawn in § 7.

2. Numerical simulation set-up

The impact of energetic particles on turbulent transport is investigated via gyrokinetic simulations performed with the turbulence code GENE (Jenko et al. Reference Jenko, Dorland, Kotschenreuther and Rogers2000). To reduce the otherwise prohibitive computational cost of these analyses the flux-tube approach is applied. It assumes periodic boundary conditions over the radial and bi-normal directions, thus enabling a Fourier decomposition of the perturbed quantities (Dannert & Jenko Reference Dannert and Jenko2005). The range of validity of the flux-tube approximation in capturing the energetic-particle dynamics is substantiated in § 5. The numerical simulations are performed with a radial box size of $175 \rho _s$ and with a minimum $k_y \rho _s$ of 0.05. Here, $\rho _s = c_s / \varOmega _i$, where $c_s = (T_e/m_i)^{1/2}$ represents the sound speed, $\varOmega _i$ the ion gyro-frequency. The grid resolution employed in the radial $(x)$, bi-normal $(y)$ and field-aligned $(z)$ directions respectively is $192\times 48 \times 32$, while $32$ grid points are used in the velocity parallel to the background magnetic field and $24$ for the magnetic moment. Furthermore, for simplicity and in order to keep the computational expenses at a reasonable level, the fast particle species have been modelled with an equivalent Maxwellian distribution function. Future studies will take advantage of the non-Maxwellian GENE extensions discussed in detail in Di Siena et al. (Reference Di Siena, Görler, Doerk, Citrin, Johnson, Schneider and Poli2016, Reference Di Siena, Biancalani, Görler, Doerk, Novikau, Lauber, Bottino and Poli2018a,Reference Di Siena, Görler, Doerk, Bilato, Citrin, Johnson, Schneider and Polib). However, the impact of the velocity space asymmetries and anisotropies in the background distributions is not expected to play a significant role in the range of parameters employed throughout this paper (Di Siena et al. Reference Di Siena, Görler, Doerk, Bilato, Citrin, Johnson, Schneider and Poli2018b; Di Siena Reference Di Siena2019).

The reference plasma parameters are the same as those previously employed in Di Siena et al. (Reference Di Siena, Görler, Poli, Bañón Navarro, Biancalani and Jenko2019a) and are in the experimental range of the L-mode JET discharge studied in Citrin et al. (Reference Citrin, Jenko, Mantica, Told, Bourdelle, Garcia, Haverkort, Hogeweij, Johnson and Pueschel2013) and in Bravenec et al. (Reference Bravenec, Citrin, Candy, Mantica and Görler2016) at the radial position $\rho _\textrm {tor} = 0.33$. Thermal deuterium, electrons and supra-thermal deuterium, with typical values of externally injected neutral beam fast ions, are considered. Collisions are retained in the simulations and modelled by a linearized Landau–Boltzmann collision operator (Florian Reference Florian2008). The toroidal rotation is neglected in this paper, in order to isolate the impact of the energetic particles on ITG turbulence due only to the wave–wave nonlinear cross-scale interaction. For the same reason, the magnetic geometry, described by an analytical Miller equilibrium (Miller et al. Reference Miller, Chu, Greene, Lin-Liu and Waltz1998), has been kept fixed to the nominal one regardless of the change in the plasma parameters.

The reference values are summarized in table 1. We note that for the specific energetic-particle parameters selected – describing fast ions from neutral-beam injection heating – the wave–particle resonance interaction of Di Siena et al. (Reference Di Siena, Görler, Doerk, Poli and Bilato2018, Reference Di Siena, Görler, Poli, Bilato, Doerk and Zocco2019b) is here expected to be negligible. The condition requiring a larger energetic-particle temperature gradient compared to the density one is not satisfied.

Table 1. Plasma parameters. Here, $T$ denotes the temperature normalized to the electron one, $\omega _{T,n} = a/L_{T,n}$ the normalized logarithmic temperature and density gradients, $R_0$ the major radius, $a$ the minor radius, ${s} = (\rho _\textrm {tor}/q)(\textrm {d} q/ \textrm {d}\rho _\textrm {tor})$ the magnetic shear, $\rho ^*_i = \rho _s / a$ and $\beta _e = 8 {\rm \pi}n_e T_e / B_0^2$ the ratio between the thermal electron and magnetic pressure.

3. Electromagnetic fast-ion turbulence suppression

Let us start by considering in figure 1 the effect that finite electromagnetic fluctuations have – for this particular set-up – on turbulent transport in the absence of energetic particles. The plasma parameters are the same as those in table 1, except for the ion density and its gradient, here set equal to the electron ones to fulfil quasi-neutrality. The nonlinear heat fluxes of each species – in gyro-Bohm units $Q_{gB} = T_i^{2.5}n_i m_i^{0.5}/e^2 B_0^2 R_0^2$, with $e$ the effective ion charge – are illustrated in figure 1 for $\beta _e = 0$ (electrostatic) and $\beta _e = 0.012$. They are obtained as the sum of the electrostatic and (when present) the electromagnetic (flutter) flux contributions. Interestingly, while only a mild impact of finite $\beta _e$-effects is observed in figure 1(a) on the ion heat flux (reduced by $30\,\%$), we note a destabilization of the electron heat flux (by roughly $60\,\%$), which leads to overall larger turbulence levels (figure 1b). This increase is driven by the electromagnetic electron flux contribution, with its electrostatic counterpart only slightly affected by the presence of finite $\beta _e$. These findings are consistent with the theoretical analyses reported in Kim, Horton & Dong (Reference Kim, Horton and Dong1993), Zonca, Chen & Santoro (Reference Zonca, Chen and Santoro1996) and Zonca et al. (Reference Zonca, Chen, Santoro and Dong1998, Reference Zonca, Chen, Dong and Santoro1999), where the stabilization of ITG micro-instabilities has been linked to an electromagnetic coupling between ITGs and Alfvénic ITGs/kinetic ballooning modes. Recent numerical studies have investigated this topic further, revealing an interesting interaction between stable and unstable modes and zonal flows that increases the triplet correlation time and enhances ITG transport reduction (Whelan, Pueschel & Terry Reference Whelan, Pueschel and Terry2018).

Figure 1. Time-averaged nonlinear (a) main-ion and (b) electron heat fluxes in gyro-Bohm units ($Q_{gB} = T_i^{2.5}n_i m_i^{0.5}/e^2 B_0^2 R_0^2$) for $\beta _e = 0$ (blue line) and $\beta _e = 0.012$ (red line) in simulations without energetic particles.

When supra-thermal particles (modelled with the parameters of table 1) are added to the nonlinear simulations, figure 2 reveals small deviations from the previous results (without energetic particles) only for the case $\beta _e = 0$. A substantial reduction (up to $95\,\%$) of the heat fluxes in each turbulent channel is instead observed when electromagnetic effects are included. In these simulations, similarly as discussed in Di Siena et al. (Reference Di Siena, Görler, Poli, Bañón Navarro, Biancalani and Jenko2019a), two distinct nonlinear phases are identified, marked by the vertical black line in figure 2. During the so-called phase I, a high-frequency modulation of the heat fluxes and slowly decaying transport levels are observed, which decrease until phase II, where they enter a stationary state at reduced levels. This transition between these two separate nonlinear phases is systematically observed in all the turbulence simulations characterized by strong nonlinear and electromagnetic energetic-particle effects (but see also the discussion in § 6.1). The behaviour of the gyrokinetic simulations at low flux levels and/or close to marginality presented in this paper is discussed in the Appendix.

Figure 2. Nonlinear (a) main-ion, (b) electron and (c) fast-ion heat fluxes in gyro-Bohm units ($Q_{gB} = T_i^{2.5}n_i m_i^{0.5}/e^2 B_0^2 R_0^2$) for $\beta _e = 0$ (blue line) and $\beta _e = 0.012$ (red line) at $T_f / T_e = 9.8$.

The nature of the high-frequency oscillations in the turbulent transport has been already partially investigated in Di Siena et al. (Reference Di Siena, Görler, Poli, Bañón Navarro, Biancalani and Jenko2019a) and Di Siena (Reference Di Siena2019), which reveal a progressive destabilization of linearly-stable energetic-particle-driven modes with $\beta _e$. In the following we extend upon the previous analyses by studying in figure 3 the frequency spectra of the electrostatic potential for each bi-normal mode number $k_y \rho _s$. The numerical diagnostic employed to extract the frequency applies the so-called windowed Fourier transform of the time trace (interpolated to equidistant time steps) of the electrostatic potential $\phi _1$ in the time domain of the nonlinear simulations, which goes from 50 to 350 (phase I) in units of $c_s / a$. The windowed Fourier transform enables the study of non-periodic time signals by applying smoothing functions (in this case Hanning apodization functions) and removing spurious high-frequency components.

Figure 3. Fourier spectra of $\phi _1(\omega ,k_y\rho _s)$ at $\beta _e = 0$ (a,b) and $\beta _e = 0.012$ (c,d), retaining (a,c) or neglecting (b,d) the energetic particle species. The electrostatic potential has been averaged over the radial mode number $k_x \rho _s$, field-aligned coordinate $z$ and in the time domain $t [c_s/a] = [50\text {--}350]$. The amplitude of the signal is plotted on a logarithmic scale.

The $(k_y \rho _s, \omega )$ structure of the perturbed electrostatic potential is shown in figure 3 after an average over the radial wavevectors and along the field-aligned coordinate $z$. The ratio between the electron and magnetic pressure is fixed at $\beta _e = 0$ (electrostatic) and $\beta _e = 0.012$. In all the plots of figure 3, a similar pattern of frequencies, increasing nearly linearly with $k_y$, can be observed. This corresponds to the dispersion of the ITG mode. Only for finite $\beta _e$ and in the presence of fast ions (panel (c)), a second branch at higher frequency – with amplitude comparable to the ITG one – can be identified. This secondary peak is found at $\omega \sim 2 c_s / a$. It is localized in a narrow region in $k_y \rho _s$, which goes from $0.075<k_y \rho _s < 0.15$. In the case where energetic particles are neglected, its amplitude is strongly reduced by several orders of magnitude (note the logarithmic scale). It is important to mention that as the secondary peak arises the low-frequency ITG branch is weakened, supporting the interpretation of a nonlinear cross-scale coupling between low- and high- frequency modes.

A critical requirement to observe a turbulence reduction via electromagnetic fast-particle effects in flux-tube simulations is that the high-frequency mode be linearly stable. If this condition is not fulfilled and the mode is linearly unstable, an overall increase in turbulent transport is typically observed. This is illustrated in figure 4, where the ion, electron and fast ion heat fluxes are shown in gyro-Bohm units for $\beta _e = 0.013$, i.e. when the high-frequency mode is linearly unstable (the linear threshold is found at $\beta _e \gtrsim 0.012$). A striking observation is that the electrostatic thermal (ion and electron) turbulent channels start oscillating at large amplitude around an average value close to the typical range of heat conductivities measured in present-day experiments, i.e. $\chi _i\ [\textrm {m}^2\ \textrm {s}^{-1}] = 3.2 \pm 5.1$ and $\chi _e\ [\textrm {m}^2\ \textrm {s}^{-1}] = 9.2 \pm 7.5$. The electromagnetic (flutter) counterpart, on the other hand, strongly increases for the electrons, while remaining at moderate values for the thermal ions. The large oscillations in the electrostatic fluxes lead to substantial uncertainties (large error bars), making any physical interpretation of these numerical simulations particularly questionable. Moreover, the energetic-particle fluxes are significantly enhanced, leading to an overall turbulence destabilization of several orders of magnitude. If the electron plasma beta is increased further, the time-averaged value of the electrostatic and electromagnetic thermal fluxes is strongly increased. These (flux-tube) findings are consistent with the results of Citrin et al. (Reference Citrin, Garcia, Görler, Jenko, Mantica, Told, Bourdelle, Hatch, Hogeweij and Johnson2015) and recent radially global analyses (Biancalani et al. Reference Biancalani, Bottino, Di Siena, Gürcan, Hayward-Schneider, Jenko, Lauber, Mishchenko, Morel and Novikau2020).

Figure 4. Nonlinear electrostatic (blue) and electromagnetic (red) component of the (a) main-ion, (b) electron and (c) fast-ion heat fluxes in gyro-Bohm units ($Q_{gB} = T_i^{2.5}n_i m_i^{0.5}/e^2 B_0^2 R_0^2$) for $\beta _e = 0.013$ (linearly unstable high-frequency mode).

4. Linear stability analyses

The high-frequency mode responsible for the modulation of the turbulent fluxes observed during the nonlinear phase I is identified – for the specific range of parameters employed throughout this paper – as a toroidal Alfvén eigenmode (TAE) (Chen & Zonca Reference Chen and Zonca2012; Zonca & Chen Reference Zonca and Chen2014). Here, we provide additional evidence supporting this interpretation and demonstrate that such TAEs are linearly stable for the case under consideration. This is achieved by performing linear flux-tube GENE simulations for the bi-normal wavevector $k_y \rho _s = 0.1$ (corresponding to a toroidal mode number of 17), which lies at the centre of the high-frequency mode observed in figure 5.

Figure 5. Linear growth rates (a) and frequencies (b) of the dominant and subdominant modes for different $\beta _e$ at $k_y \rho _s = 0.1$ and $T_f/T_e = 9.8$. The vertical black line in panel (a) denotes the $\beta _e$ value marking the transition from ITG to the TAE.

Given the electromagnetic nature of TAEs we perform a scan over $\beta _e$ retaining the energetic particle species. The results are illustrated in figure 5, where the growth rates and frequencies of the dominant and subdominant (for $\beta _e < 0.013$) modes are shown. The latter have been extracted by applying a low-frequency filter to the perturbed electrostatic potential, thus removing the slowly-varying ITG component, and measured by means of linear regression of the filtered (high-frequency) logarithmic time trace. Figure 5(a) reveals that the TAE is linearly stable for $\beta _e < 0.013$, where the ITG mode represents the dominant micro-instability. However, the linear TAE damping decreases with $\beta _e$ until its drive term overcomes the damping and the TAE becomes the most unstable instability. This appears evident in figure 5(b) at $\beta _e \approx 0.013$, where a discontinuity in the linear frequency $\omega / [c_s / a]$ is observed, indicating a mode transition.

Interestingly, the linearly stable TAE mode at $\beta _e = 0.012$ has the same frequency as the high-frequency components observed in the turbulent spectra of the electrostatic potential in figure 3, thus enforcing the physical interpretation of Di Siena et al. (Reference Di Siena, Görler, Poli, Bañón Navarro, Biancalani and Jenko2019a) of marginally stable TAEs destabilized via nonlinear mode-to-mode coupling.

Given the key role played by the supra-thermal particles in the linear dynamics of TAEs, we extend the previous analyses by performing scans over $\beta _e$ for different values of the fast-particle temperature, going from $T_f / T_e = 1$ (thermal species) up to $T_f / T_e = 13$. The results are summarized in figure 6, where the linear growth rates and frequencies are shown for the range of $\beta _e$ where the TAEs are linearly stable. Figure 6(b) reveals that the frequency of the TAE depends not on the energetic-particle temperature but instead on the value of $\beta _e$ (or equivalently $\beta _i = \beta _e n_i T_i /(n_e T_e)$). Moreover, we observe very good agreement between the numerical results and the predicted values for the TAE frequency, which – in GENE normalized units – reads

(4.1)\begin{equation} \omega / [c_s / a] = \frac{v_{th,i}}{2 q R_0 \sqrt{\beta_i}}. \end{equation}

Here, $R_0$ is expressed in units of the minor radius, and $\beta _i = \beta _e n_i T_i / (n_e T_e)$ represents the thermal ion kinetic over magnetic pressure.

Figure 6. Linear growth rates (a) and frequencies (b) of the TAE for different $\beta _e$ and energetic-particle temperature at $k_y \rho _s = 0.1$.

On the other hand, the TAE linear damping is found to decrease as the energetic-particle temperature $T_f / T_e$ increases, thus moving the threshold for the linear destabilization of this mode to smaller $\beta _e$ (see figure 6a). Therefore, at a fixed value of $\beta _e$, a more effective nonlinear coupling between TAEs and ITGs is expected (and later on confirmed in § 6) for larger values of the energetic-particle temperature $T_f / T_e$, i.e. when the TAE is still linearly stable but with a negligible damping. These results are consistent with the TAE scaling with $T_f / T_e$ known in the literature (Hu & Chen Reference Hu and Chen2004; Bierwage, Chen & Zonca Reference Bierwage, Chen and Zonca2009; Mishchenko, Könies & Hatzky Reference Mishchenko, Könies and Hatzky2009; Zonca & Chen Reference Zonca and Chen2014; Könies et al. Reference Könies, Briguglio, Gorelenkov, Fehér, Isaev, Lauber, Mishchenko, Spong, Todo and Cooper2018). An important remark here is that these findings might not extrapolate well to the range of fast-particle temperatures expected for fusion-born alpha particles, where the flux-tube approximation might break down.

5. Flux-tube approximation of energetic-particle modes

The degree of approximation in treating energetic-particle modes, such as TAEs, in the local flux-tube limit $(1/\rho ^* \rightarrow \infty )$ and its range of validity is discussed throughout this section. Results on energetic-particle modes obtained with the flux-tube gyrokinetic code GYRO (Candy & Waltz Reference Candy and Waltz2003a,Reference Candy and Waltzb) have already been reported in previous papers, e.g. Bass & Waltz (Reference Bass and Waltz2010) and Sheng, Waltz & Staebler (Reference Sheng, Waltz and Staebler2017). These studies demonstrated the feasibility of local linear and nonlinear simulations of TAEs/energetic-particle modes for the DIII-D standard case parameters (Waltz, Kerbel & Milovich Reference Waltz, Kerbel and Milovich1994). Here, we present a comparison between results obtained with the local version of the code GENE and well established linear global results on TAEs (related to the International Tokamak Physics Activity (ITPA) benchmark case) obtained with gyrokinetic global codes at the toroidal mode number $n = 6$ (Mishchenko et al. Reference Mishchenko, Könies and Hatzky2009; Könies et al. Reference Könies, Briguglio, Gorelenkov, Fehér, Isaev, Lauber, Mishchenko, Spong, Todo and Cooper2018). A detailed description of the plasma parameters can be found in Mishchenko et al. (Reference Mishchenko, Könies and Hatzky2009) and Könies et al. (Reference Könies, Briguglio, Gorelenkov, Fehér, Isaev, Lauber, Mishchenko, Spong, Todo and Cooper2018). They are summarized in table 2. The linear TAE growth rates and frequencies as functions of the fast-particle temperature and density are shown in figure 7. The flux-tube results are obtained at $\rho _\textrm {tor} = 0.5$, which corresponds to the radial position of the peak of the global electrostatic and magnetic potential structures. Good qualitative agreement is observed for each of these simulations in both the frequencies and the growth rates at $T_f/T_e < 400$. The quantitative differences between the local and global codes (which are rather small in the frequencies) might be attributed to the absence of ‘profile-averaging’ as major finite size effects in the flux-tube simulation, which therefore experiences a stronger drive. Clearly, the flux-tube TAE description becomes less and less accurate as the ratio $\beta _f / \beta _{\textrm {thermal}} = T_f n_f / (T_e n_e + T_i n_i)$ increases. This is consistent with the interpretation of a progressive mode conversion of the TAE into an energetic-particle-mode (EPM) with $\beta _f$ as discussed in Mishchenko et al. (Reference Mishchenko, Könies and Hatzky2009). In particular, a TAE has a dominant Landau damping (Chen & Zonca Reference Chen and Zonca2016; Vannini et al. Reference Vannini, Biancalani, Bottino, Hayward-Schneider, Lauber, Mishchenko, Novikau and Poli2020), present in our flux-tube model, whereas an EPM has a dominant continuum damping (Chen & Hasegawa Reference Chen and Hasegawa1974; Chen & Zonca Reference Chen and Zonca2016), which is not present here. The EPM is destabilized as the energetic-particle drive contribution overcomes the stabilizing effect provided by the shear Alfvén wave (SAW) continuum. The TAE/EPM mode conversion occurs when $\beta _f / (\beta _{e} + \beta _i) > 1$. In correspondence to this threshold, the TAE/EPM frequency exceeds the (upper) toroidicity continuum-gap frequency and starts to strongly interact with the SAW continuum. This interaction can only be captured by retaining a radially-global description, i.e. keeping phase-mixing effects. Therefore, the local flux-tube approximation breaks down as the EPM is destabilized.

Table 2. Parameters for the ITPA benchmark case (Mishchenko et al. Reference Mishchenko, Könies and Hatzky2009; Könies et al. Reference Könies, Briguglio, Gorelenkov, Fehér, Isaev, Lauber, Mishchenko, Spong, Todo and Cooper2018) at $\rho _{\textrm {tor}} = 0.5$. Here, $T$ denotes the temperature normalized to the electron one, $\omega _{T,n} = a/L_{T,n}$ the normalized logarithmic temperature and density gradients, $R_0$ the major radius, $a$ the minor radius, ${s} = (\rho _\textrm {tor}/q)(\textrm {d} q/ \textrm {d}\rho _\textrm {tor})$, $\rho ^*_i = \rho _s / a$ the magnetic shear and $\beta _e = 8 {\rm \pi}n_e T_e / B_0^2$ the ratio between the thermal electron and magnetic pressure.

Figure 7. Comparison of energetic-particle-driven TAE (a) growth rates and (b) frequencies as functions of $n_f$ at fixed fast particle temperature $T_f = 0.4$ MeV, and (c) growth rates and (d) frequencies for varying temperature but fixed $n_f = 7.5 \times 10^{16}\ \textrm {m}^{-3}$. The global code results and reference parameters are taken from Mishchenko et al. (Reference Mishchenko, Könies and Hatzky2009) and Könies et al. (Reference Könies, Briguglio, Gorelenkov, Fehér, Isaev, Lauber, Mishchenko, Spong, Todo and Cooper2018); the GENE flux-tube simulations have been performed at $\rho _{\textrm {tor}} = 0.5$. The vertical black line in panels (a) and (b) marks the energetic-particle density for which $\beta _f = \beta _{\textrm {thermal}}$.

However, we note that the plasma scenario considered for this paper has $\beta _f / \beta _{\textrm {thermal}} < 0.29$; i.e. the TAE mode is linearly stable and only marginally destabilized through nonlinear coupling with the ITG turbulence. Moreover, the high-frequency modes observed in figure 7(b) and in figure 7(d) are consistent with the TAE linear frequency of (4.1), which is significantly below the upper SAW continuum frequency and located well into the TAE gap. This is shown in detail in Mishchenko et al. (Reference Mishchenko, Könies and Hatzky2009). Therefore, the local flux-tube gyrokinetic approximation appears to be a reasonably accurate description of energetic-particle modes which lie in the SAW gaps for the ITPA benchmark case. However, further comparisons are required to assess the range of validity of flux-tube simulations in modelling the linear and nonlinear dynamics of energetic-particle-driven modes. This will be addressed in future studies.

6. Nonlinear scans

In the previous sections, we have shown linear and nonlinear results supporting the physical interpretation of a nonlinear wave–wave interaction between marginally stable TAEs and ITG turbulence. Such interplay is able to explain the substantial turbulence stabilization observed in flux-tube numerical simulations (for fast ion species at sub-critical energies) and can qualitatively reproduce the experimental observations. According to the results contained in this paper and in Di Siena et al. (Reference Di Siena, Görler, Poli, Bañón Navarro, Biancalani and Jenko2019a), energetic particles can marginally destabilize modes at frequencies larger than the ITG one, which deplete the energy content of the ion-scale turbulence and act as a catalyst for an increase in the zonal-flow activity. As a result, energetic particles strongly suppress outward transport, potentially leading to improved plasma confinement. It is important to mention that this beneficial impact of energetic particles on turbulent transport requires that the linear damping of the TAEs be larger than the corresponding drive term. If this condition is not fulfilled, i.e. the EPMs are linearly unstable, a significant turbulence destabilization is observed (Biancalani et al. Reference Biancalani, Bottino, Di Siena, Gürcan, Hayward-Schneider, Jenko, Lauber, Mishchenko, Morel and Novikau2020) (see figure 4). Typically, these modes become the dominant instabilities when the total plasma pressure and its radial gradient exceeds a particular threshold. The parameter controlling this transition is defined as $\alpha = -q^2 R \,\textrm {d} \beta / \textrm {d} \rho _\textrm {tor}$ (Romanelli et al. Reference Romanelli, Zocco and Crisanti2010). Here, $q$ represents the safety factor, $R$ the major radius, $\beta = \sum _s 8 {\rm \pi}n_s T_s / B_0^2$ the total plasma beta (summed over all the species $s$) and B 0 the magnetic field on-axis. When $\alpha$ passes a critical value $\alpha _c$ these modes strongly increase particle/heat fluxes, thus causing degradation of the overall plasma confinement (see figure 4). It is, therefore, essential for further exploitation of this stabilizing effect to explore the impact of the various plasma parameters on the turbulence stabilization observed previously and in the literature under the condition $\alpha < \alpha _c$.

The main goal of this section is to identify the most effective parameters controlling the nonlinear turbulence stabilization. Moreover, these findings provide guidance for maximizing the turbulence suppression by nonlinear and electromagnetic fast-ion effects and well-converged data for training of reduced models to incorporate this nonlinear fast-particle effect. It is important to mention here that we consider in our analyses only supra-thermal particles generated via auxiliary heating systems, which are essentially different from alpha particles. Therefore, it may not be possible to extrapolate these results to fusion-born fast ions.

Given the nonlinear nature of this mechanism, we perform $30$ nonlinear GENE simulations, each requiring approximately $100\,000\ \textrm {CPU} \cdot \textrm {h}$ on the Marconi Skylake partition.

6.1. Energetic-particle temperature

The first parameter dependence studied in this section is the energetic-particle temperature. It distinguishes the supra-thermal particles from the bulk species and, as previously discussed in § 4, directly affects the linear damping/drive of the TAE modes. The role of $T_f/ T_e$ on the nonlinear electromagnetic turbulence suppression observed in figure 2 is analysed by performing nonlinear GENE flux-tube simulations at $\beta _e = 0.006$, keeping the other main plasma parameters and geometry fixed at the reference values summarized in table 1. In figure 8(a) we observe a substantial reduction of the main-ion turbulent fluxes as the fast-ion temperature increases, with a relative stabilization by about $40\,\%$ at $T_f = 13 T_e$. The same reduction is observed for the electron heat flux (not shown here), consistently with the results of figure 2(b). We note a linear dependence (inside the error bars) of $Q_i / Q_{gB}$ with $T_f/T_e$, which scales with a coefficient $m = -5.1$.

Figure 8. (a) Time-averaged nonlinear main-ion heat fluxes in gyro-Bohm units for different values of $T_f / T_e$ at $\beta _e = 0.006$. (b) Frequency spectra of $\bar {\phi }_1$ – averaged over $k_x \rho _s$ and $z$ – for $T_f/T_e = 1$ (blue line) and $T_f/T_e = 13$ (red line) at $k_y \rho _s = 0.1$ and $\beta _e = 0.006$ in the time range $[50\text {--}340] a / c_s$. The red line in panel (a) represents the best linear fit of the nonlinear GENE results. The dotted lines indicate the fit uncertainties.

Interestingly, as the main-ion heat flux decreases with $T_f / T_e$, a progressive destabilization of high-frequency modes (TAEs) is observed in the frequency spectra of the electrostatic potential at $k_y \rho _s = 0.1$ (see figure 8b). This is obtained by applying a Fourier transform to the electrostatic potential $\bar {\phi }_1$ during the saturated steady-state time domain $t [a / c_s] = [50\text {--}350]$. A meaningful observation is that, consistently with the linear results shown previously in §§ 4 and 5, the frequency of the TAE mode does not change significantly with $T_f / T_e$ and is well captured by (4.1). We note that deviations in the TAE frequency with $T_f /T_e$ are only expected for larger values of $T_f / T_e$ (as shown in figure 7).

It is worth mentioning that we do not observe the transition to the second nonlinear phase – characterized by an increased in the zonal flow activity – for these specific simulations. This is attributed to the relatively small value of $\beta _e = 0.006$ employed throughout these analyses, which does not allow the linear TAE drive to get close to the damping of the mode. Therefore, the nonlinearly excited TAE – sustained only via cross-scale coupling with the ITG turbulence – does not reach a meaningful amplitude to interact with the zonal flow.

6.2. Energetic-particle temperature gradient

The second energetic-particle parameter analysed is the logarithmic temperature gradient $\omega _{T,f}$. It enters the definition of the fast-ion pressure gradient and thus affects the normalized pressure $\alpha$ and the TAE linear drive. It is varied from $\omega _{T,f} = 0$, i.e. a flat temperature profile, to $\omega _{T,f} = 1.5$, i.e. $50\,\%$ steeper than the reference value. The other plasma parameters are summarized in table 1, with the sole exception of the electron plasma beta, which is $\beta _e = 0.009$ (increased with respect to the previous nonlinear scans to move the TAE closer to the marginal stability threshold). The magnetic geometry is kept fixed in all of these analyses, so that the results within this section arenot related to geometric stabilizing effects enhanced by the increase of the fast-ion pressure gradient (Bourdelle et al. Reference Bourdelle, Hoang, Litaudon, Roach and Tala2005).

The behaviour of the bulk ion turbulent heat flux $(Q_i / Q_{gB})$ in relation to the energetic-particle logarithmic temperature gradient is illustrated in figure 9(a). A progressive enhancement of the nonlinear fast-ion stabilization is observed when $\omega _{T,f}$ is increased, leading to $60\,\%$ lower turbulent fluxes at $\omega _{T,f} = 1.5$ (with respect to $\omega _{T,f} = 0$). We note a linear dependence of $Q_i / Q_{gB}$ on $\omega _{T,f}$, which scales with a coefficient $m = -12.6$.

Figure 9. (a) Time-averaged nonlinear main-ion heat fluxes in gyro-Bohm units for different values of the fast-ion logarithmic temperature gradient $\omega _{T,f}$ at $\beta _e = 0.009$. (b) Frequency spectra of $\bar {\phi }_1$ – averaged over $k_x \rho _s$ and $z$ – for $\omega _{T,f} = 0$ (blue line) and $\omega _{T,f} = 1.5$ (red line) at $k_y \rho _s = 0.1$ and $\beta _e = 0.009$ in the time range $[50\text {--}340] a / c_s$. The red line in panel (a) represents the best linear fit of the nonlinear GENE results. The dotted lines indicate the fit uncertainties.

The growth of the nonlinear fast-ion stabilization with $\omega _{T,f}$ is correlated with the destabilization of linearly stable TAEs. This is shown in figure 9(b), where the frequency spectra of the electrostatic potential are plotted for the bi-normal mode number $k_y \rho _s = 0.1$ – at the middle of the $k_y \rho _s$ scales where the TAE is nonlinearly destabilized. Interestingly, $\omega _{T,f}$ does not affect the TAE frequency, but rather the linear TAE drive/damping, thus moving the threshold for linearly destabilizing this mode – at fixed $\beta _e$ – to smaller values of $\omega _{T,f}$, or equivalently $\alpha$. This result is similar to what has been observed previously for the energetic-particle temperature. Therefore, $T_f / T_e$ and $\omega _{T,f}$ play similarly critical roles in the dynamics of the electromagnetic cross-scale interaction studied here. However, the logarithmic temperature gradient is more effective than the temperature in suppressing ITG turbulence by more than a factor of two ($m_{\omega _{T,f}} / m_T = 2.5$), as estimated by looking at the coefficient of the linear fit of figures 8(a) and 9(a).

The characteristic transition to the second nonlinear phase is observed in all the simulations presented in this section. This feature was not found during the scan over the energetic-particle temperature because of the smaller value of $\beta _e$ employed, making the nonlinear electromagnetic fast-particle effects on turbulence weaker. This can also be noted by looking at the relatively larger ion heat fluxes observed during the scan over $T_f / T_e$.

6.3. Energetic-particle density gradient

Similarly to $\omega _{T,f}$, the energetic-particle logarithmic density gradient affects the normalized pressure gradient $\alpha$ and thus the TAE linear drive. In contrast to $\omega _{T,f}$, a change in $\omega _{n,f}$ imposes a variation in the logarithmic density gradient of the bulk ions to ensure quasi-neutrality. The latter is always fulfilled in our analyses on both density and density gradients. The plasma parameters employed here are summarized in table 1, with the sole exception of the electron plasma beta, which is $\beta _e = 0.009$.

The dependence of the main-ion turbulent fluxes on the fast-particle density gradient is shown in figure 10(a). Again, an increase in $\omega _{n,f}$ reflects into an enhancement of the nonlinear electromagnetic fast-particle stabilization, which is always accompanied by a destabilization of a linearly stable TAE mode. However, we note that the energetic-particle stabilization scales with the fast-ion logarithmic density gradient with a coefficient $m_{\omega _{n,f}} = -7.4$, twice as small as the temperature gradient one. This result can be explained by an interplay between the wave–particle resonance interaction and the nonlinear wave–wave coupling. The increase in the supra-thermal ion temperature gradient leads to an enhancement of the resonant interaction between fast particles and the underlying ITG micro-instability. However, since $\omega _{n,f} > \omega _{T,f}$ this resonant interaction destabilizes the bulk ion-driven ITG, leading to a larger ITG drive and thus larger turbulent fluxes. As a result, the critical threshold to destabilize the TAEs $(\alpha _c)$ is expected to move to larger values when $\omega _{n,f} > \omega _{T,f}$. The results shown in figures 9(a) and 10(a) seem to confirm this theoretical prediction, although the nonlinear nature of this fast-particle turbulence stabilization makes any extrapolation on the $\alpha _c$ questionable.

Figure 10. (a) Time-averaged nonlinear main-ion heat fluxes in gyro-Bohm units for different values of the fast-ion logarithmic density gradient $\omega _{n,f}$ at $\beta _e = 0.009$. (b) Frequency spectra of $\bar {\phi }_1$ – averaged over $k_x \rho _s$ and $z$ – for $\omega _{n,f} = 0$ (blue line) and $\omega _{n,f} = 6$ (red line) at $k_y \rho _s = 0.1$ and $\beta _e = 0.009$ in the time range $[50 \text {--} 340] a / c_s$. The red line in panel (a) represents the best linear fit of the nonlinear GENE results. The dotted lines indicate the fit uncertainties.

These results suggest that $\omega _{n,f}$ is less effective than $\omega _{T,f}$ in enhancing the overall fast-particle turbulence suppression, or, equivalently, that the wave–particle interaction weakens the TAE drive. A more detailed analysis of the possible interaction between these two newly discovered fast-particle effects on turbulence is left for future study.

6.4. Safety factor

Another important parameter controlling the stability of the sub-marginal TAEs is the safety factor $q$. In a radially global set-up, it strongly affects the continuous spectrum of SAW and, hence, the radial position of the continuum gaps. Therefore, it impacts both the TAE frequency (see (4.1)) and the normalized pressure $\alpha$ (as $\alpha \propto q^2$), simultaneously affecting frequency and drive/damping. Assuming that the critical threshold to destabilize these modes $\alpha _c$ is approximately constant with respect to the safety factor, an increase of $q$ will lead to a strong enhancement of the nonlinear fast particle turbulence suppression at smaller values of $\beta _e$. This behaviour is confirmed by the nonlinear GENE simulations in figure 11(a), where a scan over $\beta _e$ at $q = 1.2$ is compared to the one obtained at $q = 1.7$. These results show that the nonlinear electromagnetic turbulence suppression by supra-thermal ions is particularly sensitive to the change in the safety factor $q$. More precisely, an increase in the safety factor from $q = 1.2$ to $q = 1.7$ leads to a downshift of $54\,\%$ in the critical value of $\beta _{e,c}$: it moves from $\beta _{e,c} = 0.013$ at $q = 1.2$ to $\beta _{e,c} = 0.006$ at $q = 1.7$. These findings suggest a quadratic dependence of the critical electron beta ($\beta _{e,c}$) on the safety factor, namely $\beta _{e,c}(q = 1.7) / \beta _{e,c}(q = 1.2) \sim (q = 1.2)^2/(q = 1.7)^2$. A more accurate quantification of the scaling power of $\beta _{e,c}$ with $q$ will be carried out in the near future by increasing the number of nonlinear simulations performed.

Figure 11. (a) Time-averaged nonlinear main-ion heat fluxes in gyro-Bohm units for different values of the safety factor $q$ and $\beta _e$. (b) Frequency spectra of $\bar {\phi }_1$ – averaged over $k_x \rho _s$ and $z$ – for $q = 1.2$ (blue line) and $q = 1.7$ (red line) at $k_y \rho _s = 0.1$ and $\beta _e \sim 0.006$ in the time range $[50 \text {--} 340] a / c_s$.

The enhanced turbulence suppression obtained by increasing the safety factor $q$ at fixed $\beta _e$ is again attributed to the nonlinear destabilization of linearly stable TAEs, as shown by the frequency spectra of the electrostatic potential (figure 11b). An increase in $q$ leads to a larger TAE drive and to a more effective cross-scale nonlinear coupling, as demonstrated in figure 11 by the behaviour of the amplitude of the high-frequency mode with $q$. The change in the safety factor also affects the marginally stable TAE frequency, which scales as predicted by (4.1), as $1/q$, going from $\omega = 2.4 [c_s/a]$ at $q = 1.2$ to $\omega = 1.7 [c_s /a]$ at $q = 1.7$.

These findings highlight the importance of the safety factor in controlling the nonlinear fast-particle turbulence stabilization and make $q$ a key parameter for the design of experiments with improved confinement.

6.5. Magnetic shear

The magnetic shear (defined as $s = (\rho _\textrm {tor}/q)(\textrm {d} q/ \textrm {d}\rho _\textrm {tor })$) – similarly to the safety factor $q$ – is another important geometrical parameter affecting the energetic-particle nonlinear electromagnetic turbulence suppression. While the safety factor $q$ affects the normalized pressure gradient $\alpha$, the magnetic shear $s$ affects the stability threshold for the destabilization of AEs $\alpha _c$; see e.g. Fu (Reference Fu1995). Therefore, at a fixed $\alpha$, variations in the magnetic shear can enhance or weaken the nonlinear electromagnetic fast-ion turbulence suppression, depending on the difference between $\alpha$ and $\alpha _c$. The smaller this difference, the closer the sub-marginally stable fast-particle-driven TAE is to the linear stability threshold, leading to a more effective cross-scale coupling and to a stronger turbulence suppression. However, if $\alpha$ surpasses $\alpha _c$, a strong turbulence destabilization is observed, which is attributed to linearly unstable energetic-particle-driven modes (Biancalani et al. Reference Biancalani, Bottino, Di Siena, Gürcan, Hayward-Schneider, Jenko, Lauber, Mishchenko, Morel and Novikau2020) (see figure 4).

These predictions are consistent with the results presented in figure 12(a), where the main-ion turbulent fluxes are shown for different values of $\beta _e$ and magnetic shear. More precisely, figure 12(a) reveals that if $s$ is increased from $s = 0.1$ to $s = 0.52$ (nominal) and $s = 0.75$, the nonlinear fast-particle turbulence suppression is progressively weakened, although $\alpha$ is unaffected. We note that the increase in the magnetic shear affects the critical $\beta _c$ (and hence $\alpha _c$), shifting it to larger values. An increase in the magnetic shear of $44\,\%$ moves $\beta _c$ (or equivalently $\alpha _c$) by $12\,\%$, namely from $\beta _c(s = 0.52) = 0.006$ to $\beta _c(s = 0.75) = 0.0067$. These findings reveal that the magnetic shear has a minor impact on the critical threshold $\alpha _c$. However, it still has a large effect in enhancing the nonlinear wave–particle stabilization, which increases by $85\,\%$ at $\beta _e = 0.006$ for the value of the magnetic shear $s = 0.52$ (as shown in figure 12a), relative to $s=0.75$.

Figure 12. (a) Time-averaged nonlinear main-ion heat fluxes in gyro-Bohm units for different values of the magnetic shear $s$ and $\beta _e$. (b) Frequency spectra of $\bar {\phi }_1$ – averaged over $k_x \rho _s$ and $z$ – for $s = 0.1$ (black line) at $\beta _e \sim 0.004$, $s = 0.52$ (red line) at $\beta _e \sim 0.0586$ and $s = 0.75$ (blue line) at $\beta _e \sim 0.006$ for $k_y \rho _s = 0.1$ in the time range $[50 \text {--} 340] a / c_s$.

Furthermore, consistently with the previous results, figure 12(b) shows that the amplitude of the TAE mode and the ITG are strictly connected; specifically, as the amplitude of the TAE increases, the ITG peak is consequently reduced. This again suggests a nonlinear cross-scale coupling between these different plasma instabilities. It is worth mentioning that for the case ${s} = 0.1$, a third peak $(\omega [c_s / a] \sim 2.31)$ arises at frequency larger than the TAE one $(\omega [c_s / a] \sim 1.38$). This finding suggests that the nonlinear cross-scale between ITGs and marginally stable modes is not restricted to TAEs only. Similar effects are expected for other marginally stable modes driven by thermal and/or energetic ions.

The findings presented throughout this section are consistent with previous modelling results (Citrin et al. Reference Citrin, Jenko, Mantica, Told, Bourdelle, Garcia, Haverkort, Hogeweij, Johnson and Pueschel2013, Reference Citrin, Garcia, Görler, Jenko, Mantica, Told, Bourdelle, Hatch, Hogeweij and Johnson2015) and experimental observations (Mantica et al. Reference Mantica, Angioni, Challis, Colyer, Frassinetti, Hawkes, Johnson, Tsalas, de Vries and Weiland2011), showing enhanced confinement in hybrid scenarios at JET due to ITG electromagnetic stabilization at low magnetic shear (Mantica et al. Reference Mantica, Angioni, Challis, Colyer, Frassinetti, Hawkes, Johnson, Tsalas, de Vries and Weiland2011; Citrin et al. Reference Citrin, Jenko, Mantica, Told, Bourdelle, Garcia, Haverkort, Hogeweij, Johnson and Pueschel2013). Hybrid scenarios (high beta, low magnetic shear in the inner half-radius and significant fast-ion fraction) are high-confinement regimes achieved in present-day devices (e.g. JET, AUG, DIII-D, KSTAR) as well as in ITER extrapolations. In such regimes, electromagnetic stabilization effects are considered to be an important contribution to the observed improved core confinement regime. Therefore, our findings, showing an improved turbulence stabilization via fast ions at low magnetic shear (e.g. ${s} < 0.2$), might be particularly valuable for such conditions.

7. Conclusions

Traditionally, fusion theory has largely been subdivided into separate research topics treated independently. More recently, however, we witness the emergence of a growing number of cases in which two or more fundamental processes with disparate time and/or space scales are inseparably connected, adding new facets to the qualitative and quantitative understanding of the respective phenomena. The present paper addresses one such case. Recent studies of magnetically confined plasmas have highlighted that turbulent transport can be controlled by the presence of energetic ions, often neglected in turbulence studies. This calls for a more integrative modelling approach, with the goal of grasping the underlying physics and identifying the range of parameters that maximize the beneficial effect of fast particles on magnetic confinement.

In the present contribution, significant steps along these lines are presented through flux-tube gyrokinetic simulations of realistic plasma conditions. More precisely, the impact of energetic particles on ITG turbulence is investigated in detail. It has previously been found, in a number of studies, that supra-thermal particles can strongly reduce turbulence levels, leading to a significant suppression in the outward turbulence fluxes for each plasma species. The mechanism responsible for such a substantial effect has been attributed to the cross-scale nonlinear interaction between linearly stable Alfvén eigenmodes (driven by the large fast-ion pressure and pressure gradients) and the ITG turbulence (Di Siena et al. Reference Di Siena, Görler, Poli, Bañón Navarro, Biancalani and Jenko2019a).

To further corroborate these results and understand the range of validity of the flux-tube approximation in modelling EPMs, we have presented a linear benchmark of TAEs (the ITPA benchmark case) between the local version of the code GENE and well established linearly global results. We have found that, for low energetic-particle temperature and far from the SAW continuum gap, the flux-tube code successfully captures the TAE linear growth rates and frequencies. On the other hand, it breaks when the supra-thermal particle temperature increases and the interaction with the continuum is not negligible, which, however, is well beyond the parameter range of interest for the experimental parameters at hand.

Furthermore, we have performed a series of nonlinear simulations to address the scaling of the electromagnetic fast-particle turbulence suppression with different plasma parameters. Among the fast-particle ones ($T_f/T_e$, $\omega _{T,f}$ and $\omega _{n,f}$), we have found that the most effective in enhancing the ITG turbulence suppression is the logarithmic temperature gradient, which leads to a sharp drop in the main-ion turbulent fluxes. The magnetic geometry is also found to lead to strong modifications in the turbulence suppression. In particular, we have studied the role of the safety factor and the magnetic shear in controlling the levels of the turbulent fluxes. Both these parameters have a strong impact, moving the marginal stability threshold of the energetic-particle-driven TAEs and thus enhancing their beneficial effect on turbulence (acting as an effective sink of free energy from the ITG micro-turbulence).

Beside providing physical understanding of the nonlinear interaction between energetic particles and ITG micro-turbulence, these findings provide useful insights for reduced turbulence models and integrative approaches, which still miss this particular effect (Doerk et al. Reference Doerk, Bock, Di Siena, Fable, Görler, Jenko and Stober2017).

Acknowledgements

The authors would like to thank P. Lauber for useful discussions.

Editor Francesco Califano thanks the referees for their advice in evaluating this article.

Funding

This work has been carried out within the framework of the EUROfusion Consortium and has received funding from the Euratom research and training programme 2014–2018 and 2019–2020 under grant agreement no. 633053. The views and opinions expressed herein do not necessarily reflect those of the European Commission. The simulations presented in this work were performed at the Marconi CINECA. Therefore, we acknowledge the CINECA award under the ISCRA initiative for the provision of high-performance computing resources and support.

Declaration of interests

The authors report no conflict of interest.

Appendix. Long-term zonal flow evolution in near-marginal turbulence

Certain turbulent systems that approach the nonlinear ITG threshold have recently been shown to exhibit a long-time evolution of the zonal flow amplitude (Peeters et al. Reference Peeters, Rath, Buchholz, Camenen, Candy, Casson, Grosshauser, Hornsby, Strintzi and Wikl2016; Rath et al. Reference Rath, Peeters, Buchholz, Grosshauser, Migliano, Wikl and Strintzi2016). In particular, a minimum main-ion heat flux value of $Q_i = 10$ in gyro-Bohm units has been identified for the collisionless electrostatic CYCLONE base case parameters with adiabatic electrons. Below this value, Rath et al. (Reference Rath, Peeters, Buchholz, Grosshauser, Migliano, Wikl and Strintzi2016) showed that no turbulent state can exist, and periodic bursts of the main-ion heat flux have been observed in association with a secular evolution of the zonal flow amplitude. Therefore, the nonlinear simulations presented throughout this paper and in Di Siena et al. (Reference Di Siena, Görler, Poli, Bañón Navarro, Biancalani and Jenko2019a) are revisited to discuss any possible contribution of a secular zonal flow growth to the increase observed in the phase I/II transition. As suggested in Rath et al. (Reference Rath, Peeters, Buchholz, Grosshauser, Migliano, Wikl and Strintzi2016), the degree of intermittency of the heat flux and the flawed non-smooth behaviour of the zonal flow can be investigated by analysing the statistical properties of the probability distribution functions (p.d.f.s) of the main heat flux. Large deviations from the Gaussian distribution – quantified by the skewness $s$ and the excess kurtosis $k$ (Mavridis et al. Reference Mavridis, Isliker, Vlahos, Görler, Jenko and Told2014) – indicate a non-physical contribution from a slowly changing zonal flow amplitude. Both quantities are evaluated from the p.d.f. distributions of figure 13(a) for the parameters of table 1 at $\beta _e = 0.012$ for three relevant time windows: the quasi-steady state phase I at $t_1 = [200 \text {--} 400] a/c_s$, the phase I/II transition at $t_2 = [400 \text {--} 500] a/c_s$ and deep in phase II at $t_3 = [500 \text {--} 1200] a/c_s$. The statistical properties of the heat flux p.d.f.s are shown in figure 13(c) and do not vary significantly over the selected time windows. Therefore, the increase in the zonal flow amplitude observed during the transition in the reduced transport phase (phase II) does not affect the shape of the heat flux p.d.f. distribution, whose statistical properties are almost unaffected. The results of figure 13(ac) can be compared with the ones measured in the steady-state time domain for each $\beta _e$ value employed throughout this paper and in Di Siena et al. (Reference Di Siena, Görler, Poli, Bañón Navarro, Biancalani and Jenko2019a). Figure 13(d) shows that both the skewness and the excess kurtosis are only mildly affected by $\beta _e$, and that the shapes of the heat flux p.d.f. distributions, shown in figure 13(b) for three relevant values of $\beta _e$, stay close to a Gaussian distribution. These results differ from the numerical observations of Rath et al. (Reference Rath, Peeters, Buchholz, Grosshauser, Migliano, Wikl and Strintzi2016), which related intermittency behaviour of the heat flux and secular evolution of the zonal flow to a significant increase in the non-Gaussian features of the heat flux p.d.f.s. In particular, values of $3.4$ and $18$, respectively, for the skewness and excess kurtosis were observed in Rath et al. (Reference Rath, Peeters, Buchholz, Grosshauser, Migliano, Wikl and Strintzi2016) in the low-heat-flux simulations, characterized by non-physical zonal flow evolution and bursty transport. Therefore, the results presented in this section reveal that only minor deviations from the Gaussian p.d.f. distribution are observed in this paper for each value of $\beta _e$. These observations suggest that the zonal flow increase between the so-called phase I and phase II of Di Siena et al. (Reference Di Siena, Görler, Poli, Bañón Navarro, Biancalani and Jenko2019a) cannot be explained in terms of a non-physical behaviour of the long-time zonal flow evolution.

Figure 13. Main ion probability distribution functions (p.d.f.s) and their skewness $s$ and excess kurtosis $k$ as functions of (ac) selected time periods spanning several correlation times (during quasi-steady state phase I at $t_1 = [200 \text {--} 400] a/c_s$, during the transition between phases I and II at $t_2 = [400 \text {--} 500] a/c_s$ and deep in phase II at $t_3 = [500 \text {--} 1200] a/c_s$) and (bd) of $\beta _e$. The different p.d.f.s are normalized to unity.

Moreover, a stable turbulent ‘stationary phase’ is observed for a rather long time domain, namely $t \sim 400 \text {--} 1000 [a / c_s]$, which is in contrast with the interpretation of a secular/intermittent evolution of the heat flux and zonal flow. Moreover, as discussed in Di Siena et al. (Reference Di Siena, Görler, Poli, Bañón Navarro, Biancalani and Jenko2019a), after a Fourier decomposition in time of the zonal component of the electrostatic potential, fast oscillations are observed at the specific TAE frequency, corroborating the physical interpretation given throughout this paper and in Di Siena et al. (Reference Di Siena, Görler, Poli, Bañón Navarro, Biancalani and Jenko2019a). It is remarked that the magnitude of the heat flux during the second nonlinear phase depends on the simulation parameters and does not necessarily imply proximity to marginality, while the nonlinear coupling to a marginally stable high-frequency mode remains a ubiquitous observation in all these scenarios.

It is worth mentioning that the results of this paper were obtained in a realistic plasma scenario, which includes the effects of inter-species collisions, kinetic electrons, electromagnetic effects and complex magnetic plasma geometry. Therefore, each of these terms can affect the minimum heat-flux threshold for the non-physical results discussed in Peeters et al. (Reference Peeters, Rath, Buchholz, Camenen, Candy, Casson, Grosshauser, Hornsby, Strintzi and Wikl2016) and Rath et al. (Reference Rath, Peeters, Buchholz, Grosshauser, Migliano, Wikl and Strintzi2016). In particular, collisions can act on the zonal flow evolution as a natural damping mechanism, suppressing or delaying its long-time secular growth.

References

REFERENCES

Bass, E. M. & Waltz, R. E. 2010 Gyrokinetic simulations of mesoscale energetic particle-driven Alfvénic turbulent transport embedded in microturbulence. Phys. Plasmas 17, 112319.CrossRefGoogle Scholar
Biancalani, A., Bottino, A., Di Siena, A., Görler, T., Novikau, I., Gürcan, Ö., Morel, P., Jenko, F., Lanti, E., Ohana, N., et al. 2018 Self-consistent gyrokinetic description of the interaction between Alfvén modes and turbulence. IAEA Proceeding.Google Scholar
Biancalani, A., Bottino, A., Di Siena, A., Gürcan, Ö., Hayward-Schneider, T., Jenko, F., Lauber, P., Mishchenko, A., Morel, P., Novikau, I., et al. 2020 Gyrokinetic investigation of Alfvén instabilities in the presence of turbulence. Plasma Phys. Control. Fusion.Google Scholar
Bierwage, A., Chen, L. & Zonca, F. 2009 Pressure-gradient-induced Alfvén eigenmodes: I. Ideal MHD and finite ion Larmor radius effects. Plasma Phys. Control. Fusion 52 (1), 015004.CrossRefGoogle Scholar
Bock, A., Fable, E., Fischer, R., Reich, M., Rittich, D., Stober, J., Bernert, M., Burckhart, A., Doerk, H., Dunne, M., et al. 2017 Non-inductive improved h-mode operation at ASDEX upgrade. Nucl. Fusion 57 (12), 126041.CrossRefGoogle Scholar
Bonanomi, N., Mantica, P., Citrin, J., Görler, T., Teaca, B. & JET Contributors 2018 Impact of electron-scale turbulence and multi-scale interactions in the JET tokamak. Nucl. Fusion 58, 124003.CrossRefGoogle Scholar
Bourdelle, C., Hoang, G. T., Litaudon, X., Roach, C. M., Tala, T., for the ITPA Topical Group on Trans Physics & the International ITB Database Work Group 2005 Impact of the $\alpha$ parameter on the microstability of internal transport barriers. Nucl. Fusion 45 (2), 110130.CrossRefGoogle Scholar
Bravenec, R., Citrin, J., Candy, J., Mantica, P., Görler, T. & JET Contributors 2016 Benchmarking the GENE and GYRO codes through the relative roles of electromagnetic and ExB stabilization in JET high-performance discharges. Plasma Phys. Control. Fusion 58, 125018.CrossRefGoogle Scholar
Candy, J. & Waltz, R. E. 2003 a An Eulerian Gyrokinetic-Maxwell solver. J. Comput. Phys. 186 (2), 545581.CrossRefGoogle Scholar
Candy, J. & Waltz, R. E. 2003 b Anomalous transport scaling in the DIII-D tokamak matched by supercomputer simulation. Phys. Rev. Lett. 91, 045001.CrossRefGoogle ScholarPubMed
Chen, L. & Hasegawa, A. 1974 Plasma heating by spatial resonance of Alfvén wave. Phys. Fluids 17 (7), 13991403.CrossRefGoogle Scholar
Chen, L. & Zonca, F. 2012 Nonlinear excitations of zonal structures by toroidal Alfvén eigenmodes. Phys. Rev. Lett. 109, 145002.CrossRefGoogle ScholarPubMed
Chen, L. & Zonca, F. 2016 Physics of Alfvén waves and energetic particles in burning plasmas. Rev. Mod. Phys. 88, 015008.CrossRefGoogle Scholar
Citrin, J., Garcia, J., Görler, T., Jenko, F., Mantica, P., Told, D., Bourdelle, C., Hatch, D. R., Hogeweij, G. M. D., Johnson, T., et al. 2015 Electromagnetic stabilization of tokamak microturbulence in a high-$\beta$ regime. Plasma Phys. Control. Fusion 57 (1), 014032.CrossRefGoogle Scholar
Citrin, J., Jenko, F., Mantica, P., Told, D., Bourdelle, C., Garcia, J., Haverkort, J. W., Hogeweij, G. M. D., Johnson, T. & Pueschel, M. J. 2013 Nonlinear stabilization of tokamak microturbulence by fast ions. Phys. Rev. Lett. 111 (15), 155001.CrossRefGoogle ScholarPubMed
Dannert, T. & Jenko, F. 2005 Gyrokinetic simulation of collisionless trapped-electron mode turbulence. Phys. Plasmas 12 (7), 072309.CrossRefGoogle Scholar
Di Siena, A. 2019 Implementation and investigation of the impact of different background distributions in gyrokinetic plasma turbulence studies. PhD thesis, ULM University, Germany.Google Scholar
Di Siena, A., Bañón Navarro, A. & Jenko, F. 2020 b Turbulence suppression by energetic particle effects in modern optimized stellarators. Phys. Rev. Lett. 125, 105002.CrossRefGoogle ScholarPubMed
Di Siena, A., Biancalani, A., Görler, T., Doerk, H., Novikau, I., Lauber, P., Bottino, A. & Poli, E. 2018 a Effect of elongation on energetic particle-induced geodesic acoustic mode. Nucl. Fusion 58, 106014.CrossRefGoogle Scholar
Di Siena, A., Bilato, R., Görler, T., Bañón Navarro, A., Poli, E., Bobkov, V., Jarema, D., Fable, E., Angioni, C. & Kazakov, Y. O. 2020 New high-confinement regime with fast ions in the core of fusion plasmas. arXiv:2010.14839.Google Scholar
Di Siena, A., Bilato, R., Görler, T., Bañón Navarro, A., Poli, E., Jarema, D., Fable, A., Angioni, C., Bobkov, R., Ochoukov, P., et al. 2020 a Fast ion-induced internal transport barrier at ASDEX Upgrade.Google Scholar
Di Siena, A., Görler, T., Doerk, H., Bilato, R., Citrin, J., Johnson, T., Schneider, M. & Poli, E. 2018 b Non-Maxwellian fast particle effects in gyrokinetic gene simulations. Phys. Plasmas 25 (4), 042304.CrossRefGoogle Scholar
Di Siena, A., Görler, T., Doerk, H., Citrin, J., Johnson, T., Schneider, M., Poli, E. & JET Contributors 2016 Non-Maxwellian background effects in gyrokinetic simulations with GENE. J. Phys.: Conf. Ser. 775, 012003.Google Scholar
Di Siena, A., Görler, T., Doerk, H., Poli, E. & Bilato, R. 2018 Fast-ion stabilization of tokamak plasma turbulence. Nucl. Fusion 58, 054002.CrossRefGoogle Scholar
Di Siena, A., Görler, T., Poli, E., Bañón Navarro, A., Biancalani, A. & Jenko, F. 2019 a Electromagnetic turbulence suppression by energetic particle driven modes. Nucl. Fusion 59 (12), 124001.CrossRefGoogle Scholar
Di Siena, A., Görler, T., Poli, E., Bilato, R., Doerk, H. & Zocco, A. 2019 b Resonant interaction of energetic ions with bulk-ion plasma micro-turbulence. Phys. Plasmas 26 (5), 052504.CrossRefGoogle Scholar
Doerk, H., Bock, A., Di Siena, A., Fable, E., Görler, T., Jenko, F. & Stober, J. 2017 Turbulence in high-beta ASDEX upgrade advanced scenarios. Nucl. Fusion 58 (1), 016044.CrossRefGoogle Scholar
Doerk, H., Bock, A., Di Siena, A., Fable, E., Görler, T., Jenko, F., Stober, J. & The ASDEX Upgrade Team 2018 Turbulence in high-beta ASDEX upgrade advanced scenarios. Nucl. Fusion 58, 016044.CrossRefGoogle Scholar
Florian, M. 2008 Gyrokinetic simulation of multimode plasma turbulence. PhD thesis, Westfälische Wilhelms-Universität Münster, Germany.Google Scholar
Fu, G. Y. 1995 Existence of core localized toroidicity induced Alfvnén eigenmode. Phys. Plasmas 2 (4), 10291031.CrossRefGoogle Scholar
Garcia, J., Challis, C., Citrin, J., Doerk, H., Giruzzi, G., Görler, T., Jenko, F., Maget, P. & JET Contributors 2015 Key impact of finite-beta and fast ions in core and edge tokamak regions for the transition to advanced scenarios. Nucl. Fusion 55, 053007.CrossRefGoogle Scholar
Holland, C., Petty, C. C., Schmitz, L., Burrell, K. H., McKee, G. R., Rhodes, T. L. & Candy, J. 2012 Progress in GYRO validation studies of DIII-D H-mode plasmas. Nucl. Fusion 52 (11), 114007.CrossRefGoogle Scholar
Hu, S. & Chen, L. 2004 Discrete Alfvén eigenmodes in high-$\beta$ toroidal plasmas. Phys. Plasmas 11 (1), 14.CrossRefGoogle Scholar
Jenko, F., Dorland, W., Kotschenreuther, M. & Rogers, B. N. 2000 Electron temperature gradient driven turbulence. Phys. Plasmas 7, 19041910.CrossRefGoogle Scholar
Kim, J. Y., Horton, W. & Dong, J. Q. 1993 Electromagnetic effect on the toroidal ion temperature gradient mode. Phys. Fluids B 5 (11), 40304039.CrossRefGoogle Scholar
Könies, A., Briguglio, S., Gorelenkov, N., Fehér, T., Isaev, M., Lauber, Ph., Mishchenko, A., Spong, D. A., Todo, Y., Cooper, W. A., et al. 2018 Benchmark of gyrokinetic, kinetic MHD and gyrofluid codes for the linear calculation of fast particle driven TAE dynamics. Nucl. Fusion 58, 126027.CrossRefGoogle Scholar
Mantica, P., Angioni, C., Challis, C., Colyer, G., Frassinetti, L., Hawkes, N., Johnson, T., Tsalas, M., de Vries, P. C., Weiland, J., et al. 2011 A key to improved ion core confinement in the JET tokamak: ion stiffness mitigation due to combined plasma rotation and low magnetic shear. Phys. Rev. Lett. 107 (13), 135004.CrossRefGoogle ScholarPubMed
Mantica, P., Strintzi, D., Tala, T., Giroud, C., Johnson, T., Leggate, H., Lerche, E., Loarer, T., Peeters, A. G., Salmi, A., et al. 2009 Experimental study of the ion critical-gradient length and stiffness level and the impact of rotation in the JET tokamak. Phys. Rev. Lett. 102 (17), 175002.CrossRefGoogle ScholarPubMed
Mavridis, M., Isliker, H., Vlahos, L., Görler, T., Jenko, F. & Told, D. 2014 A study of self organized criticality in ion temperature gradient mode driven gyrokinetic turbulence. Phys. Plasmas 21, 102312.CrossRefGoogle Scholar
Miller, R. L., Chu, M. S., Greene, J. M., Lin-Liu, Y. R. & Waltz, R. E. 1998 Noncircular, finite aspect ratio, local equilibrium model. Phys. Plasmas 5, 979.CrossRefGoogle Scholar
Mishchenko, A., Könies, A. & Hatzky, R. 2009 Global particle-in-cell simulations of fast- particle effects on shear Alfvén waves. Phys. Plasmas 16, 082105.CrossRefGoogle Scholar
Peeters, A. G., Rath, F., Buchholz, R., Camenen, Y., Candy, J., Casson, F. J., Grosshauser, S. R., Hornsby, W. A., Strintzi, D. & Wikl, A. 2016 Gradient-driven flux-tube simulations of ion temperature gradient turbulence close to the non-linear threshold. Phys. Plasmas 23, 082517.CrossRefGoogle Scholar
Pueschel, M. J. & Jenko, F. 2010 Transport properties of finite-$\beta$ microturbulence. Phys. Plasmas 17, 102310.CrossRefGoogle Scholar
Pueschel, M. J., Kammerer, M. & Jenko, F. 2008 Gyrokinetic turbulence simulations at high plasma beta. Phys. Plasmas 15 (10), 102310.CrossRefGoogle Scholar
Qiu, Z., Chen, L. & Zonca, F. 2016 Effects of energetic particles on zonal flow generation by toroidal Alfvén eigenmode. Phys. Plasmas 23 (9), 090702.CrossRefGoogle Scholar
Rath, F., Peeters, A. G., Buchholz, R., Grosshauser, S. R., Migliano, P., Wikl, A. & Strintzi, D. 2016 Comparison of gradient and flux driven gyro-kinetic turbulent transport. Phys. Plasmas 23, 052309.CrossRefGoogle Scholar
Romanelli, M., Zocco, A., Crisanti, F. & JET Contributors 2010 Fast ion stabilization of the ion temperature gradient driven modes in the Joint European Torus hybrid-scenario plasmas: a trigger mechanism for internal transport barrier formation. Plasma Phys. Control. Fusion 52, 045007.CrossRefGoogle Scholar
Sheng, H., Waltz, R. E. & Staebler, G. M. 2017 Alfvén eigenmode stability and critical gradient energetic particle transport using the Trapped-Gyro-Landau-Fluid model. Phys. Plasmas 24, 072305.CrossRefGoogle Scholar
Staebler, G. M., Howard, N. T., Candy, J. & Holland, C. 2017 A model of the saturation of coupled electron and ion scale gyrokinetic turbulence. Nucl. Fusion 57 (6), 066046.CrossRefGoogle Scholar
Staebler, G. M., Kinsey, J. E. & Waltz, R. E. 2005 Gyro-Landau fluid equations for trapped and passing particles. Phys. Plasmas 12 (10), 102508.CrossRefGoogle Scholar
Staebler, G. M., Kinsey, J. E. & Waltz, R. E. 2007 A theory-based transport model with comprehensive physics. Phys. Plasmas 14 (5), 055909.CrossRefGoogle Scholar
Tardini, G., Hobirk, J., Igochine, V. G., Maggi, C. F., Martin, P., McCune, D., Peeters, A. G., Sips, A. C. C., Stäbler, A., Stober, J., et al. 2007 Thermal ions dilution and ITG suppression in ASDEX Upgrade ion ITBs. Nucl. Fusion 47, 280287.CrossRefGoogle Scholar
Vannini, F., Biancalani, A., Bottino, A., Hayward-Schneider, T., Lauber, P., Mishchenko, A., Novikau, I. & Poli, E. 2020 Gyrokinetic investigation of the damping channels of Alfvén modes in ASDEX upgrade. Phys. Plasmas 27 (4), 042501.CrossRefGoogle Scholar
Waltz, R. E., Kerbel, G. D. & Milovich, J. 1994 Bulk ion heating with ICRF waves in tokamaks. Phys. Plasmas 1, 2229.CrossRefGoogle Scholar
Whelan, G. G., Pueschel, M. J. & Terry, P. W. 2018 Nonlinear electromagnetic stabilisation of plasma microturbulence. Phys. Rev. Lett. 120, 175002.CrossRefGoogle Scholar
Zonca, F. & Chen, L. 2014 Theory on excitations of drift Alfvén waves by energetic particles. II. The general fishbone-like dispersion relation. Phys. Plasmas 21 (7), 072121.CrossRefGoogle Scholar
Zonca, F., Chen, L., Briguglio, S., Fogaccia, G., Milovanov, A. V., Qiu, Z., Vlad, G. & Wang, X. 2015 Energetic particles and multi-scale dynamics in fusion plasmas. Plasma Phys. Control. Fusion 57 (1), 014024.CrossRefGoogle Scholar
Zonca, F., Chen, L., Dong, J. Q. & Santoro, R. A. 1999 Existence of ion temperature gradient driven shear Alfvén instabilities in tokamaks. Phys. Plasmas 6 (5), 19171924.CrossRefGoogle Scholar
Zonca, F., Chen, L. & Santoro, R. A. 1996 Kinetic theory of low-frequency Alfvén modes in tokamaks. Plasma Phys. Control. Fusion 38 (11), 20112028.CrossRefGoogle Scholar
Zonca, F., Chen, L., Santoro, R. A. & Dong, J. Q. 1998 Existence of discrete modes in an unstable shear Alfvén continuous spectrum. Plasma Phys. Control. Fusion 40 (12), 20092021.CrossRefGoogle Scholar
Figure 0

Table 1. Plasma parameters. Here, $T$ denotes the temperature normalized to the electron one, $\omega _{T,n} = a/L_{T,n}$ the normalized logarithmic temperature and density gradients, $R_0$ the major radius, $a$ the minor radius, ${s} = (\rho _\textrm {tor}/q)(\textrm {d} q/ \textrm {d}\rho _\textrm {tor})$ the magnetic shear, $\rho ^*_i = \rho _s / a$ and $\beta _e = 8 {\rm \pi}n_e T_e / B_0^2$ the ratio between the thermal electron and magnetic pressure.

Figure 1

Figure 1. Time-averaged nonlinear (a) main-ion and (b) electron heat fluxes in gyro-Bohm units ($Q_{gB} = T_i^{2.5}n_i m_i^{0.5}/e^2 B_0^2 R_0^2$) for $\beta _e = 0$ (blue line) and $\beta _e = 0.012$ (red line) in simulations without energetic particles.

Figure 2

Figure 2. Nonlinear (a) main-ion, (b) electron and (c) fast-ion heat fluxes in gyro-Bohm units ($Q_{gB} = T_i^{2.5}n_i m_i^{0.5}/e^2 B_0^2 R_0^2$) for $\beta _e = 0$ (blue line) and $\beta _e = 0.012$ (red line) at $T_f / T_e = 9.8$.

Figure 3

Figure 3. Fourier spectra of $\phi _1(\omega ,k_y\rho _s)$ at $\beta _e = 0$ (a,b) and $\beta _e = 0.012$ (c,d), retaining (a,c) or neglecting (b,d) the energetic particle species. The electrostatic potential has been averaged over the radial mode number $k_x \rho _s$, field-aligned coordinate $z$ and in the time domain $t [c_s/a] = [50\text {--}350]$. The amplitude of the signal is plotted on a logarithmic scale.

Figure 4

Figure 4. Nonlinear electrostatic (blue) and electromagnetic (red) component of the (a) main-ion, (b) electron and (c) fast-ion heat fluxes in gyro-Bohm units ($Q_{gB} = T_i^{2.5}n_i m_i^{0.5}/e^2 B_0^2 R_0^2$) for $\beta _e = 0.013$ (linearly unstable high-frequency mode).

Figure 5

Figure 5. Linear growth rates (a) and frequencies (b) of the dominant and subdominant modes for different $\beta _e$ at $k_y \rho _s = 0.1$ and $T_f/T_e = 9.8$. The vertical black line in panel (a) denotes the $\beta _e$ value marking the transition from ITG to the TAE.

Figure 6

Figure 6. Linear growth rates (a) and frequencies (b) of the TAE for different $\beta _e$ and energetic-particle temperature at $k_y \rho _s = 0.1$.

Figure 7

Table 2. Parameters for the ITPA benchmark case (Mishchenko et al.2009; Könies et al.2018) at $\rho _{\textrm {tor}} = 0.5$. Here, $T$ denotes the temperature normalized to the electron one, $\omega _{T,n} = a/L_{T,n}$ the normalized logarithmic temperature and density gradients, $R_0$ the major radius, $a$ the minor radius, ${s} = (\rho _\textrm {tor}/q)(\textrm {d} q/ \textrm {d}\rho _\textrm {tor})$, $\rho ^*_i = \rho _s / a$ the magnetic shear and $\beta _e = 8 {\rm \pi}n_e T_e / B_0^2$ the ratio between the thermal electron and magnetic pressure.

Figure 8

Figure 7. Comparison of energetic-particle-driven TAE (a) growth rates and (b) frequencies as functions of $n_f$ at fixed fast particle temperature $T_f = 0.4$ MeV, and (c) growth rates and (d) frequencies for varying temperature but fixed $n_f = 7.5 \times 10^{16}\ \textrm {m}^{-3}$. The global code results and reference parameters are taken from Mishchenko et al. (2009) and Könies et al. (2018); the GENE flux-tube simulations have been performed at $\rho _{\textrm {tor}} = 0.5$. The vertical black line in panels (a) and (b) marks the energetic-particle density for which $\beta _f = \beta _{\textrm {thermal}}$.

Figure 9

Figure 8. (a) Time-averaged nonlinear main-ion heat fluxes in gyro-Bohm units for different values of $T_f / T_e$ at $\beta _e = 0.006$. (b) Frequency spectra of $\bar {\phi }_1$ – averaged over $k_x \rho _s$ and $z$ – for $T_f/T_e = 1$ (blue line) and $T_f/T_e = 13$ (red line) at $k_y \rho _s = 0.1$ and $\beta _e = 0.006$ in the time range $[50\text {--}340] a / c_s$. The red line in panel (a) represents the best linear fit of the nonlinear GENE results. The dotted lines indicate the fit uncertainties.

Figure 10

Figure 9. (a) Time-averaged nonlinear main-ion heat fluxes in gyro-Bohm units for different values of the fast-ion logarithmic temperature gradient $\omega _{T,f}$ at $\beta _e = 0.009$. (b) Frequency spectra of $\bar {\phi }_1$ – averaged over $k_x \rho _s$ and $z$ – for $\omega _{T,f} = 0$ (blue line) and $\omega _{T,f} = 1.5$ (red line) at $k_y \rho _s = 0.1$ and $\beta _e = 0.009$ in the time range $[50\text {--}340] a / c_s$. The red line in panel (a) represents the best linear fit of the nonlinear GENE results. The dotted lines indicate the fit uncertainties.

Figure 11

Figure 10. (a) Time-averaged nonlinear main-ion heat fluxes in gyro-Bohm units for different values of the fast-ion logarithmic density gradient $\omega _{n,f}$ at $\beta _e = 0.009$. (b) Frequency spectra of $\bar {\phi }_1$ – averaged over $k_x \rho _s$ and $z$ – for $\omega _{n,f} = 0$ (blue line) and $\omega _{n,f} = 6$ (red line) at $k_y \rho _s = 0.1$ and $\beta _e = 0.009$ in the time range $[50 \text {--} 340] a / c_s$. The red line in panel (a) represents the best linear fit of the nonlinear GENE results. The dotted lines indicate the fit uncertainties.

Figure 12

Figure 11. (a) Time-averaged nonlinear main-ion heat fluxes in gyro-Bohm units for different values of the safety factor $q$ and $\beta _e$. (b) Frequency spectra of $\bar {\phi }_1$ – averaged over $k_x \rho _s$ and $z$ – for $q = 1.2$ (blue line) and $q = 1.7$ (red line) at $k_y \rho _s = 0.1$ and $\beta _e \sim 0.006$ in the time range $[50 \text {--} 340] a / c_s$.

Figure 13

Figure 12. (a) Time-averaged nonlinear main-ion heat fluxes in gyro-Bohm units for different values of the magnetic shear $s$ and $\beta _e$. (b) Frequency spectra of $\bar {\phi }_1$ – averaged over $k_x \rho _s$ and $z$ – for $s = 0.1$ (black line) at $\beta _e \sim 0.004$, $s = 0.52$ (red line) at $\beta _e \sim 0.0586$ and $s = 0.75$ (blue line) at $\beta _e \sim 0.006$ for $k_y \rho _s = 0.1$ in the time range $[50 \text {--} 340] a / c_s$.

Figure 14

Figure 13. Main ion probability distribution functions (p.d.f.s) and their skewness $s$ and excess kurtosis $k$ as functions of (ac) selected time periods spanning several correlation times (during quasi-steady state phase I at $t_1 = [200 \text {--} 400] a/c_s$, during the transition between phases I and II at $t_2 = [400 \text {--} 500] a/c_s$ and deep in phase II at $t_3 = [500 \text {--} 1200] a/c_s$) and (bd) of $\beta _e$. The different p.d.f.s are normalized to unity.