3.1. Ion-cyclotron instabilities

An instability with a frequency of approximately 2.2 MHz (figure 3a) was observed in pure hydrogen target plasmas as well as in plasmas with specific hydrogen–deuterium ratios (more on the ratios in § 3.3). The frequency of the instability was close to the ion-cyclotron (IC) frequency of deuterium in the GDT centre (2.74 MHz). Varying the magnetic field strength proportionally changed the instability frequency, confirming its IC nature. The discrepancy $\Delta f$ between the instability and IC frequencies could arise from the local magnetic field strength decreasing due to plasma diamagnetism, as suggested by Turner et al. (Reference Turner, Powers and Simonen1977). However, in our case this is unlikely since during a discharge the instability frequency changes only slightly while the diamagnetic flux changes significantly (see figures 3b, 4a, 4c) and $\Delta f$ exceeds the expected value of $\Delta f/f=1-\sqrt {1-\beta }<0.05$ for the maximum value of $\beta \lesssim 0.1$ in the central plane. Moreover, the Doppler shift of the instability frequency due to the $\boldsymbol {E}\times \boldsymbol {B}$ plasma rotation (${\sim }10$ kHz) can be neglected. The discrepancy could also be explained by the fact that non-local analysis of DCLC modes in a cylindrical geometry (Ferraro et al. Reference Ferraro, Littlejohn, Sanuki and Fried1987) predicts the DCLC to appear at a frequency significantly lower than that of the IC, but proper comparison would require taking into account longitudinal inhomogeneity, the radial distribution of fast ions (which differs from pure Gaussian) and finite beta and finite Larmor radius effects.

Figure 3. Data from a discharge with a 2.2 MHz instability (no. 51035): (a) spectrogram of a magnetic probe signal during an instability evolving in a discharge with a mixed hydrogen–deuterium target ($\langle n_el\rangle =(2.9\pm 0.4)\times 10^{14}\ {\rm cm}^{-2}$, 46 % deuterium mixture). The black line marks the IC frequency of deuterium in the GDT centre; (b) diamagnetic flux signals from the diamagnetic loops; (c) power and ion current fluxes from a bolometer and ion current probe pair on the plasma absorber.

Figure 4. Instabilities evolving in the discharges with a pure deuterium target under (a) moderate plasma density $\langle n_el\rangle = (2.9\pm 0.3)\times 10^{14}\ {\rm cm}^{-2}$ and (b) high plasma density $\langle n_el\rangle = (4.9\pm 0.3)\times 10^{14}\ {\rm cm}^{-2}$; (c,d) corresponding diamagnetic flux signals.

Figure 4(a) illustrates the instability at a frequency of approximately 4.5 MHz that formed in pure deuterium plasmas. As in the previous case, its frequency was proportional to the magnetic field strength, i.e. it also had an IC nature. This instability's frequency was close to both the second harmonic of the deuterium IC frequency in the GDT centre and the IC frequency associated with the magnetic field at the turning points ($R=2$), which was equal to 5.48 MHz.

The 4.5 MHz instability seemed to originate as both an independent instability at the turning point and as a result of nonlinear coupling of the 2.2 MHz instability near the trap centre. Figure 5(c) shows the spectra of three probe (7 on figure 1a) signals that were obtained in a plasma discharge with a pure hydrogen target. If the two instabilities are flute-like in nature, the probes at different locations must be probing the same wave; thus, by the amplitude of the signal their point of origin can be traced. The highest spectral peak at 2.2 MHz belonged to the probe closest to the centre ($R=1.19$), while the highest spectral peak at 4.5 MHz belonged to the probe near the turning point ($R=2.1$). The signal from the probe located near the azimuthal array ($R=1.47$) had the weakest spectrum peaks at both aforementioned frequencies. This can be interpreted as the 4.5 MHz instability principally arising in the vicinity of turning points independently from the 2.2 MHz instability. The instability evolving near the turning point has been observed in Berzins & Casper (Reference Berzins and Casper1987), where its localisation was reliably determined by skewing the neutral beams. It has been demonstrated in Ferron & Wong (Reference Ferron and Wong1984) that several DCLC modes with various frequencies can originate at different points where particle–wave resonance is effective, in particular, in regions with $\boldsymbol {\nabla } B \approx 0$. On the other hand, $b^2$ (calculated from an azimuthal magnetic probe data at $R=1.44$, figure 5d) peaks at $f_{1}=f_{2}\approx 2.2$ MHz, suggesting that it is the nonlinear coupling of the 2.2 MHz instability that is the reason of the additional 4.5 MHz spectrum component formation.

Figure 5. (a) Envelope of the raw magnetic probe signal ($R=1.44$, black line) and envelopes of this signal passed through several band-passes that correspond to the base frequency and its second and third harmonics. (b) Time dependence of the phase in the range of 2–2.5 MHz which includes the base frequency; (c) signal spectra of three magnetic probes installed at different local mirror ratio points (7 in figure 1a); (d) bicoherence squared calculated from a probe signal ($R=1.44$) by averaging 200 time windows with $23\ \mathrm {\mu } {\rm s}$ duration each.

Whenever instabilities formed, simultaneous changes in diamagnetic flux signals were observed (figures 3b and 4c). The drops in the $R=2$ loop signal coincided with rises in other loops signals, especially the central loop ($R=1$). Additionally, simultaneous spikes in power and ion fluxes on the plasma absorber were recorded (figure 3c). This suggests that the instability caused scattering of fast ions (since they are the ones that primarily contribute to the diamagnetic flux signals) and redistributed the diamagnetic pressure along the trap axis, smoothing the maxima of the axial pressure profile.

The instabilities were observed in different discharges with the linear electron density $\langle n_{e}l\rangle$, measured with the dispersion interferometer (9 in figure 1a), ranging from $2.3\times 10^{14}$ to $3.6\times 10^{14}\ {\rm cm}^{-2}$. For a typical discharge with a hydrogen target characterised by a time-averaged (from 5 to 9 ms) value of $\langle n_{e}l\rangle = (2.9\pm 0.2)\times 10^{14}\ {\rm cm}^{-2}$ (from here on out, the provided $\langle n_{e}l\rangle$ values denoted the mean $\pm$ standard deviation on the time interval), figures 6(b) and 6(c) show radial profiles of electron temperature $T_e$ and density $n_e$ obtained with the Thomson scattering diagnostic before and during the instability. During the discharge $T_{e}$ values increased due to NB heating, while the $n_{e}$ profile, that initially peaked near the axis, flattened. Although we cannot infer how the instability affected the plasma parameters specifically and how the plasma density profile change influenced the instability, these data allowed us to determine the conditions in which it exists in the GDT.

Figure 6. (a) Spectrogram of a 2.2 MHz instability registered with an electrostatic probe. Vertical grey lines denote time points at which radial profiles of (b) electron temperature and (c) density were measured.

Increasing the linear plasma density to ${\sim }5\times 10^{14}\ {\rm cm}^{-2}$ by operating the second gas valve allowed us to completely avoid the 4.5 MHz instability in pure deuterium plasmas and almost entirely suppress the 2.2 MHz instability in pure hydrogen plasmas. This observation is in line with what we expect from the DCLC instability, i.e. its being suppressed by increasing the warm ion density, thus filling the loss cone.

High-frequency instabilities were also observed in mixed deuterium–hydrogen plasmas of both moderate and high densities. A pure deuterium discharge is shown in figure 4(b), in which we observed a few harmonics ranging from approximately 25 to 80 MHz in steps of approximately 5 MHz, which was the deuterium IC frequency at the fast ion turning points. These harmonics were also observed in microwave radiation power spectra during the collective Thomson scattering (CTS) diagnostic implementation experiments on the GDT (Shalashov et al. Reference Shalashov, Gospodchikov, Khusainov, Lubyako, Solomakhin and Yakovlev2022). Nonetheless, this instability did not influence the diamagnetic flux (figure 4d) noticeably and thus we did not investigate it further during this study.

An increase in the target plasma density, in combination with the proper tuning of the gas puffing duration, allowed us to raise the power captured by the plasma from the NBI (up to ${\approx }2.5$ MW) as well as the diamagnetic flux (over ${\approx }70$ kMx in the central plane) in a pure deuterium target discharge. Thus, with increased neutral gas puffing, $\beta$ exceeded the stability threshold and the Alfvén ion-cyclotron instability (AICI) formed, which caused fast ions to scatter and limited the diamagnetic flux growth rate. Besides, increased density of the target plasma contributed to the AIC instability's arising because it decreases the Alfvén wavelength and thereby weakens the effect of the longitudinal magnetic field inhomogeneity on stabilisation (Watson Reference Watson1980). At linear density values of $6.0-6.7\times 10^{14}\ {\rm cm}^{-2}$ the 2.2 and 4.5 MHz instabilities were suppressed and only AIC instability developed (more in § 3.4). These values were obtained in pure deuterium targets; as this study was mostly focused on DCLC instability, the influence of target plasma composition on AICI was not investigated.

As shown previously in Zaytsev et al. (Reference Zaytsev, Anikeev, Bagryansky, Donin, Kovalenko, Korzhavina, Lizunov, Lozhkina, Maximov and Pinzhenin2013, Reference Zaytsev, Anikeev, Bagryansky, Donin, Korobeinikova, Korzhavina, Kovalenko, Lizunov, Maximov and Pinzhenin2014), the AIC instability in the GDT develops at the base frequency of 1.3 MHz or less and with the azimuthal wavenumber of $m=1$. In our experiments, using electrostatic probes we observed the same AIC instability being self-correlated during its entire lifetime (approximately 1 ms) and disappearing after NBI ended. Determination of its azimuthal wavenumber, which turned out to be $m=1$, allowed us to verify the signal processing procedure described previously in § 2.4. The following sections show that spatial properties of the 2.2 MHz instability were different from those of the AICI, therefore, the features of the observed AIC instability clearly show that the instabilities at 2.2 and 4.5 MHz have a different nature. Further on, we will refer to the 2.2 MHz and 4.5 MHz oscillations as the DCLC instability since their properties satisfy its description.

3.2. Azimuthal structure of the DCLC instability

For discharges with a pure hydrogen target and the strong 2.2 MHz instability, electrostatic probe signals were processed in steps of $10\ \mathrm {\mu } {\rm s}$ with $30\ \mathrm {\mu } {\rm s}$ windows. Within each window instabilities were distinguished in cross-power spectrum using the detection threshold from Scargle (Reference Scargle1982, expression 18). Phase shifts in the common time–frequency domain among all pairs of the adjacent probes were averaged to plot colour maps displaying normalised azimuthal wavenumbers $m=k_{\varphi }r_{pl}$ within this domain (figure 7a,b).

Figure 7. (a,b) Time dependencies of azimuthal wavenumbers (distinguished by colour) of the 2.2 MHz instability for two discharges with different plasma densities; (c) envelope curves of electrostatic probe signals band-pass filtered between 1.9 and 2.6 MHz (smoothed over $30\ \mathrm {\mu } {\rm s}$) and (d) time evolution of the linear electron density in these discharges; (e,f) distributions of azimuthal wavenumbers for two groups of discharges: (e) the low density $\langle n_{e}l\rangle = (2.2\pm 0.2)\times 10^{14} {\rm cm}^{-2}$ case, (f) the higher density $\langle n_{e}l\rangle = (3.6\pm 0.2)\times 10^{14}\ {\rm cm}^{-2}$ case.

It can be seen that the way the instability develops depended on the target plasma density: at low density $\langle n_{e}l\rangle = (2.2\pm 0.2)\times 10^{14}\ {\rm cm}^{-2}$ the instability started as high-amplitude (figure 7c) narrow-band oscillations with apparent positive azimuthal wavenumbers in the 1–5 range and continued as wider band low-amplitude oscillations with widely spread wavenumbers. At higher density $\langle n_{e}l\rangle = (3.6\pm 0.2)\times 10^{14} {\rm cm}^{-2}$ the instability immediately started as low-amplitude, wide-band oscillations with absolute values of its wavenumbers close to unity. To support these observations, distributions over two groups of discharges, related to either lower density or higher density, are shown in figures 7(e) and 7(f), respectively. Note that the change in how the instability develops in the low density case is not connected to variations in $\langle n_{e}l\rangle$ during a discharge (figure 7d). This change could be caused by modification of the radial warm ion density profile during a discharge that was expected for the DCLC instability and has been observed in Koepke et al. (Reference Koepke, McCarrick, Majeski and Ellis1986) and Ferron & Wong (Reference Ferron and Wong1984).

When the instability began to develop and had a high amplitude at low plasma densities, its wavenumbers were positive, which means that it propagated in the ion diamagnetic drift direction. This feature is compatible with properties of the DCLC instability. However, when the instability evolved at a lower amplitude (especially at high plasma densities), its wavenumbers became partly negative and smaller in absolute values. These features mean a larger scale of the instability spatial structure and propagation in the electron drift direction. The latter is not typical for the DCLC instability, although it has been observed earlier by Turner (Reference Turner1977).

Swift changes in azimuthal wavenumbers (especially between 5.6 and 6.6 ms in figure 7a) agree with our understanding that that the instability evolves as a sequence of separate short oscillations (also seen in figure 5a,b). This might be explained by a build-up of a drift wave by a group of fast ions leading to scattering of the said ions and thus the resonance conditions’ breaking. As the result, the instability decayed, but a new one formed in its place due to the NBI supplying new fast ions. However, the instability did not necessarily scatter the resonant ions. Another mechanism of an instability's intermittence (bursting) was proposed in Ferron & Wong (Reference Ferron and Wong1984). The authors observed the DCLC instability, whose frequency, wavelength, phase velocity and the radial profile of the amplitude all satisfied the resonance conditions and the requirement for the azimuthal wavenumbers to be integer. Since plasma parameters changed, it could be that a dominant saturated mode with a given wavenumber no longer satisfied the requirements, and another one, that did satisfy them, grew to became dominant. The amplitude bursting took place simultaneously at different azimuthally and radially located points, so the plasma was unstable in its entire cross-section. On the contrary, on the same LAMEX machine (Leikind et al. Reference Leikind, Zwi, Dimonte and Wong1985) it was shown that, besides the aforementioned reasons, the instability bursting can be caused by its spatial localisation, with bursts arising when a spatially localised mode passes by the probes as a part of a large-scale convective plasma motion.

In our case, all of these effects could be responsible for the instability bursting. However, it is the scattering of the resonant ions and hence the resonance breaking that is most likely to be the main reason of the bursting, due to high estimated energy of the lost ions (§ 3.5). It is difficult to determine if the other effects were responsible for bursting because of the small size of both probe arrays ($45^\circ$ and $70^\circ$) and because of the ongoing NB injection, whereas in the reported experiments (Ferron & Wong Reference Ferron and Wong1984; Leikind et al. Reference Leikind, Zwi, Dimonte and Wong1985) the instability developed during free decay of plasma.

3.3. The DCLC in plasmas of different compositions

Ion-cyclotron instabilities at frequencies between 2.2 and 5 MHz were observed in discharges with pure hydrogen and deuterium target plasmas as well as in experiments with varying isotopic target plasma compositions. The experimental series with magnetic probe measurements was characterised by $\langle n_el \rangle$ between $2.3\times 10^{14}$ and $3.6\times 10^{14}\ {\rm cm}^{-2}$ (with a mean value of $\langle n_el \rangle = (3\pm 0.4)\times 10^{14}\ {\rm cm}^{-2}$). The edge values of this range correspond to the two target plasma densities used in wavenumber measurements with electrostatic probes. Thus, it would be reasonable to expect similar values of the azimuthal wavenumbers measured by magnetic probes, and indeed, they were mainly distributed between 2 and 6 for both measurements taken by magnetic probes and by electrostatic probes in low density plasmas (figures 8b and 7a). However, negative wavenumbers were almost invisible to the magnetic probes, which could be due to the stricter selection criterion used in their data processing compared with electrostatic probes (see § 2.4).

Figure 8. Properties of the instability at: (a–c) the base frequency of approximately 2.2 MHz, (d–f) the frequencies that are non-multiples of the base frequency: 4.2 MHz (red), 3.8 MHz (black) and 3 MHz (blue) versus deuterium content in the plasma target. For both cases: (a, d) the frequency distributions; (b, e) the normalised azimuthal wavenumber $m$ distributions; (c, f) the distributions of the magnetic perturbation polarisation's $\theta _{r-\varphi }$ normalised by ${\rm \pi}$. All histograms are normalised by total numbers of measurements (in (a) and (d) plots).

The 2.2 MHz instability formed in every discharge until the deuterium content in the target plasma exceeded 54 %. This instability had a narrow enough spectrum to process the probe signals using the technique described in § 2.4. These signals were processed in windows of $5\ \mathrm {\mu } {\rm s}$ to obtain temporal dependencies of the azimuthal wavenumber as well as the perturbations polarisation $\theta _{r-\varphi }$ in the plane almost normal to the magnetic field. The latter is the phase difference between signals from $r$- and $\varphi$-oriented coils of the magnetic probe. The results are shown in figure 8(a–c). The frequency distributions in figure 8a have a wide spread. The reason for this is that these distributions were made using the data from the entire duration of the discharges, thus they were affected by the instability frequency's drifting during the discharge.

The normalised azimuthal wavenumber $m$ ranged from 1 to 7 for all target plasma compositions with values in the 2–5 range dominating in most cases (figure 8b) with no specific time dependence. Thus, we cannot conclude that the azimuthal structure of the instability depended on deuterium content. The unstable waves propagated in the ion diamagnetic drift direction regardless of the target composition.

The polarisation angle distribution was almost uniform and its values were mostly positive in pure hydrogen target plasmas (figure 8c). However, as deuterium content increased, a well-defined maximum became sharper and gravitated to ${\rm \pi} /2$. Since amplitudes of the $r$- and $\varphi$-oriented coils signals near 2.2 MHz are comparable, this means that the registered perturbations had a near-circular polarisation in the radial plane. This, however, is likely not a feature of the instability itself, but could be an effect caused by the probe remoteness from the core plasma, as magnetic perturbations in cold magnetised plasmas must be polarised circularly. The plasma column radius (taken to be the radius of the magnetic surface that touches the inner edge of the radial limiters) was approximately 14 cm in the plane where the probes were located, whereas the probes were located 21 cm away from the axis and immersed in the cold peripheral plasma.

In pure hydrogen target plasmas only the 2.2 MHz instability and its harmonics were observed; however, even with a small added amount of deuterium, instabilities at other frequencies, non-multiples of the base frequency, began to develop. Figure 8(d–f) demonstrates the properties of such instabilities grouped by their frequencies. Most instability azimuthal wavenumber distributions peaked at $m = 3$ or $m = 4$. Such instabilities arose mainly before the 2.2 MHz instability and lasted less time (see figure 6(a) at 6 ms for instance). Azimuthal wavenumbers did not vary significantly while the instabilities developed. The instabilities propagated in the ion diamagnetic drift direction and the magnetic perturbations polarisation distributions had their maxima even closer to ${\rm \pi} /2$ than in the 2.2 MHz case.

The deuterium content threshold under which the 2.2 MHz instability developed was between 54 % and 65 %. Of all DCLC-like instabilities, only the 4.5 MHz frequency and its harmonics remained when the deuterium content exceeded 65 %. Unfortunately, we were unable to determine the azimuthal wavenumbers of the 4.5 MHz instability since the phase shifts between the magnetic probes differed from each other significantly in their values and even in their signs. This could be due to different spatial modes’ superposing as well as due to superposition of modes from both turning points.

3.4. Radial structure of the AIC and DCLC instabilities

Using pairs of radially displaced electrostatic probes (§ 2.3, figure 1e), we measured the radial phase shifts of DCLC and AIC instabilities on the plasma periphery.

The AIC instability amplitude decreased significantly with the distance from the plasma column (figure 9a), however, phase differences between the signals of the third and eighth probes, as well as between the fifth and seventh probes, were discernible. Different axial positions of radially distributed probes could contribute to the phase shift despite the AICI longitudinal wavelength $\lambda _{\parallel }=136\pm 4$ cm (Chen et al. Reference Chen, Bagryansky, Zeng, Zou, Zhang, Wang, Jia, Zhang, Dong and Zha2022) far exceeding the distance between the paired probes along the axis (12 mm). The phase difference due to axial distance was $\varTheta _{\parallel }=0.06$ rad; it was subtracted from the measured differences between the probe signals. The radial wavenumber $k_r$ could be obtained as the average of $(\varTheta _{3, 8}-\varTheta _{\parallel })/1\ {\rm cm}^{-1}$ and $(\varTheta _{5, 7}-\varTheta _{\parallel })/2\ {\rm cm}^{-1}$, however, we chose a different method instead to highlight the discrepancy between phase differences for two probe pairs. We plotted the distributions of these phase differences normalised by the distances between the probes in pairs (figure 9b). The distributions show that we cannot consider the radial structure of the instability to be a single harmonic, i.e. ${\sim }\exp (\mathrm {i}k_{r}r)$, so $k_{r}$ should be understood as an inverted scale of perturbations. Both distributions were fitted with Gaussian curves to obtain the mean and the variance, and these values were used to calculate $k_r$ as the weighted mean: $k_r = 0.11\pm 0.03\ {\rm cm}^{-1}$. The corresponding AICI radial scale is $\lambda _{r} = 57\pm 16$ cm, which significantly exceeds the plasma column radius. Presuming that the same value of $\lambda _r$ is true for inside the core plasma as well, we can conclude that the AIC instability was uniform within the entire plasma cross-section, as proposed in Tsang & Smith (Reference Tsang and Smith1987).

Figure 9. (a) The AIC instability registered with electrostatic probes (numbered according to figure 1e); (b) phase differences normalised by radial spacings between the probes.

Figure 10(a) shows the amplitude drop of the 2.2 MHz instability with distance from the plasma edge. Assuming this to be the DCLC instability, we can consider its $k_\parallel \ll k_\perp$, neglecting the phase shifts between the probes in pairs 5–7 and 3–8 (figure 1e) due to their different axial positions. Figures 10(b) and 10(c) present distributions of phase differences between radially spaced probes in the same discharges as in figures 7(e), 7(f). Figure 10(b) shows results from several discharges with low linear electron density of $(2.2\pm 0.2)\times 10^{14}\ {\rm cm}^{-2}$. Despite double the difference in distances between the probes, both distributions have almost the same mean values of 1.47 and 1.56 rad. Using these values and their corresponding variances, $k_{r}=0.90\pm 0.34\ {\rm cm}^{-1}$ and the corresponding radial scale of the DCLC instability at low densities $\lambda _{r} = 7.0\pm 2.6$ cm were derived. This value is approximately equal to the plasma column radius at the axial position of the probes. Similar distributions obtained for discharges with higher linear density $(3.6\pm 0.2)\times 10^{14}\ {\rm cm}^{-2}$ (figure 10c) had closer-to-zero mean values, so the corresponding $k_{r}$ had to be smaller. The same was valid for $m$ (figure 7f); thus we can conclude that the transverse scale of the instability tended to grow as the plasma density increased.

Figure 10. (a) The 2.2 MHz instability registered with electrostatic probes; phase differences for (b) the low plasma density $\langle n_{e}l\rangle = (2.2\pm 0.2)\times 10^{14}\ {\rm cm}^{-2}$ and (c) the higher plasma density $\langle n_{e}l\rangle = (3.6\pm 0.2)\times 10^{14}\ {\rm cm}^{-2}$ cases.

3.5. Scattered ion energy estimation

Using the plasma absorber diagnostics, we attempted to estimate the energy of lost ions. First, we examined the distribution of power and ion current over the area of the absorber. Plotting the fluxes averaged over each probe wing ($45^{\circ }, 135^{\circ }, 225^{\circ }$ and $315^{\circ }$) showed that the fluxes were independent of a probe's azimuthal angle (figure 11a), as expected due to the axial symmetry of the GDT. There was, however, a noticeable difference in power fluxes at different plasma absorber radii (figure 11b). When the fluxes were averaged over each ring of probes (i.e. over the same radius of the absorber), the highest peaks were observed at the radius of 28.2 cm, which, projected along the magnetic field lines in the GDT, corresponds to the radius of 7.3 cm in the central plane. The second highest peaks were observed at the absorber radius of 16.6 cm (4.3 cm in the central plane respectively); as for outer radii, no such sharp rises were observed. The ion current signals at these radii showed a similar behaviour, with the peaks at $r_{2}=28.2$ cm being the most prominent.

Figure 11. Examples of (a) azimuthal and (b) radial power flux distributions in a plasma discharge.

A numerical simulation of collisionless ion dynamics was carried out to obtain the spatial resolution of the bolometers. In this simulation, the ions were placed inside the bolometer and allowed to fly apart isotropically, backtracking to their possible origins at the centre of the trap. Velocities and flight times of ions that reached the central plane were investigated as well as the radii at which they entered the central plane. The simulation showed that the spatial resolution did not exceed 3.3 cm in the radial direction for ions with 10 keV energies and the direct flight time $\tau _{{\rm flight}}$ from the bolometers to the central plane was found to be approximately $6\ \mathrm {\mu } {\rm s}$.

Presuming the flux increases to be caused by instabilities, we attempted to verify if those losses could be the fast ions scattered from the centre of the trap. Assuming that the peaks of the bolometer signals were caused by scattered fast ion losses alone, we attempted to estimate their energy from the available data. To isolate these losses from the normal operational losses (henceforth referred to as ‘background’ losses), for both the power and ion current flux signals we fit straight lines into the short time period $\tau _{{\rm approx}}$ before the instability formed (figure 12a). These straight lines, meant to simulate the background losses in the absence of the instabilities, were then extrapolated into the regions with the instabilities and deducted from the corresponding signals, bringing the power and ion flux signals to the same baseline. After that, we synchronised the flux signals to a magnetic probe signal with a 1.6–2.4 MHz band-pass filter applied programmatically. The band-passing was performed with the aim of tracking the appearance and growth of the 2.2 MHz instability. Having noticed that the magnetic probe, power and current signals had a similar shape shifted in time, we estimated the time delay $\tau _{{\rm delay}}$ between the instability start and the ions reaching the absorber as the distance between the maxima of the signals (figure 12b). However, $\tau _{{\rm delay}}$ is partially produced by the bolometer's response time of $15\ \mathrm {\mu } {\rm s}$. Additionally, we estimated the instability pulse length time $\tau _{{\rm inst}}$, which was used in the next step of the analysis.

Figure 12. Visual guideline for the procedure used to determine the average energy of lost fast ions: (a) time period $\tau _{{\rm approx}}$ before the instability was fit with a straight line to separate the instability-driven losses from background losses; (b) data were re-plotted with the fit lines subtracted, the magnetic probe signal was overlaid, $\tau _{{\rm inst}}$ and $\tau _{{\rm delay}}$ were determined; (c) graph of $P_{{\rm ring} 2}/J_{{\rm ring} 2}$ was plotted and used to estimate the average energy of the ions lost due to the instability; additional blue lines correspond to the energy of injected neutral beams $E_{{\rm inj}}$ and the average energy of the background losses $E_{{\rm back}}$ calculated over $\tau _{{\rm approx}}$.

By dividing the resultant backgroundless power flux by the backgroundless ion current (figure 12b), we obtained the time dependency of the energy per ion estimate $E_{{\rm ion}}$ (figure 12c). If the bolometer response time was taken into account, even higher estimates of $E_{{\rm ion}}$ would be obtained. Note that the values of the resultant dependency lie below the injected neutral beam's energy $E_{{\rm inj}} = 24$ keV and above the background value of $E_{{\rm back}} = 1.6\pm 0.2$ keV, obtained by averaging the quotient of power by ion current (before subtracting the fit lines) over $\tau _{{\rm approx}}$. The resultant signal was then averaged over $\tau _{{\rm inst}}$, shifted forward from the instability start time by $\tau _{{\rm delay}}$. As the result, we obtained an estimate for the average energy per instability-scattered ion in the discharge. The procedure was repeated for 19 plasma discharges to obtain a range of average energy values. Some discharges, however, had several subsequent instability pulses in them. In these cases, we only analysed the first one, as we were unsure how the first pulse would affect the background flow for the following pulses.

In all the processed discharges, the estimated energy of instability-scattered ions ranged from 4 to 16 keV, with a mean and the standard deviation of $10\pm 4$ keV. These values significantly exceeded the energies of the background losses, comprised mostly of warm ions $E_{{\rm back}}$. In addition, we determined that the average $\tau _{{\rm delay}}$ equalled $41\pm 3\ \mathrm {\mu } {\rm s}$.

We used the obtained results to estimate the transverse energy of the ions appropriate to fulfil the DCLC characteristic condition $k_{\perp }\rho _{i}\geqslant 1$. The majority of lost ions reached the plasma absorber from the central plane radius of $r_{2}=7.3\pm 1.5$ cm with energies in the range of $E_{{\rm ion}}=10\pm 4$ keV. One can expect that the DCLC instability has the highest amplitude at this radius. Using the measured value of $m=4\pm 2$ we obtained $k_{\varphi }=m/r_{2}=0.56\pm 0.30\ {\rm cm}^{-1}$. Thereby, the condition $k_{\varphi }\rho _{i}\geqslant 1$ for the most unstable DCLC branches was satisfied for deuterons with transverse energies exceeding the threshold value ranging from 0.4 to 4.6 keV (depending on the value of $k_{\varphi }$). Taking $k_{r}$ into account (projected to the central plane) gave a value for $k_{\perp }=0.72\pm 0.26\ {\rm cm}^{-1}$ and somewhat different estimations of transverse ion energy: 0.3–1.5 keV.

We also attempted to determine the region of the velocity space from which the ions were lost. Assuming that the instability (characterised by $f=2.2$ MHz and $m=4\pm 2$) resonated with these ions, we evaluated their transverse velocities using

(3.1)\begin{equation} v_{{\perp}} = v_{{\rm phase}} = \frac{\omega}{k_{{\perp}}}=\frac{2{\rm \pi} f r_{2}}{m}, \end{equation}

and then obtained the pitch angle $\theta _{{\rm ion}}$ using $\sin ^2\theta _{{\rm ion}}=m_{D} v^2_{\perp } / 2E_{{\rm ion}}$. The pitch angles of ions leaving the confinement region determined using this method turned out to be in the range of $\theta _{{\rm ion}}=14.7\pm 8.6^\circ$, which is in line with the loss cone angle of $\theta _{lc} = \arcsin (1/\sqrt {R_{\max }}) = 9.9^\circ$. The value of $\theta _{{\rm ion}}$ could be even closer to the loss cone angle if contribution of $k_{r}$ to $k_{\perp }$ was used in the evaluation of $v_{\perp }$. Moreover, the average $\tau _{{\rm delay}}$ between the moments when the DCLC bursts with the highest amplitude and when the power losses spikes for the first time equalled ${\approx }40\ \mathrm {\mu } {\rm s}$. According to simulations, a 10 keV deuteron reaches the absorber in $\tau _{{\rm flight}}\sim 6\ \mathrm {\mu } {\rm s}$. In addition, our pyroelectric bolometer response time is $5\ \mathrm {\mu } {\rm s}$ to register 50 % of an instant power flux pulse and $15\ \mathrm {\mu } {\rm s}$ to register 90 %. Given the period of a single bounce oscillation ${\sim }10\ \mathrm {\mu } {\rm s}$, the ions had to oscillate at least 2 or 3 times before reaching the plasma absorber. It follows that the lost ions had to already be near the loss cone in the phase space to get scattered by the instability in the collisionless regime. Therefore, it is possible that the DCLC-like IC instability developed by interacting with the ions located near the loss cone in the velocity space and eventually scattered them after a short time.

However, this method did not allow us to estimate energies of scattered ions when applied to the AIC instability. In regimes with the AIC instability the target plasma density and its longitudinal particle losses were several times higher than the corresponding density and losses in regimes with the DCLC instability, so the current of lost fast ions could not be discerned well from the background current. Additionally, there was an uncertainty in determining $\tau _{{\rm delay}}$. Direct measurements of the lost ions energy spectrum when AICI evolves were conducted in Anikeev et al. (Reference Anikeev, Bagryansky, Zaitsev, Korobeinikova, Murakhtin, Skovorodin and Yurov2015b).

3.6. Total losses caused by instabilities

Energy and particle fluxes measured by probes on the diagnostic plasma absorber were integrated over its area under the assumption of uniformity of the fluxes within the sectors surrounding each probe. As the result, the total power $P_{{\rm abs}}$ and the total ion current $J_{{\rm abs}}$ of plasma leaving the trap through the western mirror were obtained. As seen in figure 13, both the 2.2 MHz DCLC instability (a) and the AIC instability (b) provoked an almost twofold temporary increase of total power losses and a relatively weak but discernible increase of the total ion current at the moment they arise. After the initial spike, the longitudinal energy losses, assumed to be caused by the DCLC instability, became almost constant but higher by ${\approx }25\,\%$ than they were before the instability onset. In contrast, longitudinal power losses, caused by the AIC instability, increased for approximately 0.4 ms and later returned to the levels that would seemingly be observed in the absence of the instability. This can be interpreted as fast ions with pitch angle close to the loss cone angle being lost. These losses are driven by velocity diffusion of ions arising due to overlapping of $\omega -\varOmega _i=n\varOmega _b$ resonances, where $\varOmega _b$ is the bounce frequency and $n$ is some integer value (Chernoshtanov Reference Chernoshtanov2016, Reference Chernoshtanov2018). Such diffusion can scatter ions away from the vicinity of the loss cone in relatively short times (approximately tens of bounce periods), which are small in comparison with the relaxation time of the fast ion distribution due to Coulomb collisions. In addition, the AIC instability stays coherent over time intervals exceeding 1 ms. These observations correspond to the model in which AICI is excited by one group of ions and leads to anomalous losses of another group of ions (Chernoshtanov Reference Chernoshtanov2016, Reference Chernoshtanov2018) in contrast with the DCLC instability, which is excited by ions near the loss cone and scatters those same ions; after the ions are lost, the DCLC burst decays. However, we cannot be sure that additional energy losses due to AICI stop completely after a short period because the time dependence of losses under the same conditions but without the instability is unknown, as these conditions inevitably lead to the instability forming; the same is true for the case of the DCLC instability.

Figure 13. Total power (black) and ion current (red) measured by the absorber diagnostics synchronised with magnetic probe signals (rescaled for visibility): (a) DCLC-type instability; (b) AIC instability.