3.2.1.

Laser parameters

The laser system to be employed for space debris removal can be specified with respect to pulse energy $E_L$, beam diameter $d_s$ at the target position, and fluence profile, which can be chosen as Gaussian or top hat at present. Moreover, for studies on multipulse engagements, the pulse repetition rate $f_{\mathrm{rep}}$ can be defined. Pulse length $\tau$ and wavelength $\lambda$ are not specified in the laser input file but are implicitly considered in the fit parameters for laser–matter interaction, as described below.

3.2.2.

Target shape parameters

For the description of the target shape, simple geometries can be set up by surface elements like rectangles, triangles, and/or spheres. These surface elements are attributed a certain weight, however, they are assumed to be infinitely thin. This approach holds, e.g., for thin plates, wedges, or hollow cylinders, but fails for solid bodies. In the latter case, the target’s mass $m$, the position ${\overrightarrow{r}}_{\mathrm{CMS}}$ of its center of mass as well as the inertia tensor $J$ have to be calculated prior to the simulation as additional input parameters.

Targets that exhibit a more complex geometrical shape can be read from “stl” files that can be generated in CAD software, e.g., SolidEdge or MeshLab, and be found in various databases as well. Basically, this functionality is a large-scale extension of the above-mentioned input of single triangular surface elements. Correspondingly, $m$, ${\overrightarrow{r}}_{\mathrm{CMS}}$, and $J$ have to be specified in a separate xml file as well.

3.2.3.

Interaction parameters

For validation purposes, momentum coupling can be treated in EXPEDIT with a constant value of $c_m$, as shown in Sec. 4.1.1. Nevertheless, the main focus is on the consideration of the fluence dependency of $c_m$, which is done by an empirical function:

Table 1

Fit parameters for the fluence-dependency of the impulse coupling coefficient cm for aluminum, λ=1064  nm, circular polarization, perpendicular incidence. The implementation of the angular dependency cm(ϑ) is scope of further developments of EXPEDIT.

3.2.4.

Simulation control parameters

The control parameters allow the choice of the initial position $\overrightarrow{r}$ of the debris target relative to the laser station, the orientation of the target given in the Eulerian angles $\mathrm{\Phi }$, $\mathrm{\Theta }$, and $\mathrm{\Psi }$ following aircraft conventions, and initial values of the target’s translational velocity ${\partial }_t\overrightarrow{r}$ and angular velocity $\overrightarrow{\omega }$, respectively. Batch scripts for parameter studies with respect to laser and target parameters are provided.

4.1.1.

Code validation

The impact of the target shape on momentum generation has been studied extensively in Ref. 10, yielding analytic solutions for various simple target geometries following the area matrix approach. They serve as a reference for the validation of our numerical approach.

In Fig. 2, the shape-related momentum efficiency is depicted for various setups of beam resolution in EXPEDIT. For the sphere with a diameter of 2 cm, an analytical description of the target geometry provided by simple parameters given in an xml file was chosen, whereas data of target meshing were loaded from an stl file for the cylindrical target having 2 cm in height and diameter. The beam was placed so that it hit the target center precisely. Moreover, the cylinder rotational symmetry axis was orientated perpendicular to the laser beam. For the beam profile, a top hat was chosen, i.e., ${\mathrm{\Phi }}_L=\text{constant}$, and $c_m$ was assumed to be constant as well, i.e., independent from ${\mathrm{\Phi }}_T$.

Fig. 2

Shape-related efficiency ${\eta }_s$ of laser-ablative momentum generation for a cylindrical and a spherical target: Numerical results from EXPEDIT in comparison with the theoretical solution following the area-matrix concept¹⁰ indicated by the horizontal lines.

It can be seen that numerical data are in very good agreement $(\mathrm{\Delta }{\eta }_s)<0.5\%$ with analytical results from Ref. 10 if a sufficiently high beam resolution, $\approx 0.5\mathrm{mm}$ is chosen, which was done in the following calculations. Note that for calculation of ${\eta }_s$, the projected target area was chosen yielding a circular plate with 2-cm diameter for the sphere, but a square with 2-cm edge length for the cylinder. Both are appropriate for this specific investigation since it allows the definition of an effective area $A_{\mathrm{eff}}$ for laser-induced momentum generation with $A_{\mathrm{eff}}={\eta }_s·A_{\mathrm{proj}}$, cf., Ref. 10. Nevertheless, for a real-world laser-debris engagement, a square plate might not be a reasonable reference target.

The required beam resolution can easily be realized on a standard computer: computation time scales linearly with the number of rays, surface elements and laser pulses, and amounted to $4.5\times {10}^6$ interactions between single rays and surface elements per minute on a Linux workstation (Intel^® Xeon^® CPU E5-2670 0, 2.6 GHz, 252.3 GB RAM). With a standard office laptop (Windows 7, X64, Laptop, Intel^® Core™ i7-3720QM 2.6 GHz, 8 GB RAM), calculation time was eight times longer.

4.1.2.

Fluence-related effects

Since beam discretization enables the calculation of a local fluence on each target surface element that is hit by a corresponding ray of the laser beam, the fluence dependency of $c_m$ can be taken into account. The corresponding results for the cylinder discussed above are depicted for three different pulselengths $\tau$ in Fig. 3. For the fluence distribution, again a top hat profile was employed.

Fig. 3

Impulse coupling coefficient and efficiency factor ${\eta }_s$ for laser-ablative momentum coupling for a cylindrical target using fit results for $c_m({\mathrm{\Phi }}_T)$ for various pulselengths, 100 ps, 1 ns, and 10 ns, from hydrodynamic simulations with Polly-2T. Numerical results with EXPEDIT are compared with the analytical solution from Ref. 10, which is indicated by the horizontal line.

It can be seen that for low fluences, the shape-related efficiency is dramatically lower than predicted from the area-matrix approach. This can be ascribed to two effects related to the inclination of the local surface normal to the beam axis: (1) if the local inclination angle $\vartheta$ is rather high, ${\mathrm{\Phi }}_T$ is below the ablation threshold. In that case, this surface element does not contribute to the overall momentum. (2) Even for higher fluences above the ablation threshold, the locally imparted momentum might be significantly smaller than expected if ${\mathrm{\Phi }}_T<{\mathrm{\Phi }}_{\mathrm{opt}}$ is fulfilled. This can be seen from a comparison of the theoretical $c_m$-curves (black in Fig. 3) with the corresponding data from EXPEDIT (brown curves).

If ${\mathrm{\Phi }}_L$ is increased beyond ${\mathrm{\Phi }}_{\mathrm{opt}}$, i.e., where the black curves show their maximum, momentum coupling for the cylindrical target still increases before reaching its maximum at ${\mathrm{\Phi }}_{\mathrm{eff}}>{\mathrm{\Phi }}_{\mathrm{opt}}$, cf., Table. 2. This can be ascribed to the fact that for slightly inclinated surface elements with ${\mathrm{\Phi }}_T>{\mathrm{\Phi }}_{\mathrm{opt}}$, $c_m$ is higher than for areas oriented perpendicular to the laser beam. Hence, the axial momentum loss due to ${\eta }_d(\overrightarrow{r})=\cos \alpha (\overrightarrow{r})=\cos \vartheta (\overrightarrow{r})$ is more or less compensated by the negative slope of $c_m$ at ${\mathrm{\Phi }}_T$. Therefore, ${\eta }_s$ even exceeds the analytical value derived under the assumption of $c_m=\text{constant}$.

Table 2

Optimum fluences for impulse generation on a flat plate (Φopt) and a cylindrical target (Φeff), results from simulations with Polly-2T and EXPEDIT, respectively, material: aluminum, perpendicular incidence, central beam alignment, see text.

4.2.1.

Pointing precision

The occurrence of lateral impulse components can be regarded as a loss of efficiency, which is taken into account by the efficiency ${\eta }_d$ related to impulse direction. Though lateral impulse components might be beneficial, it can be assumed that the orientation of the debris target might not easily be detected at the laser station, and, therefore, the direction of lateral impulse cannot be foreseen either. Moreover, for most of the targets, lateral impulse may be generated when the target is not hit precisely. This can be shown with a simple example.

Figure 4 shows simulation results for a single engagement of a laser pulse, $d_{\mathrm{FWHM}}=50\mathrm{cm}$ beam diameter (Gaussian profile), with a full aluminum sphere of $d=10\mathrm{cm}$ diameter. The scope of the simulation was to investigate the impact of low pointing accuracy; therefore, the offset $\mathrm{\Delta }x$ between beam center and the center of the target was varied in steps of 5 mm between the simulation runs.

Fig. 4

Momentum components $p_{\mathrm{ax}}$, $p_{\mathrm{lat}}$, thrust angle $\alpha$, and momentum uncertainty ${\sigma }_{\alpha }$ for laser-ablative momentum generation on a solid aluminum sphere with $d=10\mathrm{cm}$ diameter by a laser pulse with a spot diameter of $d_{\mathrm{FWHM}}=50\mathrm{cm}$ for various laser pulse energies $E_L$ and pulselengths $\tau$.

It can be seen from the graph that the Gaussian laser profile is approximately mapped by the axial momentum transfer. For fluences far above the ablation threshold, which is especially the case for $E_L=25\mathrm{kJ}$ at $\tau =1\mathrm{ns}$, the beam profile is broadened since surface elements with a high inclination contribute comparatively more to momentum generation, since ${\mathrm{\Phi }}_T$ is closer to ${\mathrm{\Phi }}_{\mathrm{opt}}$ in that case. For low fluences close to the ablation threshold, ${\mathrm{\Phi }}_0$ acts as a cutoff for momentum generation with respect to surface elements exhibiting a high inclination angle.

In contrast, lateral momentum, becomes more relevant the larger the beam offset $\mathrm{\Delta }x$ is. However, its absolute value $|p_{\mathrm{lat}}|$ decreases again for large offset values in a sinusoidal manner due to the decrease of overall momentum of the partially illuminated target. Nevertheless, the main impact of lateral momentum, i.e., the absolute value of the thrust angle $\alpha$, and correspondingly the momentum uncertainty ${\sigma }_{\alpha }=\tan \alpha$, increases with increasing offset. Moreover, the negative slope of $\alpha (\mathrm{\Delta }x)$ indicates that the lateral motion is directed outward, which means that the sphere does not recenter to the laser beam.

4.2.2.

Tracking

Though concave flakes are likely to prevail as space debris,⁴ and might have recentering properties, in contrast to spheres lateral momentum coupling means that tracking of the debris target during a multiple pulse engagement is advisable, if not necessary, in order to prevent that the target leaves the laser beam. For this purpose, it is sufficient to follow the target. Hyperfine pointing within the target surface, as Fig. 4 might suggest, is presumably useless since the highest impact on an irregularly shaped, asymmetric target is not necessarily achieved by a central shot.

To investigate the importance of tracking, a case study with a rather complex, irregularly shaped target was done using a 3-D model of a set of pliers. Astronauts have been known to lose their equipment for extravehicular activities on various occasions, in one case losing an entire toolbox.²² The exact shape of the pliers is not as important as the general information, which can be derived from the results. Figure 5 shows a high-definition version of the model used.²³

Fig. 5

High definition model of a set of pliers taken from Ref. 23.

Multiple-pulse irradiation was simulated assuming a large laser system with $E_L=1.1\mathrm{kJ}$ pulse energy, $f_{\mathrm{rep}}=200\mathrm{Hz}$ repetition rate yielding a laser spot of $d_{\mathrm{FWHM}}=10\mathrm{cm}$ diameter (Gaussian distribution), which overall is a very visionary data input. Moreover, $\tau =500\mathrm{ps}$ was taken for the fluence dependency of $c_m$ (aluminum, $\lambda =1064\mathrm{nm}$), which yields a rather low ablation threshold but may be much more difficult to realize than the same laser system with a pulse length one or two magnitudes larger.

But even under these fortunate conditions, the laser-target engagements yield a poor outcome, cf., Fig. 6: if the target is allowed to move freely, i.e., no tracking is applied, it leaves the laser beam already after 0.66 s of laser operation. This can be attributed to the comparatively large thrust angle, which amounts to $\alpha \approx 13\mathrm{deg}$. This causes a strong lateral motion out of the laser beam. During the remaining time of laser action on the target, a velocity increment of $\mathrm{\Delta }{v}_{\mathrm{ax}}$ $1.15\mathrm{m}/\mathrm{s}$ can be achieved, which is rather small compared to the desired velocity increment of $\mathrm{\Delta }v\approx 150\mathrm{m}/\mathrm{s}$ for LEO debris re-entry.¹⁹

Fig. 6

Trajectory of (a) position and (b) orientation of pliers under repetitive laser irradiation without tracking. Laser parameters: $E_L=1.1\mathrm{kJ}$, $f_{\mathrm{rep}}=200\mathrm{Hz}$. Operation times out after 0.66 seconds due to the lateral motion of the target. Grey lines indicate the projections of the trajectory in the respective coordinate planes.

Summing up over all 131 laser pulses that generated momentum, the effective coupling coefficient in axial direction is far below the experimental data found in the laboratory for a flat plate that can be aligned perpendicular to the beam: the result of $⟨c_{m,z}⟩=0.46\mathrm{mN}/\mathrm{kW}$ is much lower than the typical value of $c_m\approx 20\mathrm{mN}/\mathrm{kW}$ at ${\mathrm{\Phi }}_L=14\mathrm{J}/{\mathrm{cm}}^2$, which yields a combined efficiency of ${\eta }_c\approx 0.023$. This is 1 order of magnitude lower than the estimate assumed in Ref. 11 but can mainly be ascribed to the poor ratio of projected target area to the area of the laser spot.

In order to overcome the time restriction through lateral motion, a tracking option was added to the simulation, realigning the laser before each laser pulse. Again, this assumption is rather optimistic and the employed repetition rate $f_{\mathrm{rep}}=200\mathrm{Hz}$ limits the operational distance to the target to $\mathrm{\Delta }{z}_{\max }=c/2f_{\mathrm{rep}}\approx 750\mathrm{km}$ for active laser tracking.

Under this condition, an arbitrarily long series of laser pulses can be applied in the simulation, which we restricted to 2 min of operation time. The corresponding trajectory of the pliers with two different initial orientations can be seen from Fig. 7(a). Though only a slight change in the initial orientation was applied, the trajectories look significantly different. This extreme sensitivity to the initial conditions is the hallmark of a chaotic system, which is illustrated by the well-known butterfly effect.²⁴ In the absence of efficacious lateral motion, this can be ascribed to the large impact of target orientation, which is evident from the rapid rotation shown in Fig. 7(b).

Fig. 7

Sample trajectories of (a) position and (b) orientation of the pliers with activated tracking for two different initial conditions. For the blue trajectory, a slightly different initial orientation of the target was chosen. Gray lines indicate the projections of the trajectory in the respective coordinate planes and light gray refers to the red trajectory. Laser parameters: see Fig. 6.

Nevertheless, the outcome of the laser engagement is rather similar, yielding a velocity of $\mathrm{\Delta }{v}_z=569\mathrm{m}/\mathrm{s}$ for the red dataset and $558\mathrm{m}/\mathrm{s}$ for the blue one, respectively, and the combined efficiency of the operation is raised to slightly more than 6% in both cases. Moreover, tracking allows the reduction of the thrust angle down to 2.7 deg (red dataset) and even 0.4 deg (blue dataset), respectively.

However, these data are only two examples among a large variety of possible trajectories, which raises the question how to address this uncertainty of momentum and its direction.