Full-wave simulation model

The dihedral corner reflector was modeled in FEKO, as illustrated in Fig. 1, for which the dimensions ( $w$ and $l$) can be varied during the simulation. The material selected for the dihedral simulations was a perfect electric conductor with zero thickness for simulation efficiency. The far-field distance of the target can be calculated using $\frac{2D^2}{\lambda}$, where D represents the largest dimension of the target. The dihedral mentioned above has a far field of approximately 40 m.

Two simulation setups were employed, differing in the type of source used. For both setups, the Multilevel Fast Multipole Method solver was used instead of the normal Method of Moments solver, as it shortens the simulation time for the electrically large target, like the dihedral used here. The polarization states of the incident wave for both setups are horizontally polarized. The first setup utilized a plane-wave source, as shown in Fig. 5(a), enabling simulation under strict far-field conditions. This setup was used to analyze the dihedral’s far-field scattering behavior under yaw and pitch misalignment. The second setup addressed a practical limitation: during measurements under 77 GHz, the radar-to-dihedral distance was restricted to 3.6 m, sufficient for achieving far-field conditions for the radar, but insufficient for achieving far-field conditions for a dihedral with fixed dimensions (140 mm in width and 200 mm in length) used during the measurement.

Figure 5. FEKO simulation set-up. (a) Simulation setup 1: Plane wave incidence. (b) Simulation setup 2: Spherical mode source and far-field receiving antenna.

To simulate the near-field effects efficiently, a 1x11 horizontally polarized ideal dipole array was introduced as the source [Reference Ramesan and Madathil23], as depicted in Fig. 6, which mimicks the pattern of the radar under test at the two orthogonal cutplanes around the main lobe and can be replaced by any other 3D pattern data based on the radars or sensing requirements. The element number was selected as a trade-off between simulation accuracy and time. Horizontal polarization was selected to be comparable with the polarization state used in the first simulation setup. The dipole array’s radiation pattern, shown in Fig. 7, offers a wide beamwidth ( $\pm40^o$ at 3 dB) in azimuth and a narrow beam in elevation, a configuration common in automotive sensing [Reference Tinti, Alfageme, Biarge and Pohl6, Reference Yang and Liu24, Reference Zang, Zaman and Yang25], to be comparable with the MIMO automotive radar used in the measurement later. By using the Taylor amplitude tapering to the array, -28 dB sidelobe level and 109 dB cross-polarization isolation were achieved.

Figure 6. An equivalent subarray model with 1x11 dipole array in FEKO, mimicking the pattern of the radar under test in both $\Phi=0^\circ$ and $\Phi=90^\circ$ cuts around the main beam.

Figure 7. Patterns of an equivalent subarray, mimicking the pattern of the radar under test. (a) phi $=0^o$ cut (b) phi $=90^o$ cut

The dipole array’s radiation pattern was first simulated in isolation, with the dihedral absent, and the results were exported as spherical mode (.sph) and far-field (.ffe) files. In the second setup of the dihedral scattering simulation, depicted in Fig. 5(b), the spherical mode file was used as the source, while the far-field file was applied to the receiving antenna. Both the source and receiving antenna were co-located, with their distance from the dihedral adjustable for simulation in both near- and far-field.

The complete flow of simulation, including both simulation setups, is presented in Fig. 8. The simulation was performed on a server equipped with 256 G bytes of RAM and two Intel Xeon-Gold 2.1 GHz/20-core Processors. The time cost for a complete simulation round using the first setup is 3.3 min, while for the second setup, the simulation time increased to 5.7 min. It can be seen that by replacing the plane-wave source with the spherical mode source and the far-field receiving antenna, the simulation time has increased by 72%.

Figure 8. Simulation flow chart

Results of yaw misalignment in far-field

In this subsection, the effect of yaw misalignment for varied dihedral dimensions on dihedral far-field RCS will be discussed. The simulation was divided into four sets:

1. (i) The dihedral was rotated to $90^o$, and the width was fixed at 135 mm. Then, for each length from 50 mm to 180 mm, the RCS was simulated under yaw angles from $0^o$ to $5^o$.

2. (ii) The dihedral was rotated to $90^o$, and the length was fixed at 180 mm. Then, for each width from 50 mm to 180 mm, the RCS was simulated under yaw angles from $0^o$ to $5^o$.

3. (iii) The dihedral was rotated to $0^o$, and the width was fixed at 135 mm. Then, for each length from 50 mm to 180 mm, the RCS was simulated under yaw angles from $0^o$ to $5^o$.

4. (iv) The dihedral was rotated to $0^o$, and the length was fixed at 180 mm. Then, for each width from 50 mm to 180 mm, the RCS was simulated under yaw angles from $0^o$ to $5^o$.

To obtain the general trend of the far-field RCS variation and control the simulation time, a step of $1^o$ was selected for yaw angle scanning from $0^o$ to $5^o$ in all four simulation sets. The scanning steps were then finer in the chosen ranges of yaw angle as shown in Fig. 14 to capture the local details of the far-field RCS variation. The sizes of the dihedral during the simulation were selected to balance the simulation time and the strength of the dihedral backscattered power.

Figure 9 shows the case (i) of simulation results. Despite the dihedral with a larger dimension having a larger RCS at $0^o$ yaw angle, its RCS can drop even to a lower level than the dihedral with a smaller dimension when the yaw angle increases. For example, the dihedral with 110 mm length initially has RCS equal to 25 dB drop, but then drops to 2 dB when the yaw angle increases to $1^o$. In contrast, the initial RCS of the dihedral with 50 mm length is 18 dB, and it only drops 3 dB after the yaw angle increases to $1^o$. Therefore, when the dihedral is rotated to $90^o$, its RCS dependency on the change of yaw angle strongly varies with the change of length of the dihedral.

Figure 9. $90^o$ rotated Dihedral RCS simulation under different yaw angles and varying dihedral length.

The case (ii) of simulation results is shown in Fig. 10. When the dihedral is rotated to $90^o$, compared with varying dihedral length, the change in dihedral width does not affect the dependency between the RCS variation and the yaw angle. Instead, the increase in dihedral width only affects the overall RCS. The cases (iii) and (IV) of simulation results are shown in Fig. 11 and Fig. 12. It is observed that when the dihedral is rotated to $0^o$, either length or width variation will not affect the dependency of the change of RCS on the varying yaw angle. And now the RCS has become stable under the yaw angle misalignment (both near and far field compatible).

Figure 10. $90^o$ rotated Dihedral RCS simulation under different yaw angles and varying dihedral width.

Figure 11. $0^o$ rotated Dihedral RCS simulation under different yaw angles and varying dihedral length.

Figure 12. $0^o$ rotated Dihedral RCS simulation under different yaw angles and varying dihedral width.

Figure 13 illustrates the simulated far-field scattering patterns of a dihedral rotated by $90^o$ ( $\theta_r=90^o$) for different dihedral lengths. When observed at $0^o$ azimuth, the RCS consistently increases with the dihedral length. However, in the presence of yaw misalignment, as depicted in Fig. 13(b), the RCS at $0^o$ azimuth is influenced by the side lobes and nulls in the dihedral’s scattering patterns. These variations in the side lobes and nulls are directly reflected in the changes in RCS due to yaw misalignment.

Figure 13. Dihedral scattering pattern under varying dihedral length and $\theta_r=90^o$. (a) $\theta_y=0^o$ (b) $\theta_y=1^o$

In order to further investigate the influence of the yaw angle on the RCS variation when the dihedral is at $90^o$, Fig. 14 shows the same results as Fig. 9 but with $0.1^o$ simulation step of yaw angle between $0^o$ to $1^o$ and $2^o$ to $3^o$. After simulating with $0.1^0$ yaw angle step, the RCS variation oscillation can be observed between $0^o$ to $1^o$ and $2^o$ to $3^o$ yaw angles. By utilizing the null positions among those oscillations, initial misalignment correction between the radar and the dihedral can be done to avoid no backscattering signal at the null positions, even for an electrically large target.

Figure 14. $90^o$ rotated Dihedral RCS simulation under different yaw angles and varying dihedral length (with $0.1^o$ yaw angle step between $0^o$ to $1^o$ and $2^o$ to $3^o$).

Overall, it is observed that when yaw angle misalignment is introduced, and the dihedral is rotated to $90^o$, the change of the dihedral RCS can range from 20 dB to 30 dB within $0^o$ to $5^o$ yaw angle. The amount of RCS change can also depend on the length of the dihedral. Due to the null position of the dihedral far-field scattering pattern, the most rapid change of RCS within $0^o$ to $1^o$ is observed when the length of the dihedral is equal to 120 mm, which should be avoided, while the smallest change happens when the length of the dihedral is equal to 50 mm. By carefully selecting the length of the dihedral, the trend of the RCS change can be controlled within a specific range of yaw angle misalignment. Based on the simulation setup when $\theta_r=90^\circ$, it is recommended to select $w=135$ mm and $l=50$ mm when the yaw misalignment can be controlled within $1^\circ$; if the measurement setup does not allow small yaw misalignment within $1^\circ$, then it is recommended to use the dihedral with $w=135$ mm and $l=100$ mm or $w=135$ and $l=130$ mm to obtain stable RCS under large yaw misalignment angles. On the other hand, when the dihedral is rotated to $0^o$, the RCS becomes stable within $0^o$ to $5^o$ yaw angle. Both length and width variations of the dihedral only affect the overall RCS value.

Results of pitch misalignment in far-field

Same as the yaw angle simulation, the pitch misalignment simulation was also analyzed under four different sets:

1. (i) The dihedral was rotated to $90^o$, and the width was fixed at 135 mm. Then, for each length from 50 mm to 180 mm, the RCS was simulated under pitch angles from $0^o$ to $5^o$.

2. (ii) The dihedral was rotated to $90^o$, and the length was fixed at 180 mm. Then, for each width from 50 mm to 180 mm, the RCS was simulated under pitch angles from $0^o$ to $5^o$.

3. (iii) The dihedral was rotated to $0^o$, and the width was fixed at 135 mm. Then, for each length from 50 mm to 180 mm, the RCS was simulated under pitch angles from $0^o$ to $5^o$.

4. (iv) The dihedral was rotated to $0^o$, and the length was fixed at 180 mm. Then, for each width from 50 mm to 180 mm, the RCS was simulated under pitch angles from $0^o$ to $5^o$.

During the simulation, the step of pitch angle scanning was set to $1^o$. As mentioned before, the sizes of the dihedral during the simulation were selected to balance the simulation time and the strength of the dihedral backscattered power.

The simulation results of case (i) and case (ii) are shown in Fig. 15 and Fig. 16. It is observed that when the dihedral is rotated to $90^o$, changing the pitch angle will not affect the RCS value. Besides, both length and width variation here can only influence the overall RCS value. When the dihedral is rotated to $0^o$, the pitch angle starts to affect the RCS value. The change of RCS at different pitch angles when the dihedral is rotated to $0^o$ can be seen from Fig. 17. In addition, changing the length of the dihedral can affect the trend of the RCS change. Figure 18 shows that when the dihedral is rotated to $0^o$, changing the width of the dihedral will only influence the overall RCS value.

Figure 15. $90^o$ rotated Dihedral RCS simulation under different pitch angles and varying dihedral length.

Figure 16. $90^o$ rotated Dihedral RCS simulation under different pitch angles and varying dihedral width.

Figure 17. $0^o$ rotated Dihedral RCS simulation under different pitch angles and varying dihedral length.

Figure 18. $0^o$ rotated Dihedral RCS simulation under different pitch angles and varying dihedral width.

From the above analysis, it can be seen that including $0^o$ to $5^o$ pitch angle misalignment can already lead to a significant change in dihedral RCS and cause the overall RCS drop for about 20 dB to 30 dB when the dihedral is rotated to $0^o$. The length of the dihedral can influence the trend of the RCS change. Based on the simulation setup when $\theta_r=0^\circ$, it is recommended to select $w=135$ mm and $l=50$ mm when the pitch misalignment can be controlled within $1^\circ$; if the measurement setup does not allow small pitch misalignment within $1^\circ$, then it is recommended to use the dihedral with $w=135$ mm and $l=100$ mm or $w=135$ and $l=130$ mm to obtain stable RCS under large pitch misalignment angles. On the other hand, when the dihedral is rotated to $90^o$, the RCS becomes stable within $0^o$ to $5^o$ pitch angle misalignment. Here, both changes of dihedral length and width only affect the overall RCS value. Comparing the results from yaw and pitch misalignment angles, it can be seen that the simulations between $0^o$ and $90^o$ are symmetrical and vice versa. As an example, the change in the RCS of a $90^o$ orientated dihedral with varying yaw angle and dihedral length can be derived from the change in the RCS of a $0^o$ dihedral with varying pitch angle and dihedral length. This symmetry simplifies the derivation of the RCS variation of a dihedral caused by the two types of misalignment angles ( $\theta_y$ and $\theta_p$).

Discussion on the near-field effects

The near-field scattering response of the dihedral was simulated using the second setup described in the previous section. Figure 19 compares the simulation results obtained with a plane wave source and those using the dipole array source. For these simulations, the dihedral dimensions were fixed at 140 mm in width and 200 mm in length, consistent with the size used in subsequent practical measurements.

Figure 19. Simulation results comparison between plane wave and dipole source incidence at two distances ( $\theta_r=90^o$).

The far-field distance for the dihedral with dimensions 140 mm x 200 mm (w x l) is approximately 42 meters. Accordingly, the simulation results using a plane wave closely matched the results obtained when the dipole array source was placed 45 meters away, as shown in Fig. 19, confirming far-field conditions. In contrast, placing the dipole source 3.6 meters from the dihedral will result in the near-field measurement, which coincides with the distance used between the dihedral and the radar during the actual measurement.

As shown in Fig. 19, the RCS difference between the near-field and far-field simulations is approximately 13 dB within the yaw angle range from $0.5^o$ to $2^o$, and drops to 5 dB when the yaw angle is increased. This discrepancy highlights the significant impact of near-field conditions on the dihedral’s scattering response.

Measurement set-up and radar under test

This research utilizes a $\pm45^o$ polarized MIMO automotive radar operating in the 77 GHz band, designed by HUBER+SUHNER AG. The radar measures the polarimetric scattering matrix, represented by Eq. (4), while the DH scattering matrix under slant polarization basis is shown in Eq. (5). The RF front end includes an MMIC [Reference Ginsburg, Subburaj, Samala, Ramasubramanian, Singh, Bhatara, Murali, Breen, Moallem, Dandu, Jalan, Nayak, Sachdev, Prathapan, Bhatia, Davis, Seok, Parthasarathy, Chatterjee, Srinivasan, Giannini, Kumar, Kulak, Ram, Gupta, Parkar, Bhardwaj, Rakesh, Rajagopal, Shrimali and Rentala26] with four receivers, three transmitters directly connected to a metalized plastic waveguide antenna manufactured using a novel combination of 3D printing and metallization processes developed by HUBER+SUHNER AG [Reference Huegel, Garcia-Tejero, Glogowski, Willmann, Pieper and Merli27]. The antenna is mounted on top of the printed circuit board, as shown in Fig. 20(a). The physical antenna channels are strategically positioned to achieve a fully populated virtual array with $\lambda/2$ spacing between the four polarimetric channels (S11, S12, S21, S22), as depicted in Fig. 20(b).

Figure 20. Radar under test [Reference Zhao, Garcia-Tejero, Bouwmeester, Aslan, Krasnov and Yarovoy8]. (a) MIMO topology (b) Polarimetric virtual array

The radar incorporates two subarray types, each offering orthogonal slant polarizations ( $\pm45^o$). These subarrays are based on a linear array of eight open-ended waveguides [Reference Garcia-Tejero, Burgos-Garcia and Merli28]. Simulated radiation patterns for transmitter 1 and transmitter 3 are presented in Fig. 21. The subarrays achieve an elevation ( $phi=90^\circ$) 3-dB field-of-view (FOV) of $9.1^\circ$ and an azimuthal ( $phi=0^\circ$) FOV of $105^\circ$, with a gain around 15 dBi. The cross-polarization discrimination reaches 35 dB at boresight, decreasing to 5 dB at $60^\circ$ in the azimuthal plane, due to the inherent geometry of the array.

Figure 21. TX1 (+45 $^\circ$) and TX3 (-45 $^\circ$) subarray simulated radiation pattern [Reference Zhao, Garcia-Tejero, Bouwmeester, Aslan, Krasnov and Yarovoy8]. (a) phi= $90^o$ cut (b) phi= $0^o$ cut

The measurement during this research was performed in the Delft University Chamber for Antenna Tests. A 140 mm x 200 mm dihedral corner reflector was used as the target and placed on a rotatable stand that has two motors that can provide both azimuth rotation and dihedral self-rotation, as shown in Fig. 22(a). The RUT was fixed during the measurement as shown in Fig. 22(b). The distance between the RUT and the dihedral was set to 3.6 m.

(4)\begin{equation} S_{\pm 45^obasis}= \begin{bmatrix} S_{11} & S_{12} \\ S_{21} & S_{22} \end{bmatrix} = \begin{bmatrix} S_{+45+45} & S_{+45-45} \\ S_{-45+45} & S_{-45-45} \end{bmatrix} \end{equation}

(5)\begin{equation} S_{DH_{slant}}(\theta_r)=\sqrt{\frac{\sigma_{DH}}{4\pi}} \begin{bmatrix} \sin{2\theta_r} & \cos{2\theta_r} \\ \cos{2\theta_r} & -\sin{2\theta_r} \end{bmatrix} \end{equation}

Figure 22. Measurement setup in the anechoic chamber. (a) Dihedral setup (b) Radar setup

Measurement results

Due to the limitation of the measurement equipment, only the yaw misalignment measurement was done. Figure 23 shows the measurement results, represented by the dashed lines. For comparison, the simulation result is included for $\theta_r=90^o$ in both near- (source at 3.6 m) and far- (source at 45 m and plane wave incident) field, represented by the solid lines; both the measurement and the simulation were done with the $0.1^o$ step when scanning the yaw angle. The results are normalized at $0^o$ yaw angle. Each result was normalized according to its own maximum.

Figure 23. Measurement (dashed-line) and simulation (solid-lines) results comparison under yaw misalignment angle.

It can be seen from Fig. 23 that when the dihedral is rotated to $0^o$, the received power is stable over the yaw misalignment angle, as expected according to the simulation results. The overall variation of the received power is within 1 dB. In contrast, when the dihedral is rotated to $90^o$, the received power dropped for about 30 dB when the yaw angle reached $5^o$. By comparing the measured results at $\theta_r=90^o$ and the corresponding simulated results at near- and far-field, it can be verified that the dihedral was measured in its near-field during the measurement.

From the measurement result of the $90^o$ rotated dihedral and the corresponding simulation result in the near-field, it can be observed that there is an overall mismatch between the measured (red dashed curve) and the simulated (purple solid curve) results. In order to better observe this mismatch, the simulation range was extended to $\theta_y=-2^o$ and compared with the measured result from $\theta_y=0^o$ to $5^o$ as shown in Fig. 24. After shifting the entire measured curve $0.6^o$ to the left, the measured and the simulated results are well-matched as shown in Fig. 24. This overall shift in the curve comes from the moving precision of the step motor that controls the yaw angle scanning.

Figure 24. Misalignment between the measured and simulated results when $\theta_r=90^o$.

Calibration method

The calibration performed in this subsection aims to accurately obtain the polarimetric phase difference between the polarimetric scattering matrix coefficients for better target characterization.

The calibration method used during this research is extended from the method proposed in [Reference Zhao, Garcia-Tejero, Bouwmeester, Aslan, Krasnov and Yarovoy8], where the calibration matrix was introduced, which can be directly multiplied by the raw radar data for the polarimetric phase calibration.

The raw measurement data consists of a 12x750x16x20 complex 4-D matrix, where 12 represents the number of channels, 750 is the number of samples per chirp, 16 denotes the number of chirps per frame, and 20 signifies the number of frames.

To obtain the reference data for calculating the calibration matrix, the measurement of the dihedral was done at $\theta_r=45^o$ and $\theta_r=0^o$, both without any misalignment angle ( $\theta_y=\theta_p=0^o$). The co-pol reference data was obtained from the measurement at $\theta_r=45^o$, and the cross-pol reference data was obtained from the measurement at $\theta_r=0^o$. The calibration matrix was calculated using the method proposed in [Reference Zhao, Garcia-Tejero, Bouwmeester, Aslan, Krasnov and Yarovoy8] and then applied to the measured data when the yaw angle was present. The polarimetric channels’ phase difference was calculated between $S_{12}$ and $S_{21}$. According to the scattering matrix of the dihedral under $\pm45^o$ polarimetric basis, the polarimetric phase difference between the cross-pol channels $S_{12}$ and $S_{21}$ should be $0^o$ when the dihedral is rotated to $\theta_r=0^o$ and $\theta_r=90^o$.

Yaw angle misalignment errors

The uncalibrated polarimetric phase differences of the measured data are shown in Fig. 25, while the calibrated results are presented in Fig. 26. After calibration, the polarimetric phase difference for the $0^\circ$ rotated dihedral stabilizes around $0^o$, with a mean value of $1.2^\circ$ and a standard deviation (s.t.d) of $0.6^\circ$. In contrast, the $90^\circ$ rotated dihedral shows less stability in its calibrated polarimetric phase difference compared to the $0^\circ$ rotated dihedral. Specifically, the s.t.d for the $90^\circ$ rotated dihedral increases significantly to $12.3^\circ$, and its mean value shifts to $-29.6^\circ$. The additional phase offset occurred on the dihedral with $\theta_r=90^\circ$ is due to the RCS reduction under yaw misalignment error as shown in Fig. 24. Such RCS reduction can lead to lower SNR and bring additional phase noise to the measurement.

Figure 25. Uncalibrated cross-pol polarimetric phase difference from the measurement.

Figure 26. Calibrated (under no misalignment assumption) cross-pol polarimetric phase difference from the measurement.