2.1. Initial TNSA Acceleration Phase

At an earlier time, the ion acceleration follows the TNSA mechanism. Hot electrons generated by the conversion of the laser on the front surface of the target propagate through the target and form a sheath on the rear target surface. After an initial transient phase, this sheath evolves to a quasi-steady-state associated with the two-temperature (cold background and laser-heated hot electron component) electron plasma, consistent with that examined previously (Passoni & Lontano, 2004; Passoni et al., 2004). Thick target foils experience an extended period of TNSA. In thin foils, the early-time sheath structure shown in Figure 1 (and found in all of the simulations at the target thicknesses considered) is arrested by enhanced TNSA and, later, the break-out afterburner (both described below). An important feature of the early TNSA phase is the presence of a dense, cold electron component within the target that provides the dominant source of return current to the laser conversion region, and which prevents significant penetration of the laser into the foil. The acceleration of ions during this phase is modest compared with that of the later stages of the acceleration. In Figure 1, the carbon ion energy during this phase is only of order M_C c²(5 × 10⁻⁵) ∼ 0.6 MeV for the thin targets. Obviously, TNSA in thicker (∼10 micron) targets can produces ions of much higher peak energy than this; the advantage of using thin targets is manifest in the later stages.

Electric field and ion momentum during the TNSA phase of the ion acceleration for a simulation in which the target is a carbon foil of thickness 30 nm and the peak laser intensity is 1021 W/cm2. The left panel shows the longitudinal (Ex) component of the electric field (black curve). The field exhibits a ponderomotive region at the front surface (the peak located at 19.5 microns) and a modest sheath field (x > 20.5 microns) at the rear target surface. This sheath provides the TNSA. The laser field (arb. units) is shown in red. In the right panel, ion momentum vs. position are shown.

2.2. Enhanced TNSA Phase

In very thin targets, when a sufficient fraction of the cold electrons is promoted to hot, the physics changes, as shown in Figure 2. We call this phase “enhanced TNSA.” In the top panel, the electrostatic field E_x is shown with the laser field E_y at tω_pe = 4920, with units for each as in Figure 1. At this time, the plasma, although still overdense, has the electron skin depth comparable to the target thickness (this is shown in the figure by the penetration of the finite-amplitude transverse electric field into the target). This condition arises for two reasons: first, as the laser heats the cold electrons in the foil, an increasing number of electrons are expelled to the sheath at the rear of the target, so fewer electrons remain within the foil, and ω_pe decreases within the target. Second, the electrons are heated by the laser to highly relativistic speeds, which lowers the plasma frequency by approximately a factor 〈γ〉^−1/2, with 〈γ〉 the mean relativistic gamma parameter.

Electric field and ion momentum during the enhanced TNSA phase of the same simulation shown in Fig. 1. The skin depth within the target has become comparable in size to the target thickness. The ponderomotive force imparted by the laser field (Ey: red curve, upper panel, in arb. units) augments the sheath field on the rear target surface (Ex: black curve, upper panel) and produces a period of enhanced ion acceleration (bottom panel).

During the enhanced TNSA phase, the attenuated but finite oscillating laser field in the target imposes a ponderomotive drive to all of the electrons within the target. This modifies the profile of the longitudinal field by introducing at the rear surface, in addition to the sheath field, a spiky component in the center of the target associated with the ponderomotive drive of the laser (see the spike in the E_x field in the top panel of Fig. 2). This results in an increased conversion efficiency of the laser into hot electrons. Moreover, the entire layer of electrons within the target oscillates in the laser field, which very rapidly heats the electrons. After a brief time interval (Δt < 28 fs—the time between the two snapshots in Figs. 1 and 2), essentially no cold electrons remain: all have been promoted to highly relativistic energies by their interaction with the laser.

The electric field experienced by the ions (see the lower panel), which is a combination of space-charge separation from the sheath and ponderomotive drive from the laser, is considerably larger than experienced during the TNSA phase. Moreover, in sufficiently thin targets, the ions accelerate as a solitary bunch peaked around a well defined mean energy. This characteristic is reminiscent of the monoenergetic ions measured by Hegelich et al. (2006), but without the requirement of a complex, multi-component target. In Figure 2, the carbon ion energy during this phase is localized around M_C c²(6.2 × 10⁻⁴) ∼ 7.4 MeV.

2.3. Laser Break-Out Afterburner Phase

The laser BOA process is exemplified by the conditions at tω_pe = 7320 in Figure 3, where the laser field E_y and electron phase space distribution for the entire simulation domain are shown (left two panels). At this time, the hot electron plasma expands sufficiently to become underdense to the laser and the laser penetrates the target. The resulting longitudinal electric field is enhanced significantly compared with that of the earlier phases and co-moves with the ions, as shown in the black curve in the upper right panel. During this phase, the ions accelerate into a high energy, quasi-monoenergetic ion beam (bottom right panel). The ion beam shown has energy peaked about 0.022M_C c² ∼ 300 MeV and comprises ∼35% of the ions within the layer (see the inset), with a FWHM of the beam that is approximately 15% of the mean energy. At this time, 4% of the incident laser energy has been converted to the energy of the quasi-monoenergetic ion beam. If realized experimentally, the BOA could represent a substantial improvement in conversion efficiency over the TNSA-based mechanism for generating monoenergetic ions discovered by Hegelich et al. (2006).

Laser field (top left) and electron phase space (bottom left) over the entire simulation domain during the break-out afterburner phase of the same simulation as shown in Fig. 1. The top-right panel is a blow-up of longitudinal (black) and transverse (red, arb. units) electric fields in the region near the ion layer. The bottom-right panel shows ion momentum vs. position.

The origin of the enhanced electric field during this stage is associated with the electron dynamics in the penetrated laser field. The laser interaction with the sheath electrons produces a highly relativistic high-temperature electron beam with mean momentum near the ion layer (at position x ≈ 22 microns) of approximately 20m_e c and p_th/m_e c ∼ 50. As is well known from plasma kinetic theory, conditions of large relative drift between electrons and ions can lead to a Buneman-like instability, suitably generalized here to account for kinetic and relativistic effects. In this case, the electron beam moves with speed ∼ c compared with a relatively slow (non-relativistic) ion beam. Buneman instabilities grow extremely rapidly and act to reduce the relative drift between ions and electrons. The phase velocity of the Buneman instability is resonant with the ions and results in an acceleration and eventual heating of the ions. With the laser drive present, as the electrons lose momentum to the ions, the electrons regain their lost momentum from their interaction with the laser. In this way, the instability may be maintained for a longer period of time before saturation. In this process, the laser and co-moving electron beam efficiently couple momentum from the incident laser field to the ions. An initial study of the wave dispersion spectra obtained from the PIC simulations is consistent with this hypothesis. More detailed analysis of the plasma kinetics underlying the BOA will be provided in a forthcoming article.

To summarize, the three processes: initially, a period of pure TNSA occurs, where the dominant return current is provided by the cold electrons and the laser ponderomotive drive is localized to the front of the target. Then, enhanced TNSA ensues, where the peak laser ponderomotive drive moves into the target and the efficiency with which the laser converts to hot electrons increases; during this phase, essentially all cold electrons are promoted to hot. As the target plasma becomes underdense to the laser, and the penetration of the laser produces strong longitudinal electric fields through a Buneman-like instability which accelerates the ions into a very high energy beam. A comparison of the longitudinal electric fields from the three stages is shown in Figure 4.

A comparison of longitudinal electric field for the three times shown in Figures 1 (black), 2 (green), and 3 (red). During the period when the break-out afterburner is operative, the longitudinal electric field is much larger than the early-time TNSA field and the peak field co-moves with the ions. This large electric field is responsible for the dramatic enhancement in ion acceleration.

2.4. Late-Time Dynamics of Laser Break-Out Afterburner

After the laser penetrates the foil and propagates through the sheath, the nonlinear interaction among the light wave and particles, as well as possibly the relaxation of the ion distribution as the result of the Buneman instability, causes the ion distribution to lose its monoenergetic character and break into a series of “beamlets” of successively decreasing energy. This behavior is shown in Figure 5. The front portion of the ion beam continues to accelerate to higher energy and the highest energy beamlet shown in the figure achieves a peak energy 0.04M_C c² ∼ 700 MeV, albeit with a low number of particles at this energy. The energy spectra, a portion of which is shown in the left panel of Figure 7, evinces this succession of peaks.

Late-time evolution of the laser break-out afterburner for the same simulation as shown in Fig. 1. As the laser penetrates the foil, the quasi-monoenergetic ion beam breaks up into a sequence of beamlets of decreasing energy. The most energetic ions continue to be accelerated to yet higher energy as this phase of the afterburner evolves. At the time shown, the most energetic ions have energy 700 MeV.

At very late time, the beamlet structure of the ion distribution evolves into a Boltzmann-like distribution of ion energies that extends to yet higher energy. In the right panel of Figure 7, carbon ions are promoted to energies of 2 GeV from the nonlinear, late-time action of the BOA. The temperature of the high energy tail of the carbon spectrum is approximately 540 MeV.