3. Results and Discussion

Now, we present and discuss the effect of ion-to-electron mass ratio (m _i/m _e) on the evolution of electron beam-driven instability in plasma. As mentioned above, four cases are considered: A: m _i/m _e = 0; B: m _i/m _e = 1; C: m _i/m _e = 100; and D: m _i/m _e = 1000.

The free energy provided by the kinetic energy of the warm beam triggers the instability in the plasma, and consequently, its energy decreases as seen from Figure 1. All energies are normalized to the initial kinetic energy of plasma electrons, ${\sum }_{ix=1}^{Nx}{\sum }_{iy=1}^{Ny}{n}_e\left(ix,iy,t=0\right){\tilde{E}}_{k,e}\left(ix,iy,t=0\right)$ with ${\tilde{E}}_{k,e}\left(ix,iy\right)$ as the mean kinetic energy of each electron at position (ix, iy). The early time charge separation is totally determined by the background electrons (especially in the case of heavy ions), and as a result, electric field is generated with an amplitude which grows exponentially in the quasilinear regime. In other words, the electrostatic Langmuir waves are excited which propagate mainly along the beam drift velocity with a phase speed greater than the thermal velocity of electrons. Figure 2 plots the Ey component of the electric field in the xy plane, for example, with m _i/m _e = 1000 at times ω _pet = 40 (quasilinear phase) and ω _pet = 85 (saturation phase), which is normalized to $m_e{\omega }_{pe}{v}_{th,e}/e=2.7\times {10}^3\text{V}/\text{m}$ . As seen, nonuniform dipolar electric structures are developed in both x- and y-directions. The Ey amplitude increases 30 times during 40 < ω _pet < 85. According to Figure 2, the wavelength of quasilinear perturbations along the y-direction at ω _pet∼40 is λ/λ _D∼150 which is in good agreement with that predicted by theory [Reference Baumgartel11] as λ/λ _D∼2π V _d,b/V _th,e∼2π × 6 × 10⁷/2.65 × 10⁶ = 142. This is almost the wavelength of the fastest growing mode. Using the temporal variation of electric energy, the growth rate at the quasilinear regime is found to be γ∼0.14 ω _pe as predicted by the theory. As time goes on, instability develops to smaller wavenumbers (larger wavelengths). As these electrical structures develop, most of the low-energy population of beam electrons is trapped within the electric potential structures in a nonlinear process of wave-particle interaction. These structures are called electron holes (or phase-space holes). These nonuniform electric structures exist for longer time scales, while their nonuniformity increases in both directions in a way that the significant component of Ex grows due to the transverse instability in electron holes. Figure 3 demonstrates the temporal variation of Ey at three different locations for the case m _i/m _e = 1000 from which the formation and propagation of long-lived Langmuir wave packets (envelopes or solitons) are evident.

Figure 1: Temporal evolution of beam kinetic energy.

Figure 2: Plot of Ey in the xy plane for ω _pet = 40 (a) and ω _pet = 85 (b) with m _i/m _e = 1000.

Figure 3: The temporal variation of Ey at three different locations for the case m _i/m _e = 1000.

These envelopes are due to the amplitude modulation of Langmuir waves which itself is presumably caused by the nonlinear trapping of beam electrons. They are in the form of a chain of wave packets. Eventually, as seen, these wave packets decay in accordance with the electric energy decrease.

As the beam electrons lose their initial kinetic energy, the distribution function of the beam drifts toward lower mean velocities and flattens the beam velocity distribution to a plateau (not shown here). According to Figure 1, an almost abrupt decrease of beam energy is observed at ω _pet∼50 for all cases except the pair plasma case (B: m _i/m _e = 1), which is due to the satisfaction of the resonance condition by which the phase velocity of excited Langmuir waves is comparable to the beam drift velocity. Therefore, almost 30% of its energy is converted to the electric and kinetic energies of plasma during a short time scale. Since the temporal variation of beam energy at these early times of quasilinear evolution is similar for cases C (m _i/m _e = 100) and D (m _i/m _e = 1000), therefore, the ion dynamics does not play any major role at the early time scales as we expected.

As seen from Figures 4–7, the decrease in kinetic energy of the beam is associated with the increase of kinetic (electron and ion), electric, and, up to a small extent, magnetic energies in the system. To be sure about the conservation of energy, total energy has been monitored continuously, which we found it a constant.

Figure 4: Temporal variation of electric energy for different mass ratios.

Figure 5: Temporal variation of magnetic energy for different mass ratios.

Figure 6: Temporal variation of electron kinetic energy for different mass ratios.

Figure 7: Temporal variation of ion kinetic energy for two mass ratios C and D.

Since the equilibrium magnetic field is zero, the transverse component of the electric field is not generated, so Ez = 0, for all cases. On the contrary, only the transverse component of the perturbed magnetic field is generated, and Bx = By = 0. The excitation of Bz along with Ex and Ey can confirm the possibility of electromagnetic wave emission.

For all cases except m _i/m _e = 0, the amplitude of the electric field increases quasilinearly up to ω _pet∼85. However, in the case of pair plasma, the respective saturation occurs relatively earlier at ω _pet∼72. The decrease of beam energy is associated with flattening of the low-energy side of the initially Maxwellian distribution of beam electrons. Following the complementation of the flattening process and the significant decrease of beam kinetic energy, the condition for Landau damping is satisfied in the system, and as a result, strong interaction between beam electrons and Langmuir waves takes place. Figure 4 shows that the electric energy is minimum when the beam kinetic energy is maximum. As time elapses, the evolution transits into the nonlinear regime where intermittent Landau and inverse Landau damping processes take place between the beam electrons and Langmuir waves. During this interaction, intermittent conversion of beam energy to the electric and kinetic energy of plasma (inverse Landau damping) and vice versa (Landau damping) takes place.

Figures 1 and 4 indicate that, as the ion-to-electron mass ratio increases, the interaction is relatively stronger, and as a result, the amplitude of the electric field of Langmuir waves is larger. An interesting point to mention here is that the time interval between each two Landau (or inverse Landau) damping processes is independent of mass ratio and is on the order of the bouncing (trapping) period, T _b = 2π (m _e/k ₀e E ₀)^1/2∼1.3 × 10⁻⁷ where k ₀ = 2π/λ ₀ = 2π/1.78 and E ₀∼4000 (V/m).

As the beam loses its sufficient energy, the interaction between beam electrons and plasma waves almost stops, and beam’s energy becomes almost constant. Figure 1 shows that the final kinetic energy of the beam is independent of mass ratio. It is noteworthy that, for the pair plasma case, the loss of energy is faster compared to other cases, and the final energy is lower than other cases.

As the instability develops further, for three cases of m _i/m _e = 1, 100, and 1000, the electric energy decreases slowly. The pattern and rate of electric energy decrease are considerably determined by the ion-to-electron mass ratio (see Figure 4). As seen, the rate of energy decrease is slower for larger m _i/m _e. This means that the potential (or electric field) structures are stable for longer time scales as m _i/m _e increases. Since, in the case of m _i/m _e = 0 (no ion component), there is no sign of electric energy decrease and, also, the beam energy is almost constant, one might conclude that the electric energy decrease is inevitably related to the ion dynamics. Looking at Ey structures at these time scales shows that the structures are modified due to the modulation instability. By sufficient weakening of wave-particle interaction, when the amplitude of Langmuir waves is large enough, the ion-acoustic waves are excited in the system with a growing amplitude. This is the phase in which the ion component of plasma plays an important role in the dynamics of the system. Figure 8 presents the temporal variation of ion density for m _i/m _e = 1000 at three locations. The time scale of the significant variation of ion density corresponds to the time scale of electric energy decrease.

Figure 8: Temporal variation of different kinds of energies for m _i/m _e = 1000.

Furthermore, as the electric energy decreases, the kinetic energy of electrons and ions increases and finally saturates (Figures 6 and 7). The final saturation value of electron kinetic energy for m _i/m _e = 1000 is relatively larger than that for the case of m _i/m _e = 100. It seems that the destruction of long-lived Ey structures is totally due to the excitation and growth of ion-acoustic waves. Figure 7 plots the temporal variation of ion kinetic energy (normalized to initial electron kinetic energy) which shows that the rate of kinetic energy increase is faster for m _i/m _e = 100 compared with the case m _i/m _e = 1000. For m _i/m _e = 100 curve, the first increase of energy triggers at ω _pet∼60. This increase is mainly due to acceleration by the significant electric field growth at early times. Figure 8 shows the temporal variation of different kinds of energies which are normalized to the initial total energy and shown in percentage. As seen, the total energy is conserved very well, and the decrease of beam energy is associated with the increase of the electron kinetic and electric field energies. After the decay phase, the kinetic energy of beam electrons and the plasma electrons becomes almost the same. Additionally, the magnetic (pink curve) and ion kinetic (blue curve) energies are almost zero and four percent of the total energy, respectively.

Let us now discuss the generation of fundamental and the second harmonic modes following the interaction of the electron beam with plasma. Figures 9–11 show the dispersion diagram (ω/ω _pe, k _yλ _D) for three cases using the 2D spatial (x, y) and temporal fast Fourier transform (FFT technique) of Ey (x = 4.0, y). Figure 9 shows a strong excitation of Langmuir waves in the fundamental frequency, ω _pe, for k _yλ _D < 0.4 during 0 < ω _pet < 659. Moreover, relatively weak second harmonic, 2ω _pe, of Langmuir waves has been excited at 0.1 < k _yλ _D < 0.4. Also, strong excitation of ion-acoustic waves is observed at ω = ω _pi = 0.03 ω _pe at 0.1 < k _yλ _D < 0.3.

Figure 9: The dispersion diagram of Ey (x = 4.0, y) for m _i/m _e = 1000.

Figure 10: The dispersion diagram of Ey (x = 2.4, y) for m _i/m _e = 100.

Figure 11: The dispersion diagram of Ey (x = 4.0, y) for m _i/m _e = 1.

A similar pattern of the dispersion diagram is observed for the case m _i/m _e = 100 by doing FFT of Ey (x = 2.4, y) at 0 < ω _pet < 378.3.

Interestingly, the dispersion diagram of Ey (x = 4.0, y) with m _i/m _e = 1 at 0 < ω _pet < 534 shows that only the fundamental mode is excited, ω∼1.4 ω _pe = 1.4 ω _pi, at k _yλ _D < 0.1, and there is no sign of the second harmonic generation. One can conclude that the generation of the second harmonic is basically caused by the presence of heavy ions, and therefore, in the absence of the ion component, the second harmonic cannot be observed. This is the confirmation of the fact that the main mechanism for the generation of the second harmonic is the scattering of Langmuir waves by ion-acoustic waves.