2.1. Basic function of BGSs

In the target area of high-power laser drivers, the process of main laser propagation can be simplified as follows: after exiting from the last spatial filter, the main lasers are guided by several mirrors, redirected to meet the angle requirement of the physics experiments, and then shot through the final optics assembly (FOA) to the center of the target chamber, as shown in Figure 2. Thus, the BGS maps the rectangular arrangement at the laser output to a spherical geometry configuration at the target chamber. In addition, all the laser beams share the same light path length (LPL) when they arrive at the target. Furthermore, all reflections at the mirrors in the BGS are in-plane (either S or P) and the incident light must be P polarized. Finally, no obscuring or intersection occurs among laser beams when propagating.

2.2. Fundamental problems of BGS arrangement

Taking six laser beams in Figure 2 as an example, after being redirected by the BGS, they will propagate to the target through six incident ports in the chamber. As shown in Figure 3, the distribution of incident ports is determined by the physics requirement, and the emergence ports are determined by the laser amplifiers. Therefore, the fundamental problem of BGS arrangement involves determining the correspondence between the emergence and incident ports, namely, the $E_{\#}$ and $I_{\#}$ shown in Figure 3, so that all the laser beams can meet the requirements of the physics experiment.

2.3. Typical constraints in BGS modeling

From the viewpoint of laser driver construction, the first constraint is the space of the target area and target chamber. Then, considering the mirror coatings, all incidence angles of each mirror must be less than $45^{\circ }$. Moreover, the number and types of mirrors must be as small as possible so that the BGS will be simple and easy to realize. The final constraint is the total BGS configuration, and the following modeling is based on a U-shaped configuration.

2.4. Multi-beam BGS modeling

Given that the BGS is constructed from several mirrors, analysis of the process of light reflected by a mirror is crucial. As pictured in Figure 4, a light can be expressed as an emergence point and a direction vector. One light travels along the direction vector $s_{0}(a_{0},b_{0},c_{0})$ from an emergence point $P_{0}(x_{0},y_{0},z_{0})$ to a point $P_{0}^{\prime }$ in a mirror, and the length of the light path is $d_{0}$. The propagating matrix can be calculated through Equation (1a), where the vector $s_{0}$ is equal to $s_{0^{\prime }}$. After being reflected by a mirror, whose unit normal vector is $n(A,B,C)$, the emergence point and direction vector of the light become $P_{1}$ and $s_{1}$, respectively. The propagating matrix can be calculated through Equation (1b), where the emergence point $P_{1}$ is equal to $P_{0}^{\prime }$. By combining the two processes, we obtain the transforming matrix from incident light to emergent light after propagating a certain distance and being reflected by one mirror, as shown in Equation (1c), where $A=\sin \,{\it\theta}\,\sin \,{\it\varphi},B=\cos \,{\it\theta},C=\sin \,{\it\theta}\,\cos \,{\it\varphi}$,

(1a)$$\begin{eqnarray}\displaystyle & & \displaystyle \left(\begin{array}{@{}c@{}}x_{0}^{\prime }\\ y_{0}^{\prime }\\ z_{0}^{\prime }\\ a_{0}^{\prime }\\ b_{0}^{\prime }\\ c_{0}^{\prime }\end{array}\right)=M_{1}\left(\begin{array}{@{}c@{}}x_{0}\\ y_{0}\\ z_{0}\\ a_{0}\\ b_{0}\\ c_{0}\end{array}\right)\nonumber\\ \displaystyle & & \displaystyle \quad =\left(\begin{array}{@{}cccccc@{}}1 & 0 & 0 & d_{0} & 0 & 0\\ 0 & 1 & 0 & 0 & d_{0} & 0\\ 0 & 0 & 1 & 0 & 0 & d_{0}\\ 0 & 0 & 0 & 1 & 0 & 0\\ 0 & 0 & 0 & 0 & 1 & 0\\ 0 & 0 & 0 & 0 & 0 & 1\end{array}\right)\left(\begin{array}{@{}c@{}}x_{0}\\ y_{0}\\ z_{0}\\ a_{0}\\ b_{0}\\ c_{0}\end{array}\right),\end{eqnarray}$$

(1b)$$\begin{eqnarray}\displaystyle & & \displaystyle \left(\begin{array}{@{}c@{}}x_{1}\\ y_{1}\\ z_{1}\\ a_{1}\\ b_{1}\\ c_{1}\end{array}\right)=M_{2}\left(\begin{array}{@{}c@{}}x_{0}^{\prime }\\ y_{0}^{\prime }\\ z_{0}^{\prime }\\ a_{0}^{\prime }\\ b_{0}^{\prime }\\ c_{0}^{\prime }\end{array}\right)\nonumber\\ \displaystyle & & \displaystyle \quad =\left(\begin{array}{@{}cccccc@{}}1 & 0 & 0 & 0 & 0 & 0\\ 0 & 1 & 0 & 0 & 0 & 0\\ 0 & 0 & 1 & 0 & 0 & 0\\ 0 & 0 & 0 & 1-2A^{2} & -2\mathit{BA} & -2\mathit{CA}\\ 0 & 0 & 0 & -2\mathit{AB} & 1-2B^{2} & -2\mathit{CB}\\ 0 & 0 & 0 & -2\mathit{AC} & -2\mathit{BC} & 1-2C^{2}\end{array}\right)\left(\begin{array}{@{}c@{}}x_{0}^{\prime }\\ y_{0}^{\prime }\\ z_{0}^{\prime }\\ a_{0}^{\prime }\\ b_{0}^{\prime }\\ c_{0}^{\prime }\end{array}\right),\nonumber\\ \displaystyle & & \displaystyle\end{eqnarray}$$

(1c)$$\begin{eqnarray}\displaystyle & & \displaystyle \left(\begin{array}{@{}c@{}}x_{1}\\ y_{1}\\ z_{1}\\ a_{1}\\ b_{1}\\ c_{1}\end{array}\right)=T\left(\begin{array}{@{}c@{}}x_{0}\\ y_{0}\\ z_{0}\\ a_{0}\\ b_{0}\\ c_{0}\end{array}\right)=M_{2}M_{1}\left(\begin{array}{@{}c@{}}x_{0}\\ y_{0}\\ z_{0}\\ a_{0}\\ b_{0}\\ c_{0}\end{array}\right)\nonumber\\ \displaystyle & & \displaystyle \quad =\left(\begin{array}{@{}cccccc@{}}1 & 0 & 0 & d_{0} & 0 & 0\\ 0 & 1 & 0 & 0 & d_{0} & 0\\ 0 & 0 & 1 & 0 & 0 & d_{0}\\ 0 & 0 & 0 & 1-2A^{2} & -2\mathit{BA} & -2\mathit{CA}\\ 0 & 0 & 0 & -2\mathit{AB} & 1-2B^{2} & -2\mathit{CB}\\ 0 & 0 & 0 & -2\mathit{AC} & -2\mathit{BC} & 1-2C^{2}\end{array}\right)\left(\begin{array}{@{}c@{}}x_{0}\\ y_{0}\\ z_{0}\\ a_{0}\\ b_{0}\\ c_{0}\end{array}\right).\nonumber\\ \displaystyle & & \displaystyle\end{eqnarray}$$

Based on Equation (1c), with only two mirrors, one laser beam can be transported from one point to any other point in any direction without any constraints. However, according to the incident angle and polarization requirements and all the constraints discussed above, the configuration of single-light propagation can be designed in Figure 5. The main lasers emerge from the center point $F$ of the spatial filter and reach the target chamber center $T$ after being reflected by four mirrors $M_{j}\;(j=1,2,3,4)$. Mirror 1 only changes the light path in the $y$ direction and mirror 2 does so in the $x$ direction. The light path from mirror 3 to mirror 4 is at the same altitude, and the projection of the line $M_{4}T$ in the $XZ$ plane is the line $T^{\prime }M_{3}M_{4}$ to ensure that the incident light is P polarized.

Figure 5. Model of a single light guided by a BGS.

The angle between the incident light and the $y$-axis positive direction is defined as ${\it\theta}\;(0\leqslant {\it\theta}\leqslant {\it\pi})$, the angle between the projection of incident light and the $z$-axis positive direction is ${\it\varphi}\;(0\leqslant {\it\varphi}\leqslant 2{\it\pi})$ and the counterclockwise direction is positive. Mirrors 2, 3 and 4 are supposed to be in the same plane ${\it\pi}_{\mathit{layer}}$. The clear radius is defined to be the distance between the target chamber center $T$ and the fourth mirror $M_{4}$ and its length is $r$. In order to avoid obscuring and intersection among the laser beams when propagating, the clear radii of incident light rays with the same ${\it\theta}$ should be equal. In this manner, laser beams with different incident angles will travel in different planes or layers. The model of multiple beams guided by a BGS is plotted in Figure 6, which shows that all lights are arranged in different layers according to their incident angles, and no intersection should occur among the beams in the different layers.

Figure 6. Scheme of different lights guided by a BGS. L11 and L12 possess the same incident angle so they are in plane layer 1. Meanwhile, L21 with a different incident angle is in plane layer 2.

Figure 7. The process of a light propagating a certain distance and being reflected by four mirrors.

According to Equation (1c) and Figure 5, the propagation process can be pictured in Figure 7. Given the original emergence direction vectors and unit normal vectors of the four mirrors in Equation (2a), the expression of each emergence point and direction vector can be calculated with Equation (2b). Because $P_{F}$, ${\it\theta}_{0}$ and ${\it\varphi}_{0}$ are constant variables that are determined by the laser amplifiers and target chamber, supposing that the clear radius $r$ is fixed, then the position of mirror 4, $P_{4}$, and the direction vector $s_{4}$ can be calculated. According to Equation (2c), the distance between two adjacent mirrors and the total LPL can be expressed in Equation (2d),

(2a)$$\begin{eqnarray}\displaystyle & & \displaystyle \left\{\begin{array}{@{}l@{}}a_{f}=0,\quad b_{f}=0,\quad c_{f}=1\\ \displaystyle A_{1}=0,\quad B_{1}=\frac{-\sqrt{2}}{2},\quad C_{1}=\frac{-\sqrt{2}}{2}\\ \displaystyle A_{2}=\frac{\sqrt{2}}{2},\quad B_{2}=\frac{\sqrt{2}}{2},\quad C_{2}=0\\ \displaystyle A_{3}=-\sin \left[\frac{{\it\pi}}{4}+\frac{{\it\phi}_{0}}{2}\right],\quad B_{3}=0,\\ \quad \displaystyle C_{3}=-\cos \left[\frac{{\it\pi}}{4}+\frac{{\it\phi}_{0}}{2}\right]\\ \displaystyle A_{4}=\sin \left[\frac{{\it\pi}}{4}+\frac{{\it\theta}_{0}}{2}\right]\sin [{\it\phi}_{0}],\quad B_{4}=\cos \left[\frac{{\it\pi}}{4}+\frac{{\it\theta}_{0}}{2}\right],\\ \quad \displaystyle C_{4}=\sin \left[\frac{{\it\pi}}{4}+\frac{{\it\theta}_{0}}{2}\right]\cos [{\it\phi}_{0}]\end{array}\right.\end{eqnarray}$$

(2b)$$\begin{eqnarray}\displaystyle & & \displaystyle \left[\begin{array}{@{}c@{}}x_{1}\\ y_{1}\\ z_{1}\\ a_{1}\\ b_{1}\\ c_{1}\end{array}\right]=\left[\begin{array}{@{}c@{}}x_{f}\\ y_{f}\\ d_{F1}+z_{f}\\ 0\\ -1\\ 0\end{array}\right],\quad \left[\begin{array}{@{}c@{}}x_{2}\\ y_{2}\\ z_{2}\\ a_{2}\\ b_{2}\\ c_{2}\end{array}\right]=\left[\begin{array}{@{}c@{}}x_{f}\\ -d_{12}+y_{f}\\ d_{F1}+z_{f}\\ 1\\ 0\\ 0\end{array}\right],\quad \nonumber\\ \displaystyle & & \displaystyle \left[\begin{array}{@{}c@{}}x_{3}\\ y_{3}\\ z_{3}\\ a_{3}\\ b_{3}\\ c_{3}\end{array}\right]=\left[\begin{array}{@{}c@{}}d_{23}+x_{f}\\ -d_{12}+y_{f}\\ d_{F1}+z_{f}\\ -\sin [{\it\phi}_{0}]\\ 0\\ -\cos [{\it\phi}_{0}]\end{array}\right],\quad \nonumber\\ \displaystyle & & \displaystyle \quad \left[\begin{array}{@{}c@{}}x_{4}\\ y_{4}\\ z_{4}\\ a_{4}\\ b_{4}\\ c_{4}\end{array}\right]=\left[\begin{array}{@{}c@{}}d_{23}-\sin [{\it\phi}_{0}]d_{34}+x_{f}\\ -d_{12}+y_{f}\\ -\cos [{\it\phi}_{0}]d_{34}+d_{F1}+z_{f}\\ \sin [{\it\theta}_{0}]\sin [{\it\phi}_{0}]\\ \cos [{\it\theta}_{0}]\\ \cos [{\it\phi}_{0}]\sin [{\it\theta}_{0}]\end{array}\right],\end{eqnarray}$$

(2c)$$\begin{eqnarray}\displaystyle & & \displaystyle \left[\begin{array}{@{}c@{}}x_{4}\\ y_{4}\\ z_{4}\\ a_{4}\\ b_{4}\\ c_{4}\end{array}\right]=\left[\begin{array}{@{}c@{}}d_{23}-\sin [{\it\phi}_{0}]d_{34}+x_{f}\\ -d_{12}+y_{f}\\ -\cos [{\it\phi}_{0}]d_{34}+d_{F1}+z_{f}\\ \sin [{\it\theta}_{0}]\sin [{\it\phi}_{0}]\\ \cos [{\it\theta}_{0}]\\ \cos [{\it\phi}_{0}]\sin [{\it\theta}_{0}]\\ \end{array}\right]\nonumber\\ \displaystyle & & \displaystyle \qquad \quad \!\!=\left[\begin{array}{@{}c@{}}-r_{{\it\theta}_{0}}\sin [{\it\theta}_{0}]\sin [{\it\phi}_{0}]\\ -r_{{\it\theta}_{0}}\cos [{\it\theta}_{0}]\\ -r_{{\it\theta}_{0}}\sin [{\it\theta}_{0}]\cos [{\it\phi}_{0}]\\ \sin [{\it\theta}_{0}]\sin [{\it\phi}_{0}]\\ \cos [{\it\theta}_{0}]\\ \cos [{\it\phi}_{0}]\sin [{\it\theta}_{0}]\end{array}\right],\end{eqnarray}$$

(2d)$$\begin{eqnarray}\displaystyle & & \displaystyle \left\{\begin{array}{@{}l@{}}d_{23}=x_{4}-x_{f}+\sin [{\it\phi}_{0}](z_{f}+d_{F1}-z_{4})/\cos [{\it\phi}_{0}]\\ d_{12}=y_{f}-y_{4}\\ d_{34}=(z_{f}+d_{F1}-z_{4})/\cos [{\it\phi}_{0}]\\ \mathit{LPL}_{\mathit{total}}=d_{F1}(1+\sec [{\it\phi}_{0}]+\tan [{\it\phi}_{0}])\\ \quad +\,x_{4}-x_{f}-y_{4}+y_{f}+(-z_{4}+z_{f})\\ \quad \times \,(\sec [{\it\phi}_{0}]+\tan [{\it\phi}_{0}])+r_{{\it\theta}_{0}}.\end{array}\right.\end{eqnarray}$$

Equations (2c) and (2d) show that all distances and positions in Figure 7 can be expressed as a function of $d_{F1}$, which can be related to the $z$ position of mirror 3. Besides $d_{F1}$, the total LPL is decided by two parts, namely, the position of the emergence ports and the distribution angles of the incident ports. Again, the same conclusion can be obtained from Section 2.2. Therefore, the correspondence relationship between the emergence and incident ports is the core problem that the algorithm needs to solve. Considering that the LPL varies with $P_{3}$, fixing the position of mirror 3 is also necessary.

Figure 8. Feasible region of $P_{3}$: (a) single light (b) two lights.

Figure 9. The emergence ports are divided into three groups according to the incident layers.

Figure 10. The calculation process of the base-line algorithm.

3.1. Feasible region of $P_{3}$ in the XZ plane

The multi-beam BGS model has ensured that there will be no intersection among the layers; in order to avoid intersection among beams in the same layer, the position of $P_{3}$ is constrained in a feasible region. Considering the situation in Figure 8(a), in which only one light exists in the layer, the feasible region of $P_{3}$ is confined by the following conditions. First, as discussed above, $P_{3}$ should be in the projection line segment of $P_{4}T^{\prime }$. Second, considering the sizes of the laser beams and mirrors as the red dotted circle and square marked in the figure and supposing that they equal $D$, then the distance between $P_{4}$ and $P_{2}P_{3}$, $d_{1}$, must be larger than $D$ to ensure that no obstruction exists in the light paths of the laser beams in the same layer. Third, according to the actual physical conditions, the room must be constructed for a diagnostic instrument in the polar areas of the target chamber. Assuming that this room is cylindrical with the radius $L$, all lights and mirrors must be situated outside of this cylinder, that is, the distance between $P_{3}$ and $T^{\prime }$ should be larger than $L+D$. All three conditions are listed in Equation (3a). In this manner, the feasible region of $P_{3}$, in which two lights are in the same layer as shown in Figure 8(b), can be found from Equation (3b),

(3a)$$\begin{eqnarray}\displaystyle \left\{\begin{array}{@{}l@{}}|x_{3}|<|x_{4}|,\quad x_{3}<0,\quad z_{3}=x_{3}\cot {\it\varphi}\\ \sqrt{x_{3}^{2}+z_{3}^{2}}=|x_{3}/\sin {\it\varphi}|>L+D\\ |z_{3}|<|z_{4}|,\quad z_{3}>0,\quad d_{1}=|z_{3}-z_{4}|>D\end{array}\right. & & \displaystyle\end{eqnarray}$$

(3b)$$\begin{eqnarray}\displaystyle \left\{\begin{array}{@{}l@{}}|x_{3}^{\prime }|<|x_{4}^{\prime }|,\quad x_{3}^{\prime }<0\\ |z_{3}^{\prime }|<|z_{4}^{\prime }|,\quad z_{3}^{\prime }>0,\quad d_{1}^{\prime }=|z_{3}^{\prime }-z_{4}^{\prime }|>D\\ |z_{3}^{\prime }|>|z_{4}|,\quad d_{2}=|z_{3}^{\prime }-z_{4}|>D\\ z_{4}^{\prime }=x_{3}^{\prime }\cot {\it\varphi},\quad |x_{3}^{\prime }/\sin {\it\varphi}^{\prime }|>L+D.\end{array}\right. & & \displaystyle\end{eqnarray}$$

3.2. Base-line algorithm

We take NIF as an example to interpret the algorithm. The incident ports are distributed in the target chamber at four altitudes, namely, $23.5^{\circ },30^{\circ },44.5^{\circ }$ and $50^{\circ }$^{[Reference Bell, Di Nicola, Grim, Kalantar, McCarville, Klingmann, Alvarez, Lowe-Webb, Lawson, Datte, Danforth, Schneider, Di Nicola, Jackson, Orth, Azevedo, Tommasini, Manuel and Wallace15]}. The clear radius $r$ is properly selected to render the lights incident to the ports at $23.5^{\circ }$ and $30^{\circ }$ in the same layer. The target chamber is divided into four parts, namely, top, bottom, left and right. Then, in each section of the target chamber, the incident ports are distributed in three layers with four ports. In addition, the emergence ports are divided into three groups according to the incident layers, as shown in Figure 9. Consideration of the corresponding relations of the four lights in the same layer is unnecessary. $P11$ is connected to $B11,P12$ to $B12,P13$ to $B13$ and $P14$ to $B14$. In the base-line algorithm, the corresponding relations are fixed, whereas the positions of the emergence ports are variables. The core of the base-line algorithm is to adjust the relative positions of emergence ports to ensure equal LPLs among all beam quads. In this way, the correspondence between the emergence and incident ports is transformed to the calculation of the positions of all the emergence ports, which will make construction and calculation of the model much easier.

The detailed process is illustrated in Figure 10. Taking the first layer as an example, a base-line $BL01$ is defined for this layer, and then the distances between the base-line and the center of each beam quad are designated as $Dq1i\,(i=1,2,3,4)$. The LPLs of the four lights are calculated, and the different $Dq1i$ are adjusted to ensure the same path length $d1$ for all of them. By this method, the shared path lengths in the second and third layers will be $d2$ and $d3$. What should be noticed is that the shared LPL of the layer varies with the base-line of the layer. By comparing the three shared LPLs, $d1,d2$ and $d3$, and adjusting the base-lines of the respective layers, then the 12 beam quads in the same group will all share the same LPL. Given that $BL0j$ and $Dqji\,(j=1,2,3;i=1,2,3,4)$ are all fixed, the actual position of the center of the 12 quads can be calculated. Then, the quads can be combined and the distribution of the emergence ports in this part can be obtained.

According to the base-line algorithm, the BGS of a 192-beam-line laser driver is arranged. Figure 11 shows the right and bottom parts of the target area, whereas the whole BGS is plotted in Figure 12.

Figure 11. The calculated arrangement of the BGS in the right and bottom parts of the target area.

Figure 12. The whole BGS of a 192-beam-line laser driver.

Comparing the calculated BGS arrangement with the NIF BGS, the calculated LPL varies from 57.2 to 63.6 m, which is considerably shorter than that of NIF, which varies from 69.7 to 81.7 m^{[Reference Miller, English, Korniski and Rodgers10]}. Considering the radiation shielding that is built in the target area, as shown in Figure 13, the first two mirrors in each beam line must be outside, causing a longer LPL at NIF. Besides the LPL, the BGS arranged through the base-line algorithm is very similar to the real NIF BGS. The base-line algorithm provides the possibility of avoiding heavy calculations of the corresponding relations. Thus, the arrangement of the BGS of a laser driver is simple and efficient.