A. Symmetrical Beam-Distribution Network

In this work, a two-to-eight SBDN is required to distribute the signals from the two inputs. Since the passive distribution networks have the advantage of high linearity and zero dc power consumption, the SBDN in this work is implemented by a symmetrical two-stage Wilkinson power divider (WPD). The main design target of this network includes: 1) high isolation between different beam branches; 2) identical transmission performance for each branch; 3) low loss and compact area; 4) facilitation of beam synthesis.

The circuit diagram of the proposed SBDN is shown in Figure 5, which consists of single-ended and differential WPDs, differential interconnection lines and transformer-based baluns. The eight outputs (i.e., OUT A₁ -OUT A₄ and OUT B₁ -OUT B₄) distributed from the two inputs (i.e., IN A and IN B) are arranged in a way that facilitates beam synthesis.

At the first stage of the network, a single-ended WPD is employed. To reduce the large area of the $\lambda$ /4 transmission line (TL) in the WPD, lumped-element WPDs have been employed [21]. In this design, the $\lambda$ /4 TL is implemented by a five-tap inductor to ensure compact size and broad bandwidth simultaneously. The simulated S-parameter of the compact WPD are shown in Figure 6. The isolation and return loss are better than 25 dB and the insertion loss is less than 0.64 dB across the 27–31 GHz band.

The differential WPDs are required at the second stage. A low-loss, broadband and compact differential $\lambda$ /4 TL is the key to implement a high-performance differential WPD. To reduce chip area, transformer-based [22] and inductor-capacitor-based [23] differential WPD have been proposed. However, the former introduces phase and magnitude imbalance and the latter suffers from narrow bandwidth. In this design, a capacitor-free differential $\lambda$ /4 TL with compact area is proposed, as shown in Figure 7(a), where $L_{p}$ and $L_{n}$ represent the inductors in the positive and negative paths, respectively. The parasitic capacitance between $L_{p}$ and $L_{n}$ inherently forms the capacitance of a $\lambda$ /4 TL, which avoids the use of extra capacitors and thus improves the bandwidth. Besides, benefiting from the electromagnetic enhancement between $L_{p}$ and $L_{n}$ , the insertion loss of the $\lambda$ /4 TL is greatly reduced with shorter line length. Further, the characteristic impedance of the $\lambda$ /4 TL can be tuned by employing different line space and width. For example, Figure 7(b) depicts the simulated insertion loss of the transmission line versus the port impedance at 29 GHz, while the line space ($S_{D}$ ) is varied. As expected, the characteristic impedance will increase with larger line space, due to the decreased parasitic capacitance between the metal lines. Nonetheless, it should be noted that there is a lower bound of the characteristic impedance of the differential $\lambda$ /4 TL due to physical limitation of the technology. In this work, line space of $2~\mu \text{m}$ and line width of $4~\mu \text{m}$ are chosen for the $\lambda$ /4 TL, which exhibits a simulated characteristic impedance of $113~\Omega$ . Thus, the characteristic impedance of the differential WPD is $80~\Omega$ . Figure 8 shows the simulated S-parameters and magnitude/phase imbalance between the two output ports. As indicated, the differential WPD achieves a simulated 0.36 dB loss and 25 dB isolation from 27 to 31 GHz. The phase and magnitude imbalances are less than 0.05° and 0.001dB, respectively.

To reduce the coupling between the interconnects for different beams, differential lines are preferred for the outstanding anti-interference ability [24]. Considering the pair of differential lines shown in Figure 9, the line distance ($D$ ), line length ($L$ ), line width ($W$ ) and line space ($S$ ) will affect the coupling between the two differential lines. The coupling factor of the differential lines under various $D$ and $L$ is compared in [24], which indicates that large $D$ and small $L$ contribute to lower coupling. For further improvement of isolation and also to reduce insertion loss, the optimization of $W$ and $S$ is necessary. Figure 9(a) and (b) depict the forward and reverse coupling simulation setup for the pair of differential lines, where $Z_{o}$ represents the characteristic impedance of the differential line. Based on the settings in Figure 9, electro-magnetic (EM) simulations are performed to calculate TL insertion loss versus isolation and TL characteristic impedance versus $S$ , with various $W$ and $S$ settings. Figure 10(a) suggests that a low $S$ contributes to high isolation between the two differential lines, mainly because that much less electromagnetic energy is leaked to the outside of the differential lines. However, setting the $S$ for optimal isolation will cause several problems. First, the low $S$ for high isolation will cause high loss, as revealed by Figure 10(a). Second, a low $S$ will reduce the characteristic impedance $Z_{o}$ to $< 60~\Omega$ , as presented in Figure 10(b). This will cause impedance mismatch at the differential WPD input ports, since there is a low bound of the characteristic impedance of the differential WPD, as mentioned. In consequence, a line space of $6~\mu \text{m}$ and line width of $5~\mu \text{m}$ contributing to $80~\Omega ~Z_{o}$ is chosen for the differential interconnection lines, which ensures low loss and relatively high isolation. The routing of the differential interconnection lines is carefully designed for symmetry, in order to achieve balanced outputs. Finally, the transformer-based baluns (i.e., balun 1 and balun 2) are employed to perform the single-ended to differential conversion signal and also provide impedance matching.

The performance of the proposed SBDN is simulated by the ADS Momentum simulator. The simulations indicate the return loss of the input and output ports are 15–27 dB from 27 to 31 GHz. The insertion losses are less than 10 dB across the 27–31 GHz band including the 6 dB intrinsic loss as shown in Figure 11(a). The loss differences among the eight distribution branches (i.e., from IN A to OUT ${\text{A}}_{x}$ and from IN B to OUT ${\text{B}}_{x}$ ) are less than 0.1 dB, which is mainly caused by the implementation of the lower metal lines in the three crossovers (see the shadow in Figure 5). The output ports isolations are shown in Figure 11(b). As can be seen, the isolations between different beams (i.e., between OUT ${\text{A}}_{x}$ and OUT ${\text{B}}_{x}$ ) are higher than 46 dB. The isolations between the signal branches of a same power divider from individual input A or B(i.e., between OUT (A/B)₁ and OUT (A/B)₂ or OUT (A/B)₃ and OUT (A/B)₄) are higher than 28 dB at 27–31 GHz. The peak values are higher than 42 dB at 28.5 GHz. The isolations between signal branches of different power divider (i.e., between OUT (A/B)₁ and OUT (A/B)_3,4 or OUT (A/B)₂ and OUT (A/B)_3,4) are 32–38 dB at 27–31 GHz. The amplitude balance and beam to beam isolation of the SBDN will be verified in the measurement section.

B. Pre-LNA

The pre-LNA is intended to suppress the noise of the CMOS phased-array and improve the noise figure of the system. As shown in Figure 12, the first stage employs a small source-degenerated inductor of 55 pH to achieve input impedance and noise matchings simultaneously. To achieve low noise figure and broadband impedance matching with low power dissipation, the total gate width of $2\times 32~\mu \text{m}$ is chosen for all transistors. The L-C-L network at the interstage can provide two frequency peaks to realize broadband matching while minimizing the insertion loss. The spiral inductors are widely used for saving the chip area and the capacitors are adopted between stages for independent biasings which are generated by the bandgap reference circuit. Furthermore, design iterations are required to fine tune matching circuits for optimal performance. The simulated results are plotted in Figure 13, it shows that the gain of the pre-LNA is 20 dB. The gain variation is less than 1 dB from 26 to 32 GHz. The two peak gains are 21 dB and 20.85 at 26.3 GHz and 31 GHz, respectively. The noise figure is less than 4.3 dB across 26–32 GHz. The minimum noise figure is 4 dB at 29–31 GHz. From 27 to 31 GHz, the simulated $S_{11}$ and $S_{22}$ are less than −11 dB and −8 dB, respectively. The simulated input $\text{P}_{1dB}$ is −27 dBm.

C. Vector-Modulated Phase Shifter

Figure 14 shows the block diagram of a fully-passive vector-modulated phase shifter (VMPS). It consists of a 3-dB quadrature coupler, two fully-passive phase-invertible gain tuning blocks, a power combiner and the matching networks (MN). The design is similar to [25]. The 3-dB quadrature coupler is implemented by vertically coupled microstrip lines using the top two metal layers, as shown in Figure 15. The microstrip lines are folded to reduce chip area. The simulated amplitude and phase responses of the coupler is depicted in Figure 16. The IQ gain and phase errors are less than 0.2 dB and 2.1° within the 26 – 32 GHz band, implying good IQ balance. Then, the two generated quadrature signals are weighted by the switch-array-based gain tuning blocks. The gain tuning block contains a total of six cross-connected transistor-array units (i.e., Bit1 to Bit6). The transistors in the units have the width of $0.7~\mu \text{m}$ per finger and the finger number scales up from 1 (i.e., Bit1) to 32 (i.e., Bit6). All the transistors operate in the deep triode region, where the drain and source are biased with 0 V. The transistor gates are biased with 0 or 1 V, which enables direct-digital control for the gain tuning block. The cross-connected structure of the transistor array provides phase inverting operation for the passive gain tuning block and thus ensures phase shifting in all four quadrants which covers full 360° phase-shift range. The transformer-based MNs are employed for the input and output impedance matching of the gain tuning blocks, which also provide the conversions between the single-ended and differential signals. Then, the I- and Q-path signals are summed up by the Wilkinson-like power combiner. Lumped inductors and capacitors are adopted to implement the $\lambda$ /4 transmission line, based on its lumped L-C model, in order to reduce chip area. The passive VMPS are digitally controlled by a total of 12 bits (i.e., 6 bits for each of I and Q paths), which provides 4096 possible phase shifting states. A sub-selection of the 4096 states ensuring both accurate phase shifting and low gain error are determined based on the simulated phase responses. The corresponding controls are stored in a look-up table (LUT) and can be refreshed according to the measured results, if changes are necessary.

D. Switched-Type Attenuator

A switched-type attenuator (STA) is employed to achieve the linear-in-dB gain tuning. The schematic of the 5-bit STA is shown in Figure 17. Accurate gain tuning and good impedance matching can be ensured by optimizing the resistance values of each attenuation cell. Capacitive compensation technique is used to enhance the attenuator performance over a wide operation bandwidth. According to the simulation, the stand-alone 5-bit STA has an RMS amplitude error of less than 0.1 dB from 27 to 31 GHz. This design is similar to [26] while the source and load impedance of the attenuator are further optimized to ensure wide band amplitude tuning performance. Noted that the attenuation performance would deteriorate if the attenuator is connected to poorly matched source or load impedances. To evaluate this effect, the RMS amplitude errors of the STA under different source and load impedances at 30 GHz are simulated and depicted in the Smith chart (see Figure 18). As revealed, the RMS amplitude error exhibits degradation when the source or the load impedance deviates from the perfect $50~\Omega$ . Thus, the source and load impedances connected to the STA should be carefully designed to avoid possible performance degradation. In this work, this is accomplished by a proper arrangement of the circuit stages as shown in Figure 3. This configuration takes advantage of the inherently good matching at the phase shifter output and the combiner input. As shown in Figure 19), the impedances at the output of the phase shifter and the input of the combiner are located in low amplitude error area and thus ensures high attenuation accuracy.

A. Single-Beam Measurements

The balance of the SBDN is verified by measuring the S-parameter of each channel (i.e., from two inputs to four outputs). As shown in Figure 22, the return loss (S₁₁ and S₂₂) and reverse isolation (S₁₂) are < −10 dB and < −60 dB, respectively. The magnitude and phase errors of S₂₁ are shown in Figure 23. As can be seen, owing to the symmetrical design of the SBDN, the gain and phase mismatches of the eight channels remain less than 0.3 dB and 2°, respectively. Figure 24 depicts the measured relative gain and relative phase, indicating that the phased array has achieved approximately 17 dB gain tuning range with 0.53 dB tuning step and 360° phase shift range with 5.625° phase step. The corresponding RMS gain and phase errors are shown in Figure 25, which are less than 0.35 dB and 4°, respectively. The measured and simulated NF are shown in Figure 26. As can be seen, the measured NF is 10.8–11.7 dB at 26–31 GHz. It is slightly less than the value of 12.3 dB calculated in Figure 4. This is because of the measured gain is increased to 3 dB. It should be noted that in order to reduce power consumption, the gain of each channel is low, so the noise figure of the channel is relatively high and it will be reduced to about 2 dB by adding a external GaAs LNA. The measured input $\text{P}_{1dB}$ is −22 dBm at 29 GHz.

B. Beam-Coupling Measurements

Figure 27 depicts the measurement setup and vectorial representation beam coupling of the 4-beam phased array. It is shown that beam 4 (B4) is under test with the input signal fed to channel 2 (CH2). Due to the limitations of the probe-station test, both the input port of CH1 and the output ports of B1, B2, B3 are left open circuited. Note that when these four ports are terminated by $50~\Omega$ , as in the real application, the measured beam couplings would be further reduced. The couplings from beams 1, 2 and 3 to beam 4 can be obtained by measuring beam 4 at a constant phase setting and sweeping the phases of beams 1, 2 and 3 all over 360°. Amplitude and phase of the output B4 will be affected by the couplings from beams 1, 2 and 3. They can be characterized as vector ${C_{1}}{e}^{j \varphi _{1}}$ , ${C_{2}}{e}^{j \varphi _{2}}$ and ${C_{3}}{e}^{j \varphi _{3}}$ [30] (see Figure 27), respectively. Suppose the unaffected output signal of B4 is ${Y}{e}^{j \vartheta }$ . The magnitude of the coupling vector $C$ can be calculated by

$$\begin{equation*} C = \sqrt [] {Y^{2}+(Y+E_{amp})^{2}-2Y(Y+E_{amp})\cos E_{pha}}\tag{1}\end{equation*}$$ View Source\begin{equation*} C = \sqrt [] {Y^{2}+(Y+E_{amp})^{2}-2Y(Y+E_{amp})\cos E_{pha}}\tag{1}\end{equation*} where $E_{amp}$ and $E_{pha}$ represent amplitude error and phase error. Then the coupling coefficient described as $C_{coe}= C/Y$ can be obtained from the measured data. Figure 28(a) and (b) shows the measured gain and phase deviation caused by the couplings from beams 1, 2 and 3. Among these three beams, the gain and phase deviations are 0.17 dB and 0.9° at 29 GHz, respectively. The corresponding RMS gain error and phase error are presented in Figure 29 (a), which are less than 0.1 dB and 0.5° respectively. The coupling coefficients are calculated in dB, as shown in Figure 29 (b). As can be seen, the coupling from beam 1, 2 and 3 are better than −32 dB. Thanks to the symmetrical structure of the beam distribution network. Note that coupling curves of beam 1 and 2 has a similar shape. As indicated in the simulated isolation of the SBDN, the coupling curve of beam 3 is different because of the signal of beam 3 and beam 4 are divided from the same power divider. Similar measurements were performed with beams 1, 2 and 3 and similar results were obtained.

Table 1 summarizes the performance of the phased-array receivers, which shows that this work has achieved four beams generation with competitive phase shifting and gain tuning accuracy under ultra-low power consumption.