2.1 Relativistic birefringence: a kinetic correction to the plasma frequency

In the above presentation, we used a cold-fluid description of the plasma response to the electromagnetic wave. In reality, the electrons are not cold, and relativistic effects will require a modification to the current response of an individual electron based on its initial momentum, as was pointed out by Stark et al. (Reference Stark, Bhattacharjee, Arefiev, Toncian, Hazeltine and Mahajan2015) and further developed by Arefiev et al. (Reference Arefiev, Stark, Toncian and Murakami2020). In general, the Lorentz factor contributes to increasing the inertia of the electrons, which lowers the effective plasma frequency. This effect is akin to relativistic transparency (Kaw & Dawson Reference Kaw and Dawson1970; Siminos et al. Reference Siminos, Grech, Skupin, Schlegel and Tikhonchuk2012), but here it is the general effect of relativistic plasmas, not just the relativistic electron motion induced by the laser. In this subsection, we present the relativistic, kinetic correction to the plasma frequency for a low-amplitude wave.

For an electron subject to a field with vector potential $\boldsymbol {A}_\perp =A_y\hat {\boldsymbol y}$, its corresponding change in momentum would be $\delta {p_y}=eA_y$ due to conservation of transverse canonical momentum. Importantly, this change in momentum is independent of the initial momentum of the electron. However, the velocity response, and thus also the current response, does depend on the initial momentum. Therefore, when calculating the velocity response, we must consider the initial Lorentz factor of the electron, $\gamma =(1+p_x^2+p_y^2+p_z^2)^{1/2}$. Here, and in the rest of this subsection, we use the normalisation $m_{\text{e}}=1=c$, unless stated otherwise.

Small wave amplitudes allow linearisation of the change in velocity $\boldsymbol {v}=\boldsymbol {p}/\gamma$ due to the small momentum perturbation $\delta {p_{y}}$ in the $y$ direction (polarisation direction). The corresponding change in velocity can be expressed as

(2.4)\begin{equation} \delta v_y\approx \delta p_y = \displaystyle{{{\rm d}v_y} \over {{\rm d}p_y}} = = \delta p_y\left( {\displaystyle{{\partial ^2p} \over {\partial v_y\partial p_y}} + \displaystyle{{\partial ^2p} \over {\partial v_y\partial \gamma }}\displaystyle{{\partial ^2p} \over {\partial \gamma \partial p_y}}} \right) = \displaystyle{{\delta p_y} \over \gamma }\left(1-\displaystyle{{p_y^2 } \over {\gamma ^2}}\right). \end{equation}

From this expression, we can note that the corresponding change in velocity depends on the initial momentum and the respective direction of the momentum perturbation.

Next, we obtain the full current response of the plasma by integrating the individual velocity response $\delta {v_y}$ over the electron distribution function $f$,

(2.5)\begin{equation} \delta{j}_{y}={-}e\int {\rm d}^3 {p} \,\delta{v_y}f(\boldsymbol{p}) ={-}e \delta{p_{y}} \int {\rm d}^3 {p}\,\frac{f(\boldsymbol{p})}{\gamma} \left(1-\frac{p_y^2}{\gamma^2}\right). \end{equation}

In particular, we may lift the momentum perturbation $\delta {p}_y=eA_{y}$ outside the integral because the conservation of canonical momentum applies to each electron, regardless of its initial momentum. In the previous calculations, we have used $\hat {\boldsymbol y}$ as the direction of polarisation $\boldsymbol {A}_\perp =A_y\hat {\boldsymbol y}$, but the same calculations can easily be extended to an arbitrary polarisation direction $\hat {\boldsymbol e}$, by replacing all instances of $p_y$ with $\boldsymbol {p}\cdot \hat {\boldsymbol e}$.

Finally, we note that we can obtain the kinetically corrected dispersion relation by replacing the non-relativistic plasma frequency (2.3) with a relativistic plasma frequency

(2.6)\begin{equation} \tilde{\omega}_{\text{p},\hat{\boldsymbol e}}^2=\frac{e^2}{\epsilon_{0}m_{\text{e}}} \int {\rm d}^3 {p}\,\frac{f(\boldsymbol{p})}{\gamma} \left(1-\frac{(\boldsymbol{p}\cdot\hat{\boldsymbol e})^2}{\gamma^2}\right) =\frac{e^2n_{\text{e}}}{\epsilon_{0}\tilde{\gamma}_{\hat{\boldsymbol e}} m_{\text{e}}}, \end{equation}

where $m_{\text{e}}$ has been added back to the prefactor for clarity. The relativistic plasma frequency can then simply be used in the plasma-response term in the wave equation (2.2). In the last step, we also introduced an effective gamma factor, defined by

(2.7)\begin{equation} \tilde{\gamma}^{{-}1}_{\hat{\boldsymbol e}}\equiv\frac{1}{n_{\text{e}}} \int {\rm d}^3 {p}\,\frac{f(\boldsymbol{p})}{\gamma} \left(1-\frac{(\boldsymbol{p}\cdot\hat{\boldsymbol e})^2}{\gamma^2}\right). \end{equation}

The effective gamma factor corresponds to the relative difference between the relativistic and non-relativistic plasma frequencies, $\tilde {\gamma }^{-1}_{\hat {\boldsymbol e}}=\tilde {\omega }_{\text{p},\hat {\boldsymbol e}}^2/\omega _{\text{p}}^2$. If the distribution is not isotropic, then $\tilde {\gamma }_{\hat {\boldsymbol e}}$, and thereby $\tilde {\omega }_{\text{p},\hat {\boldsymbol e}}^2$, are polarisation dependent, hence we can talk about this effect as a ‘relativistic birefringence’.Footnote ²

For thermal distributions at temperatures below approximately $10\ {\rm keV}$, we show in Appendix A, that the relative reduction of the plasma frequency due to the effective gamma factor is only of the order of a few per cent. Therefore, in most experimentally relevant cases, the attosecond dispersion can be said to probe the electron density.

3.1 Calculating phase shifts

The main result that we seek from the PS computation is the dispersion or relative phase shifts of the frequency components of the XUV pulse, which can be measured experimentally. Although the phase $\phi _k(t)$ is encoded in the Fourier spectrum as the complex phase of

(3.3)\begin{equation} \hat{E}_k(t) = |{\hat{E}_k(t)}|\, {\rm e}^{\text{ i}\phi_k(t)} \equiv |{\hat{E}_k(t)}| P_k(t), \end{equation}

it is not trivial to recover $\phi _k(t)$ from $P_k(t)$, because $P_k(t)$ only contains phase information modulo $2{\rm \pi}$. Practically, this makes it nearly impossible to reconstruct the relative phases of two frequency components separated by more than a few steps in the discretised $k$ space.

Instead of analysing $P_k$ directly, we may use $\bar {P}_k(t)\equiv P_{k}(t)\, {\rm e}^{\text{ i}{}\omega _{k}t} = {\rm e}^{\text{ i}[\phi _k(t)+ckt]}= {\rm e}^{\text{ i}\bar \phi _k(t)}$, which will make the phase-shift analysis clearer. This view removes the relative phase shifts due to vacuum propagation, and is equivalent to studying the pulse in a comoving window that moves with the speed of light. Any phase shifts observed in this frame is therefore due to the plasma dispersing the pulse.

As the full information of the relative phase shifts is difficult to extract directly from the complex spectral phase $\bar {P}_k$, some other method is necessary. Fortunately, because we are interested in the relative phases, we can study the change of $\bar {P}_k$,

(3.4)\begin{align} \Delta\bar{P}_k &= \bar{P}_{k+1}-\bar{P}_{k} = {\rm e}^{\text{ i}\bar{\phi}_{k+\Delta{k}}}- {\rm e}^{\text{ i}\bar{\phi}_{k}} = {\rm e}^{\text{ i}\bar{\phi}_{k}}[{\rm e}^{\text{ i}\Delta\bar{\phi}_{k}}-1]\nonumber\\ &= \bar{P}_{k} [{\rm i}\sin(\Delta\bar{\phi}_{k})+\cos(\Delta\bar{\phi}_{k})-1], \end{align}

where the phase variation is $\Delta \bar {\phi }_{k}=\bar {\phi }_{k+\Delta {k}}-\bar {\phi }_{k}$. From (3.4), we can define a related phase-rate variable

(3.5)\begin{equation} \bar{\psi}_k\equiv{-}\frac{\text{ i}\Delta\bar{P}_{k}}{\bar{P}_{k}} =\sin(\Delta\bar{\phi}_{k})+{\rm i}[1-\cos(\Delta\bar{\phi}_{k})]. \end{equation}

This variable is still $2{\rm \pi}$ periodic, but now the periodicity is in $\Delta {\bar {\phi }_{k}}$, which is smaller than the $\pm {\rm \pi}$ window of retrievable information, provided that the spectral resolution $N$ is sufficiently large. We can, therefore, retrieve $\Delta \bar {\phi }_{k}$, with which the properly unwrapped phase $\phi _{k}$ can be reconstructed, up to a constant phase shift.

In an experiment, however, it is the relative group delay of the different frequency components that is measured. The group delay $\tau$ is defined as the rate of phase change, which, in the discrete case, we approximate as

(3.6)$$ \tau \equiv {\rm }\displaystyle{{\partial ^2p} \over {\partial \phi \partial \omega }}\approx \displaystyle{{\Delta \phi _k} \over {\Delta \omega }} = \displaystyle{{\Delta \phi _k} \over {c\Delta k}}\equiv \tau _k. $$

With this, we now have a full tool set for computing the relative group delay of a low-amplitude probe pulse in any given 1D plasma profile $\tilde {\omega }_{\text{p}}^{2}(x;t)$, with minimal numerical dispersion. This tool set can be applied on the output form a PIC simulation to create a synthetic diagnostic for a laser-generated plasma experiment.

4.1 PIC simulation parameters

We used the PIC code Smilei (Derouillat et al. Reference Derouillat, Beck, Pérez, Vinci, Chiaramello, Grassi, Flé, Bouchard, Plotnikov, Aunai, Dargent, Riconda and Grech2018), to generate on-axis profiles of the relativistic plasma frequency $\tilde {\omega }_{\text{p}}^2(x;t)$ from (2.6), which could then be used in the linearised PS wave solver. To this end, we performed two-dimensional (2D), fully collisional (Pérez et al. Reference Pérez, Gremillet, Decoster, Drouin and Lefebvre2012), PIC simulations of a thin plastic foil target irradiated by a circularly polarised pump pulse with wavelength $\lambda _0=800\ {\rm nm}$, peak intensity $1.9{\times }10^{19}\ \text {W\ cm}^{-2}$ (normalised amplitude $a_0=3.0$). The pulse temporal and spatial profiles were both Gaussian with intensity full-width-at-half-maximum (FWHM) duration of $30\ {\rm fs}$ and spot size (waist diameter) of $6\ \mathrm {\mu }{\rm m}$.

The thin-foil plasma studied here has a trapezoidal density profile with a $0.25\ \mathrm {\mu }{\rm m}$ plateau and $25\ {\rm nm}$ linear density ramps on both sides, fully ionised, solid-density polyethylene (${\rm CH}_2$), corresponding to an initial electron density of $n_{0,\text{e}}=177.7 n_{\text{c},0}=3.1{\times }10^{23}{\rm cm}^{-3}$, where $n_{\text{c},0}=\epsilon _{0}m_{\text{e}}\omega _{0}^{2}/e^2$ is the critical density associated with the pump laser frequency $\omega _0$. The plasma was modelled with 120, 30 and 15 macro-particles per cell for the electrons, protons and carbon ions, respectively.

The simulation box was $10\ \mathrm {\mu }{\rm m}$ and $20\ \mathrm {\mu }{\rm m}$ in the $x$ and $y$ directions, respectively, with $4096$ cells in each direction, giving a spatial resolution of $\Delta {x}_{\rm PIC}=2.44\ {\rm nm}$ and $\Delta {y}_{\rm PIC}=4.88\ {\rm nm}$. The target front edge lies at $x=4.5\, \mathrm {\mu }{\rm m}$ from the left edge of the box. Peak on-target intensity occurs at simulation time $t=78.6\ {\rm fs}$. The simulations output a binned quantity corresponding to the relativistic plasma frequency squared $\tilde {\omega }^{2}_{\text{p},\hat {\boldsymbol y}}$ (2.6). In these simulations, $\tilde {\omega }^{2}_{\text{p},\hat {\boldsymbol y}}$ is around $1\,\%$ lower than the non-relativistic plasma frequency squared (2.3). Particles within $\pm 0.5\ \mathrm {\mu }{\rm m}$ from the optical axis were used in the binning, to create the plasma profile used by the PS solver. The longitudinal resolution of the binning was the same as the cell length.

We have chosen the target and laser parameters to illustrate one possible application of the XUV dispersion diagnostics: time-resolving the disintegration of a thin foil when irradiated by the pump pulse. As the electrons are energised by the pump laser, they escape from both the front and back end of the target, which decreases the density on axis. Therefore, by varying a delay between the probe and the pump pulse, the different densities can be inferred from the decrease in dispersion.

As a comparison with the plastic target, we also performed a similar simulation of a $0.1\ \mathrm {\mu }{\rm m}$ thin aluminium foil, with $10\ {\rm nm}$ linear density ramps on each side. The aluminium is taken to be fully ionised at solid density, corresponding to an initial electron density of $n_{0,\text{e}}=449.4 n_{\text{c},0}=7.8{\times }10^{23}\ {\rm cm}^{-3}$, which is very close to $2.5$ times that of the plastic target. The plasma was modelled with 120 and 40 particles per cell for the electrons and aluminium ions, respectively. The other parameters were kept the same as for the plastic target. The comparison with the thicker plastic target is interesting because the initial integrated density, along the optical axis, is the same between the two targets.

4.2 PS simulation parameters

The plasma profiles generated in the PIC simulations are used in the PS solver to accurately and efficiently calculate the dispersion of the probe pulse. Note that the solver takes both spatial and temporal variation into account. In order to get the desired resolution, the PIC output is interpolated in both time and space.

Because of the good numerical accuracy of a spectral solver, the resolution does not have to be much greater than what was used in the PIC simulation. The whole length $L_x=10\ \mathrm {\mu }{\rm m}$ of the PIC-simulation box was discretised with $N=8196$ points (twice that of the PIC simulation), corresponding to a resolution of $\Delta {x}_{\rm PS}=1.22\ {\rm nm}$. This discretisation allows for a maximum wavenumber of $k_{\rm max}={\rm \pi} N/L_x=2.57\ {\rm nm}^{-1}$ (corresponding to a minimum resolved wavelength of $2\Delta {x}_{\rm PS}=2.44\ {\rm nm}$) with a wavenumber resolution of $\Delta {k}=2{\rm \pi} /L_x=6.28\times 10^{-4}\ {\rm nm}^{-1}$. The time resolution was automatically handled in the Runge–Kutta method implemented in the function solve_ivp from SciPy version 1.6.3 (Jones, Oliphant & Peterson Reference Jones, Oliphant and Peterson2001).Footnote ³ In Appendix B, we present some benchmarks of the PS code.

The probe pulse electric field is initialised in real space in the vacuum region near the front of the target. The initial pulse shape has a four-cycle-duration $\cos ^2$ envelope on a centred sinusoidal carrier wave. The central wavelength is $\lambda _1=30\ {\rm nm}$ corresponding to a wavenumber of $k_1=0.21\ {\rm nm}^{-1}$. Note, however, that the shape of the initial pulse is not very important to the dispersion measurement. The pump–probe delay is set by a temporal shift of the $\tilde {\omega }_{\text{p}}^2(x;t)$ profiles from the PIC simulation. When analysing a spectrum from the simulation, it is important that the whole pulse is in vacuum, so that the wavenumber and the frequency spectra are the same. Otherwise, distortions of the spectrum due to the plasma dispersion makes comparisons of spectral data difficult.

With the carrier wavelengths above, the initial target electron densities correspond to $n_{0,\text{e}}\approx 0.25 n_{\text{c},1}$ and $\approx 0.6 n_{\text{c},1}$ for the plastic and aluminium targets, respectively, where $n_{\text{c},1}$ is the critical density for the central frequency $\omega _1=ck_1$ of the probe pulse. As these values are close to unity, there will be a significant portion of the pulse that is reflected. Because the reflected part propagates in the opposite direction, it has a very strong influence on the phase information of the spectrum. It is, therefore, important to filter out the reflected pulse, and only study the spectrum of the transmitted part of the pulse. This filtering is most readily done in real space.

As the PS solver evolves each wavenumber component independently, the group delay incurred for each $k$ component is, in principle, not affected by the initial pulse shape. (There may be some minor effects due to the timing of each component in relation to the plasma evolution, but they would be in order of the ratio of plasma-evolution rate to pulse duration.) However, the initial pulse shape has one important effect on the dispersion analysis. That is, the initial relative group delays. With the choice of a symmetric envelope and symmetric carrier phase, each wavenumber component will have the same vacuum-propagation-corrected spectral phase $\bar {P}_k=0$, i.e. there are no relative group delays in such a pulse. Conversely, if some other probe-pulse shape is used, the observed group delays will be affected by the initial spectral phases of the pulse. For the purposes of a synthetic diagnostic to an experiment, however, one could use the same pulse shape as used in the experiment; the resulting group delay information can then be compared directly with observations.