Bandwidth limitations with a single VCO

The Colpitts-Clapp architecture utilized for the two required VCOs is presented in Fig. 2. It was introduced in [Reference Pohl, Rein, Musch, Aufinger and Hausner21] and has since been used for several wideband VCOs in different technologies [Reference Bredendiek, Aufinger and Pohl22, Reference Moeck, Aksoyak and Ulusoy23]. Compared to the cross-coupled topology of [Reference Drechsel, Joram and Ellinger9], it was chosen due to its more stable and higher output power, which is required in the proposed concept to drive the down-conversion mixer.

Figure 2. Schematic of the utilized VCO architecture. The two varactors of the Colpitts-Clapp approach increase the relative bandwidth, while still remaining limited when using a single VCO.

Relative bandwidth limitations

When first neglecting $C_\mathrm{var}^*$, the resulting, fundamental Colpitts architecture is based on a series resonant circuit formed by the input capacitance $C_\mathrm{in}$ and the base inductance $L_\mathrm{B}$ at the base of the transistor $T_\mathrm{2}$ [Reference Pohl, Rein, Musch, Aufinger and Hausner21]. The input capacitance can be modified using a varactor and changing the applied tuning voltage $V_\mathrm{tune}$ to control the output frequency. To maximize the relative bandwidth, $C_\mathrm{in}$ would ideally equal the varactor’s capacitance $C_\mathrm{var}$. The oscillation frequency is then given by:

Figure 3. Dependency of the varactor capacitance $C_\mathrm{var}$ on the varactor voltage $V_\mathrm{var}$. In the utilized technology, the capacitance variation reaches a ratio of 3.6:1, including a slight forward biasing.

(3)\begin{equation} f_\mathrm{osc}=\frac{1}{2\pi\cdot\sqrt{L_\mathrm{B}C_\mathrm{var}}}. \end{equation}

By inserting (3) in (2), the relative bandwidth achievable in dependency of the tuneable range of the varactor can be calculated as:

(4)\begin{equation} B_\mathrm{rel}=\frac{2\cdot\left(\sqrt{C_\mathrm{var,max}/C_\mathrm{var,min}}-1\right)}{\sqrt{C_\mathrm{var,max}/C_\mathrm{var,min}}+1}. \end{equation}

To be able to estimate the maximum achievable relative bandwidth, the simulation results for the $C_\mathrm{var,max}/C_\mathrm{var,min}$ of the used varactor are shown in Fig. 3. It has to be noted that the realizable variation increases significantly if the varactor is biased in forward direction. In the case of Fig. 3, a conservative voltage proven in previous designs was chosen, to reach a varactor capacitor variation of 3.6:1. Therefore, with the help of (4), the maximum relative bandwidth utilizable in this process equals 62.6%. However, as presented in [Reference Pohl, Rein, Musch, Aufinger and Hausner21], $C_\mathrm{in}$ does not equal $C_\mathrm{var}$, as ideally assumed in (3), but also includes a capacitance in series $C_\mathrm{s}$ and, in parallel, $C_\mathrm{p}$, respectively. With their weak dependency on $V_\mathrm{tune}$, they additionally reduce the achievable tuning range. Therefore, to decrease this effect, [Reference Pohl, Rein, Musch, Aufinger and Hausner21] proposes using a second varactor $C_\mathrm{var}^*$, increasing the total variable capacitance. This changes (3) to a more sophisticated version:

(5)\begin{equation} f_\mathrm{osc}=\frac{1}{2\pi\cdot\sqrt{L_\mathrm{B}}}\cdot\Biggr(\frac{C_\mathrm{var}\cdot C_\mathrm{s}}{C_\mathrm{var}+C_\mathrm{s}}+C_\mathrm{p}+C_\mathrm{var}^*\Biggl)^{-\frac{1}{2}}, \end{equation}

as is given in [Reference Bredendiek, Aufinger and Pohl22], where this architecture was used in the same technology to achieve a relative bandwidth of 40.24% and 38.62% in the E- and W-band, respectively. Both designs, therefore, exceed the relative bandwidth of their corresponding waveguide frequency bands. In [Reference Drechsel, Joram and Ellinger9], those relative bandwidths are significantly surpassed with a cross-coupled VCO. This is partly thanks to a $C_\mathrm{var,max}/C_\mathrm{var,min}$ of 8.5 in that technology, allowing for a theoretical value of 98%. Combined with smaller parasitic capacitances at the center frequency of 10.8 GHz, this design achieved a relative bandwidth of 80% in measurements.

However, none of these state-of-the-art VCOs can cover the relative bandwidth of the UWB with its 109%, let alone coming close to the maximum of 200% as some YTOs do. To further examine why, we determine the necessary tuneable capacity range of the varactor for a given $B_\mathrm{rel}$. Solving (4) for $C_\mathrm{var,max}/C_\mathrm{var,min}$ provides

(6)\begin{equation} \frac{C_\mathrm{var,max}}{C_\mathrm{var,min}}=\Biggl(\frac{B_\mathrm{rel}+2}{B_\mathrm{rel}-2}\Biggr)^2. \end{equation}

Achieving a relative bandwidth of 176%, as presented in this article, $C_\mathrm{var}$ would therefore require a tuneable range of $C_\mathrm{var,max}/C_\mathrm{var,min}\approx 245$. This exceeds the value of the technology used in [Reference Drechsel, Joram and Ellinger9] by a factor of 29 while still neglecting the aforementioned parasitics. Therefore, this clearly illustrates the infeasibility of covering such a relative bandwidth with a single VCO.

PLL loop gain variation

If we move from the design of the broadband VCO as a single component to its integration inside of a frequency synthesizer, another challenge arises. Therefore, the PLL’s filter bandwidth is chosen to optimize phase noise performance at a specific design frequency. At this design frequency, the PLL exhibits a fixed loop gain $K_\mathrm{PLL}$ given by:

(7)\begin{equation} K_\mathrm{PLL}=\frac{K_\mathrm{VCO}K_\mathrm{PFD}}{N}. \end{equation}

It depends on the PFD gain $K_\mathrm{PFD}$, the divider value N, and critically, the VCO gain $K_\mathrm{VCO}$. Even for VCOs with a continuous tuning range, their proportionality between the tuning voltage and output frequency can be nonlinear. Therefore, the $K_\mathrm{VCO}$ varies significantly over the tuning voltage, especially for ultra-wideband VCOs. To assess this analytically, (3) can be expanded to include the varactor capacitances’ dependency on the tuning range. By excluding the parasitics of (5) and modeling the varactor’s capacitance as the diode’s junction capacity in dependency of the tuning voltage $V_\mathrm{tune}$ and diffusion voltage $V_\mathrm{diff}$,

(8)\begin{equation} f_\mathrm{osc}=\frac{1}{2\pi\cdot\sqrt{L_\mathrm{B}\cdot\frac{C_\mathrm{var,max}}{\sqrt{1+\frac{V_\mathrm{tune}}{V_\mathrm{diff}}}}}}, \end{equation}

is obtained, corresponding to the VCO’s tuning curve. As $K_\mathrm{VCO}$ corresponds to the derivative of this equation, it equals

(9)\begin{equation} K_\mathrm{VCO}=\frac{1}{8\pi\cdot V_\mathrm{diff}\cdot\sqrt{L_\mathrm{B}C_\mathrm{var,max}\left(\sqrt{1+\frac{V_\mathrm{tune}}{V_\mathrm{diff}}}\right)^3}}. \end{equation}

The VCO gain, therefore, decreases with a proportionality of $V_\mathrm{tune}^{-3/4}$. For the previously discussed VCO with the highest relative tuning range, this variation reaches a vast ratio of 30:1 [Reference Drechsel, Joram and Ellinger9]. Furthermore, it is aggravated by the variation of the PLL’s divider value N, also included in (7). This effect is further enhanced as its reciprocal decreases simultaneously to $K_\mathrm{VCO}$ when generating higher frequencies. Therefore, the loop filter’s realized bandwidth and phase margin vary greatly with output frequency during frequency synthesis [Reference Drechsel, Joram and Ellinger24, Reference Braun, van Delden, Bredendiek, Schoepfel, Hauptmeier, Shillue, Musch and Pohl25]. Thus increasing phase noise and, in the worst case, introducing stability problems. For this reason, several loop gain stabilization methods exist that try to compensate for VCO gain variation [Reference Pohl, Jaeschke and Aufinger26, Reference Van Delden, Pohl and Musch27].

Novel PLL architecture

With the limitations and challenges of single VCO frequency synthesizers clearly defined, we can look at the solutions the state of the art offers. They are based on subtracting two different frequency sources to increase the relative tuning range significantly. In [Reference Yan, Gomez-García Alvestegui, McDaniel, Li, Gogineni, Rodriguez-Morales, Brozena and Leuschen16], the frequency chirp with the desired absolute bandwidth is generated by a DDS. Subsequently, a second oscillator is stabilized separately to generate a fixed frequency. It is used to down-convert the chirp generated by the DDS to achieve the same absolute bandwidth at a lower center frequency for a higher relative bandwidth. The same concept is utilized in [Reference Mallach, Grys, Musch and Storch17], replacing the DDS with an additional analog PLL. Again, the bandwidth generated by the one PLL is down-converted by a fixed frequency to increase relative but not absolute bandwidth. However, since these concepts each use two different frequency sources, it is also possible for both to be tuneable to also add their absolute bandwidths. This was demonstrated in [Reference Welp, Briese and Pohl18], where two oscillators with different center frequencies are tuned in opposite directions inside their own PLL, respectively. However, as suggested in [Reference Welp and Pohl19], directly stabilizing the mixer’s output should synthesize the desired frequency immediately, significantly reducing the necessary hardware and implementation effort. This concept is illustrated in Fig. 1. Therein, the lower center frequency $\mathrm{VCO_L}$’s signal is subtracted from $\mathrm{VCO_H}$’s higher frequency signal. To add their respective bandwidths, the tuning voltage of $\mathrm{VCO_L}$ has to be inverted for the two VCOs to chirp in opposite directions. Therefore, the loop filter architecture presented in Fig. 4 is proposed. While a traditional active B filter [Reference Banerjee28] provides the tuning voltage $V_\mathrm{tune,H}$ for $\mathrm{VCO_H}$, a subtractor also inverts it to generate $V_\mathrm{tune,L}$ via the equation:

Figure 4. The presented loop filter generating the tuning voltages for both VCOs. The conventional active loop filter generates $V_{\mathrm{tune,H}}$, while an additional subtractor generates $V_{\mathrm{tune,L}}$ working in opposite direction.

(10)\begin{equation} V_{\mathrm{tune,L}}=V_{\mathrm{tune,max}}-V_{\mathrm{tune,H}}. \end{equation}

Therefore, when $\mathrm{VCO_H}$ is at its highest frequency, $\mathrm{VCO_L}$ is at its lowest, and vice versa. Should the VCO require a minimum tuning voltage for oscillation, this $V_\mathrm{tune,min}$ also must be included in (10). Additionally, the frequency of both VCOs depends solely on a single tuning voltage that dictates the output frequency of the presented PLL architecture. Therefore, it is possible to summarize the complete architecture as an equivalent VCO outputting a frequency $f_\mathrm{VCO,E}$ given by:

(11)\begin{equation} f_{\mathrm{VCO,E}}=f_{\mathrm{VCO,H}}-f_{\mathrm{VCO,L}}, \end{equation}

in dependency of a single tuning voltage $V_\mathrm{tune,H}$, as described in Fig. 5.

Figure 5. Concept of the two VCOs with the proposed loop filter behaving as one equivalent VCO. The validity of this concept eases the required simulation effort significantly.

Subsequently, to analyze $f_\mathrm{VCO,E}$ analytically, $f_\mathrm{VCO,H}$ in dependency of $V_\mathrm{tune,H}$ is modeled by:

(12)\begin{equation} f_\mathrm{VCO,H}=\frac{1}{2\pi\cdot\sqrt{L_\mathrm{B,H}\cdot\frac{C_\mathrm{var,max,H}}{\sqrt{1+\frac{V_\mathrm{tune,H}}{V_\mathrm{diff}}}}}}, \end{equation}

as described in (8). Additionally, $V_\mathrm{tune,H}$ receives a negative sign for $\mathrm{VCO_L}$ by inserting (10) in (8) to get:

(13)\begin{equation} f_\mathrm{VCO,L}=\frac{1}{2\pi\cdot\sqrt{L_\mathrm{B,L}\cdot\frac{C_\mathrm{var,max,L}}{\sqrt{1+\frac{V_\mathrm{tune,max}-V_\mathrm{tune,H}}{V_\mathrm{diff}}}}}}. \end{equation}

A distinction is made between the base inductance $L_\mathrm{B,H}$ and $L_\mathrm{B,L}$, as well as the maximum varactor capacitance $C_\mathrm{var,max,H}$ and $C_\mathrm{var,max,L}$ of $\mathrm{VCO_H}$ and $\mathrm{VCO_L}$, respectively. Additionally, we summarize those constants as the minimum oscillation frequencies $f_\mathrm{m,H}=\left(2\pi\sqrt{L_\mathrm{B,H}C_\mathrm{var,max,H}}\right)^{-1}$ for $\mathrm{VCO_H}$ and $f_\mathrm{m,L}=\left(2\pi\sqrt{L_\mathrm{B,L}C_\mathrm{var,max,L}}\right)^{-1}$ for $\mathrm{VCO_L}$, respectively. This results in a concise equation for the frequency of the equivalent VCO when inserting (12) and (13) in (11):

(14)\begin{equation} \begin{split} f_\mathrm{VCO,E}=&f_\mathrm{m,H}\cdot\sqrt[4]{1+\frac{V_\mathrm{tune,H}}{V_\mathrm{diff}}}\\ -&f_\mathrm{m,L}\cdot\sqrt[4]{1+\frac{V_\mathrm{tune,max}-V_\mathrm{tune,H}}{V_\mathrm{diff}}}. \end{split} \end{equation}

The derivation of which equates to:

(15)\begin{align} K_\mathrm{VCO,E}&=\frac{1}{4V_\mathrm{diff}}\cdot\Biggl(f_\mathrm{m,H}\cdot\left(1+\frac{V_\mathrm{tune,H}}{V_\mathrm{diff}}\right)^{-\frac{3}{4}}\\ &+f_\mathrm{m,L}\cdot\left(1+\frac{V_\mathrm{tune,max}-V_\mathrm{tune,H}}{V_\mathrm{diff}}\right)^{-\frac{3}{4}}\Biggr).\nonumber \end{align}

To visualize these results and proportionalities, Fig. 6 plots (8) and (9), as well as (14) and (15), respectively. Therein shows that the equivalent VCO based on the novel PLL architecture offers a higher relative tuning range based on frequency subtraction combined with a more linear tuning curve. Thereby, based on analytical considerations, the novel PLL architecture can solve both problems outlined in “Bandwidth limitations with a single VCO”.

Figure 6. A plot of the proportionalities described by the analytical considerations regarding the frequency and VCO gain of (a) a single VCO and (b) the proposed architecture. The curves plot the corresponding equations (8) and (9), as well as (14) and (15), respectively.

Monolithic Microwave Integrated Circuit (MMIC)

To verify those promising analytical considerations in practice, we designed an MMIC including the necessary components to implement the novel PLL architecture. A photograph of which is presented in Fig. 7. The MMIC also includes one transmit and three receive channels that are not further discussed, as this work focuses on the frequency generation.

Figure 7. Photograph of the realized MMIC containing the two VCOs and the down-conversion mixer. The TX- and RX-channels are not part of this work, which focuses on the frequency generation.

Regarding the necessary components, the two RF-VCOs are visible on the left. They are based on the schematic presented in Fig. 2 and therefore utilize the Colpitts-Clapp architecture. As explained in the “Bandwidth limitations with a single VCO” section and described by (5), this increases the variable capacity to maximize the tuning range of the individual VCOs. Specifically, the higher $f_\mathrm{c}$ VCO$_\mathrm{H}$ covers a frequency range of 32–41 GHz and is based on the design presented in [Reference Schoepfel, Kueppers, Aufinger and Pohl29]. Its measured tuning curve and calculated $K_{\mathrm{VCO}}$ are presented in Fig. 8. In principle, VCO$_\mathrm{L}$ utilizes the same architecture while using slightly larger integrated inductances and varactor sizes to decrease its center frequency. Its determined tuning curve covering a range of about 28–36 GHz and $K_{\mathrm{VCO}}$ are also presented in Fig. 8. They both strongly present the proportionalities described in Fig. 6(a). During the design process, we aimed to create no overlap between the two VCOs, while minimizing their separation to maximize relative bandwidth. The remaining overlap of less than 4 GHz can be reduced in the future to increase the signal generation’s absolute tuning range.

Figure 8. Measured tuning curve and calculated $K_{\mathrm{VCO}}$ of VCO$_\mathrm{H}$ and the calculated tuning curve and $K_{\mathrm{VCO}}$ of VCO$_\mathrm{L}$.

As the presented concept generates several different frequencies, intermodulation can be a concern. Advantageously, the second harmonics of $f_\mathrm{VCO,H}$ and $f_\mathrm{VCO,L}$ are canceled out, respectively, due to the differential circuit topology. However, as the upper sideband is only attenuated by the first-order low-pass filter of the mixer’s load, its intermodulation products should be considered. Therefore, to reduce the main distortion possible, which corresponds to the minimum sum of $f_\mathrm{VCO,H}$+$f_\mathrm{VCO,L}$ mixing with the maximum available frequency of $\mathrm{VCO_H}$ $f_\mathrm{VCO,H,max}$ the condition presented in [Reference Welp, Briese and Pohl18]:

(16)\begin{equation} f_{\mathrm{L,min}}+f_{\mathrm{H,min}}-f_{\mathrm{H,max}} \gt f_{\mathrm{H,max}}-f_{\mathrm{L,min}}, \end{equation}

has been fulfilled. Additionally, this is an overfulfilled condition, as $f_{\mathrm{H,min}}$ never occurs simultaneously to $f_{\mathrm{L,min}}$ and $f_{\mathrm{H,max}}$, by definition.

The frequency mixer, necessary for the down-conversion, is realized as a Gilbert cell connected to a resistive load, as can be seen in Fig. 9(a). In conjunction with the parasitic capacitances of the transistors, the resulting RC-load attenuates the unwanted sideband. Additionally, the differential amplifier of Fig. 9(b) is used to increase the output power to approx. 0 dBm while acting as an additional low-pass filter. The resulting output power is therefore high enough to act as the input signal of commercially available PLLs. This should be the case for a large span of temperatures as the VCOs deliver a stable output power, as shown in Fig. 10.

Figure 9. Schematic of the utilized (a) down-conversion mixer and (b) output buffer.

Figure 10. Simulated output power of VCO$_\mathrm{H}$ and VCO$_\mathrm{L}$ in dependency of temperature.

To validate those components working together to form the equivalent VCO, the bare die of the MMIC was mounted on a printed circuit board (PCB), which is presented in Fig. 11. The PCB provides the supply voltage, the reference frequency and contains the PLL chip and the loop filter. The ADF4169 by Analog Devices was chosen as the PLL chip. With its RF-bandwidth of 13.5 GHz, it can stabilize the equivalent VCO up to its maximum frequency.

Figure 11. Photograph of the measurement PCB.

To design the loop filter generating $V_\mathrm{tune,H}$, available simulation tools for conventional, single-loop PLLs can be used. By doing so, a loop bandwidth of 389 kHz and a phase margin of 67^∘ were chosen. The subtractor’s resistor values were matched to the op-amp’s noise voltage and current for minimum noise power density.

Measurement results

Firstly, the board was used to measure the tuning curve of the free-running, equivalent VCO. It is illustrated in Fig. 12, next to the frequencies of the individual VCOs, all in dependency of $V_\mathrm{tune,H}$. To prevent the aforementioned overlap of the two VCOs, $V_\mathrm{tune,H}$ is limited to a minimum of 2 V. Thereby, the tuning curve follows the proportionality described analytically by (14), as illustrated in Fig. 6(b). The same also applies to the presented VCO gain variation of the equivalent VCO described by (15). It is therefore compensated by the novel PLL architecture as anticipated by the analytical considerations. Quantitatively, the $K_\mathrm{VCO,H}$ variation of 12.84:1 and the $K_\mathrm{VCO,L}$ variation of 12.07:1 are thereby reduced to only 2.33:1. Additionally, in similarity to [Reference Pohl, Jaeschke and Aufinger26], the maximum of $K_\mathrm{VCO,E}$ at the highest frequency, reduces the impact of the $1/N$ also included in the $K_\mathrm{PLL}$ described by (7).

Figure 12. The measured tuning curve and $K_{\mathrm{VCO}}$ of the equivalent VCO. The calculated $K_{\mathrm{VCO}}$ varies less than for a single VCO. Therefore, the broadband VCO is easier to stabilize inside a PLL.

Secondly, the free-running VCO’s phase noise is measured by using a phase noise and signal source analyzer (R&S FSWP). Therefore, it was connected via SMA to a second output of the signal source opposite of the one used as the PLL’s input. The result of the phase noise over output frequency at an offset frequency of 1 MHz is illustrated in Fig. 13. It is, as expected, higher than fundamental VCOs at the generated frequencies, as it corresponds to the sum of the two VCOs at higher frequencies. However, for applications such as the discussed snow radar in [Reference Rodriguez-Morales, Gogineni, Leuschen, Paden, Li, Lewis, Panzer, Gomez-Garcia Alvestegui, Patel, Byers, Crowe, Player, Hale, Arnold, Smith, Gifford, Braaten and Panton8], the increased relative bandwidth brings resolution and penetration depth advantages that outweigh higher phase noise. Its signal generation, as well as all the approaches presented in [Reference Yan, Gomez-García Alvestegui, McDaniel, Li, Gogineni, Rodriguez-Morales, Brozena and Leuschen16–Reference Welp, Briese and Pohl18] also exhibit the added phase noise of two oscillators. However, regarding hardware and simulation efforts, this concept offers significant improvements. Additionally, as this synthesizer was implemented to prove the validity of the concept, phase noise can be optimized in the future, by carefully choosing the center frequencies and bandwidths of the respective RF-VCOs.

Figure 13. Measured open-loop phase noise of the equivalent VCO at an offset frequency of 1 MHz in dependency of output frequency. This phase noise includes the noise of the two RF-VCOs, the subtractor and the mixer.

Additionally, the phase noise of the stabilized VCO is measured, with the FSWP’s programmable signal source acting as the PLL’s reference. The results are depicted in Fig. 14 at a carrier frequency of 8 GHz. Moreover, the PLL’s components’ individual noise contributions are also presented. The commercial PLL-chip dominates the phase noise up to an offset frequency of approximately 1 kHz. From there on, the VCO dominates. It is to be noted that based on the frequency down-conversion and the resulting increase of the relative tuning range, the minimum frequency can, in this case, be arbitrarily low. During stabilization, a limit is introduced based on the minimum divider value of the PLL. As described in [Reference Braun, van Delden, Bredendiek, Schoepfel and Pohl30], a higher reference can simultaneously improve a PLL’s phase noise and settling time. Reducing the reference frequency to reach the lowest desired output frequency should, therefore, be avoided to not increase phase noise and settling time, as the latter would result in slower sweep times. In this case, the commercially available PLL chip requires a high minimum divider value of 75 offered with the 8/9-prescaler. Other programmable frequency dividers, such as the 12 of [Reference van Delden, Pohl, Aufinger and Musch31] utilized in the aforementioned [Reference Braun, van Delden, Bredendiek, Schoepfel and Pohl30], offer lower values, even going down to one as presented in [Reference Lin, Chien and Wey32].

Figure 14. Measured and simulated closed-loop phase noise at $f_{\mathrm{s}}$ = 8 GHz. The simulated contributions are calculated based on measurements of the individual components or their corresponding data sheets.

Overall, the measured and simulated phase noise matches each other almost perfectly. This validates the aforementioned simulation method based on the equivalent VCO with single VCO simulation tools. Therefore, the synthesizer’s implementation is successfully simplified from having to design multiple frequency sources individually to one synthesizer with nearly unlimited relative bandwidth.

Furthermore, the stabilized phase noise is measured at different carrier frequencies, with the results illustrated in Fig. 15. The in-band phase noise variation corresponds to the expected $20\log(10\,\mathrm{GHz}/2\,\mathrm{GHz})=14$ dB. Although the output frequency is varied by this factor of 5, the loop bandwidth stays reasonably constant. In conventional single VCO synthesizers, the deviation from the desired loop bandwidth and phase margin is conventionally significantly higher [Reference Braun, van Delden, Bredendiek, Schoepfel, Hauptmeier, Shillue, Musch and Pohl25]. This highlights the advantage of the proposed concept, reducing the VCO gain variation to only 2.33:1.

Figure 15. Closed-loop phase noise measurements of multiple output frequencies. The realized loop bandwidth and phase margin are very consistent for the large variance in output frequency thanks to the loop gain compensation of the presented concept.

Finally, measurements of frequency chirps generated by the synthesizer were conducted. Therefore, a R&S FSW85 with a maximum analysis bandwidth of 8.3 GHz was connected to the synthesizer’s output. However, in the generated frequency band, the analysis bandwidth of the FSW85 is reduced to 4.4 GHz. Therefore, the realizable frequency range is illustrated by three individual chirps with different prescalers and an individual bandwidth of 4.4 GHz, allowing for some overlap. The spectrograms of those are illustrated in Fig. 16. Additionally, the tuning voltages $V_\mathrm{tune,H}$ and $V_\mathrm{tune,L}$ were probed with an oscilloscope and are depicted in the same figure. In Chirp I, the spectrogram includes harmonics of the desired chirp, partly due to an intermediate amplifier and the single-ended input of the FSW85. Chirps II and III only include the desired frequency chirp, apart from some parasitics folding into the limited analysis bandwidth at approximately −40 dB. Finally, the tuning voltages illustrate the presented concept working as intended to generate the respective chirps with $V_\mathrm{tune,H}$ and $V_\mathrm{tune,L}$ going in opposite directions simultaneously.

Figure 16. Spectrogram of three frequency chirps, covering a frequency range of 0.8–12.5 GHz. Additionally, the tuning voltages $V_\mathrm{tune,H}$ and $V_\mathrm{tune,L}$ are also presented, which generate those chirps by working in opposite directions inside of one PLL.

Compared to recently published FMCW-synthesizers of Table 1, the works presented in [Reference Drechsel, Joram and Ellinger14, Reference Drechsel, Joram and Ellinger24] achieve better phase noise using a single VCO or a switchable VCO bank, respectively. Using two VCOs and subtracting their signals is, as explained above, not beneficial regarding phase noise. This is partly because designing the VCOs for higher frequencies increases their individual phase noise by 20 dB per decade [Reference van Delden, Pohl, Aufinger, Baer and Musch33]. With a singular VCO at the fundamental frequency however, the relative bandwidth is limited. Using the switchable VCO bank of [Reference Drechsel, Joram and Ellinger14], a broader spectrum of frequencies can be covered, e.g., for pulse-based applications in the UWB. However, the full bandwidth cannot be utilized to generate coherent FMCW chirps.

Table 1. State-of-the-art FMCW-synthesizers with high relevance to this work

^a The 200% offered by the equivalent VCO is only limited by the chosen PLL chip’s minimum divider value and integer range.

^b Normalized to an output frequency of 8 GHz.

^c Open-loop VCO phase noise.

The results presented in [Reference Mallach, Grys, Musch and Storch17, Reference Welp, Briese and Pohl18] both use two VCOs stabilized by an individual analog PLL, respectively. Therefore, increasing the area and power consumption by an additional PLL chip at least. Additionally, the design effort is more than doubled based on the necessity of two loops that work synchronously against each other. Most notably, the presented system is the only one achieving a relative bandwidth of >100% with a single PLL or DDS. With the approach presented in this work, such a system’s hardware and design effort could be reduced to one PLL. Finally, to utilize the concept for the frequencies covered in [Reference Welp, Briese and Pohl18], an additional prescaler output can be used, as is common practice with single RF-VCOs.