Phase nonlinearity estimation

Phase nonlinearity measurement is one of the crucial tasks for each phase correlators to detect unknown frequencies from an external threat. A simple block diagram of phase correlator is shown in Fig. 2. In this figure, the input RF signal is split into two components to produce LO (P₂) and delayed RF signals (P₄) for the correlator. Basic homodyne technique has been followed to make LO signal from incoming RF components (P₂). This is done by applying cascaded amplifications over P₂ to generate P₃. Thus, characteristics of the output signal of the multistage amplifier (P₃) are no longer a linear signal. Hence, P₃ is a highly nonlinear signal. Finally, to generate in-phase (I) and quadrature-phase (Q) output, this highly nonlinear signal has been passed through a 3 dB hybrid, and it generates two outputs, viz., A cosθ{r(t)} and A cos(θ − π/2), where A is the amplitude of the signal. Now both the paths P₁–P₂–P₄–P₅/Q₅ and P₁–P₂–P₃–P₅/Q₅ should be in phase except D_n (delay component) in the delayed channel. The final output {y _p(t)} of the “I” mixer is detected by auto-correlating reference {r(t)} and the delayed signal {d(t)}. Phase data of any correlator (Ѳ _inf) is a modulo-2π wrapped and finally calculated by tan − 1{y _p(t)/y _q(t)}, where y _q(t) is the output of the “Q” mixer. Ideally, Ѳ _inf must be linear, but practically, it is merely impossible due to several nonlinearities in the system. These nonlinearities are responsible for phase deviations in the Ѳ _inf. One of the reasons of phase nonlinearity is the presence of harmonics at the output of the amplifier when it operates beyond P1dB. It triggers amplitude modulation (AM) to phase modulation (PM) conversion in the output signal. There are several other reasons for phase nonlinearity in the final signal like improper line ratios and inappropriate unwrapped phase values at the end of the successive delay lines of various phase correlators [Reference Sarkar, Raghu and Sudeesh15]. Hence, phase nonlinearity estimation is essential not only for analog circuitry correction but also for digital processing (unwrapped phase data Ѳ _inf). The line ratios (r _l = L _Dn/L _Dn − 1) between various phase correlators can exhibit different types of phase nonlinearities for final frequency calculations. When phase error lies on both sides of the reference phase, then for 3.5 line ratio, the algorithm can tolerate ±40° {±180°/(1 + r _l)} phase nonlinearities (max.). Thereby, if phase nonlinearity crosses ±40°, then the algorithm either breaks or produces errors in the final resolved frequency (specification <3 MHz rms cannot be achieved). Practically, retaining exact line ratio for all the phase correlators is merely impossible over this temperature (−40°C to +71°C) due to uneven lengths. In improper line ratio, abrupt phase change can digitally be corrected but phase deviation due to nonlinear operation of active components must be corrected in the analog domain to reduce the burden over the digital algorithm. As mentioned earlier, high amplifying gain block gets very low signal (≈−55 dBm) from the external world and converts it into high-level signal (>15 dBm). LO generation block further rectifies, equalizes the input power, and makes a fixed output power suitable for phase correlators. Thereby, phase deviation due to AM–PM conversion can be estimated as mentioned in [Reference Acciari, Colantonio, De Dominicis and Rossi16, Reference Medhurst, Roberts and Walsh17]. Let us assume RF_in(t) incident at the input (P1) of the phase correlator as mentioned in Eq. (1).

(1)\begin{equation}{\textrm{R}}{{\textrm{F}}_{{\textrm{in}}}}\left( t \right) = {k_1}m\left( t \right)\,\cos \left[ {{\omega _{\textrm{c}}}t + \theta \left( t \right) + {\emptyset _1}\left( {{f_{\textrm{c}}}} \right)} \right],\end{equation}

where k ₁, ϕ ₁(f _c), m(t), and θ(t) are attenuation (loss) and phase shift related to the electrical path from input to P₂, instantaneous amplitude, and phase of the input signal, respectively. The amplified (n-fold) output signal (at P₃) is given by Eq. (2), where F[k ₁m(t)] and φ_j[k ₁m(t)] are the AM compression characteristic and AM–PM conversion component, respectively.

(2)\begin{align}{P_{{\textrm{final}}}}\left( t \right) & = \mathop {\mathop \prod \nolimits}\limits_n^{i = 1} {\left\{ {F\left[ {{k_1}m\left( t \right)} \right]} \right\}_i} \nonumber\\ & \quad\times \cos \left( {{\omega _{\textrm{c}}}t + \theta \left( t \right) + {\emptyset _1}\left( {{f_{\textrm{c}}}} \right) + \mathop {\mathop \sum \nolimits}\limits_n^{j = 1} {\varphi _j}\left[ {{k_1}m\left( t \right)} \right]} \right).\end{align}

Figure 2. Schematic diagram of a sample phase correlator.

Then LO signal is then passed through a 3dB hybrid, mixer, etc. It changes total attenuation (k ₂) and phase {ϕ_t(f _c)} for the corresponding paths. φ _j[k ₁m(t)], the phase deviation, is generally the function of the instantaneous signal of m(t) [Reference Clark, Silva, Moulthrop and Muha18]. Thereby, highly nonlinear m(t) produces large phase deviation at the output {y _p(t)}. Signal r(t) and d(t) at the LO and RF port of mixer are given by Eqs. (3) and (4), respectively.

(3)\begin{align}r\left( t \right) & = \mathop {\mathop \prod \nolimits}\limits_n^{i = 1} {\left\{ {F\left[ {{k_2}m\left( t \right)} \right]} \right\}_i} \nonumber\\ & \quad\times\cos \left( {{\omega _{\textrm{c}}}t + \theta \left( t \right) + {\emptyset _t}\left( {{f_{\textrm{c}}}} \right) + \mathop {\mathop \sum \nolimits}\limits_n^{j = 1} {\varphi _j}\left[ {{k_1}m\left( t \right)} \right]} \right),\end{align}

(4)\begin{equation}d\left( t \right) = {k_1}m\left( t \right)\,\cos \left[ {{\omega _{\textrm{c}}}t + \theta \left( t \right) + {\emptyset _1}\left( {{f_{\textrm{c}}}} \right) + \mathop {\mathop \sum \nolimits}\limits_m^{l = 1} {\emptyset _l}\left( {{f_{\textrm{c}}}} \right)} \right].\end{equation}

Although gain blocks in the delayed path of the phase correlator (as shown in Fig. 2) have not been considered but amplification is required to compensate the extra losses contributed by the delay lines. Then the calculation of the overall phase deviation becomes very complex; thereby, the RF-delayed path is kept amplifier free. Output after filtering at the mixer port will be a low-frequency component of the complex signal as mentioned in Eq. (5), where T(t) and χ(t) are amplitude and complex phase of the output signal, respectively. The value of the complex nonlinear phase has also been estimated in Eq. (6).

(5)\begin{equation}{y_{\textrm{p}}}\left( t \right) = r\left( t \right) + d\left( t \right) = T\left( t \right)\,\cos \chi \left( t \right),\end{equation}

(6)\begin{equation}\chi \left( t \right) = \mathop {\mathop \sum \nolimits}\limits_m^{l = 1} {\emptyset _l}\left( {{f_{\textrm{c}}}} \right) + \mathop {\mathop \sum \nolimits}\limits_n^{j = 1} {\varphi _j}\left[ {{k_1}m\left( t \right)} \right].\end{equation}

It is known that when instantaneous amplitude m(t) reaches the maximum value of m _max, then obviously φ_j[k ₁m(t)] also attains its maximum value of Δφ_j[k ₁m _max]; this is the phase variation arising from the nonlinear behavior of the cascaded amplifiers. Thus, Eq. (7) gives the maximum phase deviations for the maximum amplitude of m(t), where ψ ₀ is small signal phase shift of all the amplifiers.

(7)\begin{equation}\mathop \sum \limits^{{\textrm{l}} = 1}_{\textrm{m}} {\emptyset _{\textrm{l}}}\left( {{{\textrm{f}}_{\textrm{c}}}} \right) + \mathop \sum \limits^{{\textrm{j}} = 1}_{\textrm{n}} {{{\varphi }}_{\textrm{j}}}\left[ {{{\textrm{k}}_1}{\textrm{m}}{{\left( {\textrm{t}} \right)}_{\ }}} \right] = \mathop \sum \limits^{{\textrm{l}} = 1}_{\textrm{m}} {\emptyset _{\textrm{l}}}\left( {{{\textrm{f}}_{\textrm{c}}}} \right) + {{{\psi }}_0} + \mathop \sum \limits^{{\textrm{j}} = 1}_{\textrm{n}} {{\Delta }}{{{\varphi }}_{{j}}}\left[ {{{\textrm{k}}_1}{{\textrm{m}}_{{\textrm{max}}}}} \right] \end{equation}

The overall phase deviation due to other components including nonlinear behavior of the gain blocks is estimated by Eq. (8).

(8)\begin{equation}\mathop {\mathop \sum \nolimits}\limits_m^{l = 1} {\emptyset _l}\left( {{f_{\textrm{c}}}} \right) + {\psi _0} + \mathop {\mathop \sum \nolimits}\limits_n^{j = 1} \Delta {\varphi _j}\left[ {{k_1}{m_{\max }}} \right] = \psi + \Delta \psi \left( {{k_1}{m_{\max }}} \right).\end{equation}

It is theoretically possible to derive phase deviation due to nonlinear behavior of the amplifiers and can be written as in Eq. (9).

(9)\begin{align}\Delta {{\psi }}\left( {{{\textrm{k}}_1}{{\textrm{m}}_{{\textrm{max}}}}} \right) & = {{0.707} \over {\sqrt {{{\textrm{P}}_{1{\textrm{max}}}}} }}{\cos ^{ - 1}}\nonumber\\ &\quad \times{\left[ {{{{{\textrm{P}}_{5{\textrm{max}}}} - {\textrm{k}}_2^2{{\textrm{P}}_{3{\textrm{max}}}} - {{\left( {{{{{\textrm{k}}_3}} \over {{{\textrm{k}}_1}}}} \right)}^2}{{\textrm{P}}_{2{\textrm{max}}}}} \over {2{{{{\textrm{k}}_2}{{\textrm{k}}_3}} \over {{{\textrm{k}}_1}}}\sqrt {{{\textrm{P}}_{2{\textrm{max}}}}.{{\textrm{P}}_{3{\textrm{max}}}}} }}} \right]_{\ }} - \partial {{\psi }}\end{align}

where ∂ψ is expressed as in Eq. (10)

(10)\begin{equation}\partial{\psi} = {\cos^{- 1}}\left[ {{{\textrm{P}}_{5{\textrm{max}}}} - {\textrm{k}}_2^2{{\textrm{P}}_{3{\textrm{max}}}} - {{\left( {{{{{\textrm{k}}_3}} \over {{{\textrm{k}}_1}}}} \right)}^2}.{{\textrm{P}}_{2{\textrm{max}}}}} \over {2{{{{\textrm{k}}_2}{{\textrm{k}}_3}} \over {{{\textrm{k}}_1}}}\sqrt {{{\textrm{P}}_{2{\textrm{max}}}}.{{\textrm{P}}_{3{\textrm{max}}}}} } \right]\end{equation}

Phase deviation derivation requires amplitude information from the first to the last stage as per Eq. (9). Thus, to calculate the phase nonlinearity of a subsystem, each stage must be probed and accurate amplitude information must be picked up, which is a laborious task and not always practically feasible. Hence, a comparably easier method has been adopted to calculate the final phase nonlinearity by fetching only last stage amplitude information y _p(t) and y _q(t), respectively. This calculation is carried out in excel sheet without using any software. It is known that wrapped phase information can easily be calculated from I and Q waveforms using Eq. (11).

(11)\begin{equation}{\emptyset _{{\textrm{wrap}}\left( {{\textrm{new}}} \right)}} = {\textrm{Round}}\left| {\left( {{{180} \over {{\pi }}}{{\chi }}\left( {{{{Q_{{{\textrm{D}}_{\textrm{m}}}}}} \over {{P_{{{\textrm{D}}_{\textrm{m}}}}}}}} \right) + 180} \right)} \right|,\end{equation}

where ϕ _wrap(new) is the wrapped phase of the phase correlator and χ(Q _Dm/P _Dm) is defined below to fetch accurate phase information depending upon Q _Dm and P _Dm outputs as mentioned in Eq. (12). Maximum limit of m is 5 for this receiver, and its limit may increase or decrease depending upon the output frequency resolution and input frequency band.

(12)\begin{align}&{\left. {X\left( {{{{Q_{{{\textrm{D}}_{\textrm{m}}}}}} \over {{P_{{{\textrm{D}}_{\textrm{m}}}}}}}} \right)} \right|_{{f_n} = \left\{ {{f_1},{f_2},{f_3}, \ldots {f_n}} \right\}}} \nonumber\\ &= \left\{ {\begin{matrix} {{{\tan }^{ - 1}}{{{Q_{{{\textrm{D}}_{\textrm{m}}}}}} \over {{P_{{{\textrm{D}}_{\textrm{m}}}}}}}} & {{\textrm{if}}\;{P_{{{\textrm{D}}_{\textrm{m}}}}}\;{\textrm{and}}\;{Q_{{{\textrm{D}}_{\textrm{m}}}}} \gt 0} \\ { - {\pi \over 2} + {{\tan }^{ - 1}}{{{Q_{{{\textrm{D}}_{\textrm{m}}}}}} \over {{P_{{{\textrm{D}}_{\textrm{m}}}}}}}} & {{\textrm{if}}\;{Q_{{{\textrm{D}}_{\textrm{m}}}}} \gt 0\;{\textrm{and}}\;{P_{{{\textrm{D}}_{\textrm{m}}}}} \lt 0} \\ {{\pi \over 2} + {{\tan }^{ - 1}}{{{Q_{{{\textrm{D}}_{\textrm{m}}}}}} \over {{P_{{{\textrm{D}}_{\textrm{m}}}}}}}} & {{\textrm{if}}\;{Q_{{{\textrm{D}}_{\textrm{m}}}}} \lt 0\;{\textrm{and}}\;{P_{{{\textrm{D}}_{\textrm{m}}}}} \gt 0} \\ { - {\pi \over 2} - {{\tan }^{ - 1}}\left( {{{{Q_{{{\textrm{D}}_{\textrm{m}}}}}} \over {{P_{{{\textrm{D}}_{\textrm{m}}}}}}}} \right)} & {{\textrm{if}}\;{Q_{{{\textrm{D}}_{\textrm{m}}}}} \lt 0\;{\textrm{and}}\;{P_{{{\textrm{D}}_{\textrm{m}}}}} \lt 0} \\ {{\textrm{undefined}}} & {{\textrm{if}}\;{P_{{{\textrm{D}}_{\textrm{m}}}}} = {Q_{{{\textrm{D}}_{\textrm{m}}}}} = 0} \end{matrix} } \right.\end{align}

Few instantaneous unwrapped phases are calculated by using Eq. (11–16) (as samples) to understand the steps carried out in the excel sheet. Let us consider three sets of random instantaneous values of (Q _Dm, P _Dm) (0.25581, −0.07267), (−0.18957, 0.01074), and (−0.10616, −0.11196) for m = 3, 4, and 5, respectively. Thereby, second, third, and fourth conditions of Eq. (12) have been satisfied for the first, second, and third set of values, respectively, to calculate χ(Q _Dm/P _Dm). These calculated values are −0.27679, 3.084999, and −2.32961. The instantaneous wrapped phase can be calculated by putting χ(Q _Dm/P _Dm) values into Eq. (11), and the calculated wrapped phase are 164°, 357°, and 47°, respectively. The instantaneous wrapped phase of any delay line must be unwrapped to calculate final phase nonlinearities of that respective delay lines. Instant number of cycle (C_N, count increased by 1 when it crosses 360°) for any delay line (D _m) must be known to unwrap phase from wrapped phase data (ϕ _wrap(new)). This can be calculated by using unwrapped phase of D _m-1th delay line (ϕ _unwrap(new)), line ratio, and wrapped phase of D _mth delay line (ϕ _wrap(new)), respectively. Another simple way of calculating the value of C_N is by counting how many 360° cycles are completed within the wrapped phase itself. In the same way, line ratio is calculated from the slope of the unwrap phase of subsequent lines. If the slope of the unwrap phase of mth and (m + 1)th are R_m and R_{m +1}, respectively, then the line ratio is calculated by Eq. (13).

(13)\begin{equation}{R_l} = \frac{{{R_{m + 1}}\left( {{\emptyset _{\left( {m + 1} \right),{\text{ }}unwrap(intial)}}} \right)}}{{{R_m}\left( {{\emptyset _{m,{\text{ }}unwrap(intial)}}} \right)}}.\end{equation}

Now C_N is defined in terms of R _l by

(14)\begin{align}{C_N} & = Round(MOD(Round\left\{ \left( {{{{\emptyset _{unwrap\left( {new} \right)}}\left( {{D_{m - 1}}} \right) \times {R_l}} \over {360}}} \right) \right.\nonumber\\ &\qquad\qquad\qquad\qquad\left.- {\ }\left( {{{{\emptyset _{wrap\left( {new} \right)}}\left( {{D_m}} \right)} \over {360}}} \right),{R_l} \right\} \end{align}

where m = 2, 3, 4, … for an instance, consider m = 5, then N = 1, 2, … 4 and the C ₄ can be written as in Eq. (15)

(15)\begin{align}{C_4} & = Round(MOD(Round\left\{ \left( {{{{\emptyset _{unwrap\left( {new} \right)}}\left( {{D_4}} \right) \times {R_4}} \over {360}}} \right) \right.\nonumber\\ & \qquad\left.- \left( {{{{\emptyset _{wrap\left( {new} \right)}}\left( {{D_5}} \right)} \over {360}}} \right),{R_1} \times {R_2} \times {R_3} \times {R_4} \right\}\end{align}

The precise unwrapped phase ϕ _unwrap(pre) for D _m delay line is calculated using Eq. (16).

(16)\begin{align} {\emptyset _{unwrap\left( {pre} \right)}}({D_m}) & = {\left. {{C_N}} \right|_{{D_{m = {D_2}to{\ }{D_{5{\ }}}}}}} \nonumber\\ &\quad\times 360 + {\ }Round\left| {{{180} \over \pi }\chi \left( {{{{Q_{Di}}} \over {{P_{Di}}}}} \right) + 180} \right|{\textrm{ }}\end{align}

Previously calculated wrapped phase values (164°, 357°, and 47°) can be used to compute instantaneous unwrapped phases using Eq. (16). Computed C_N values for above three wrapped phases are 0, 0, and 7, respectively. Now final unwrapped phases for the above values are 164°, 357°, and 2567°, respectively. Ideal instantaneous unwrap phase now must be calculated to find out phase deviations for the respective delay lines. For n discrete frequency points (where n discrete points cover the whole bandwidth), ideal unwrap phase is calculated by using Eq. (17), where ξ _Di, ${\bar \phi _{{\textrm{unwrap}}\left( {{\textrm{pre}}} \right)}}$, f _ci, and ${\bar f_{{\textrm{ci}}}}$ are ideal, average of calculated instantaneous unwrapped discrete phase, instantaneous average phase over f _c1 to f _cn discrete frequency points, ith input frequency, and average of total number of frequency points, respectively.

(17)\begin{align}{\aleph _{{\textrm{Di}}}} & = {\emptyset _{{\textrm{unwrap}}\left( {{\textrm{pre}}} \right)}}\left( {{D_m}} \right) \nonumber\\ &\quad - {{\mathop \sum \left( {{\emptyset _{{\textrm{unwrap}}\left( {{\textrm{pre}}} \right)}} - {{\bar \emptyset }_{{\textrm{unwrap}}\left( {{\textrm{pre}}} \right)}}} \right)\left( {{f_{{\textrm{ci}}}} - {{\bar f}_{{\textrm{ci}}}}} \right)} \over {\mathop \sum {{\left( {{f_{{\textrm{ci}}}} - {{\bar f}_{{\textrm{ci}}}}} \right)}^2}}} \times {f_{{\textrm{ci}}}},\end{align}

where f _ci = {f _c1, f _c2, f _c3, …, f _cn}

and

(18)\begin{equation} {\textrm{ Average}}\left( {{\aleph _{{\textrm{Di}}}}} \right) = {{\sum_{{\textrm{f}} = {{\textrm{f}}_{{\textrm{c}}1}}}^{{{\textrm{f}}_{{\textrm{cn}}}}} {\aleph _{{\textrm{Di}}}}} \over {\mathop \sum {{\textrm{f}} = {{\textrm{f}}_{{\textrm{c}}1}}}^{{{\textrm{f}}_{{\textrm{cn}}}}} {\textrm{f}}}} \end{equation}

Now the final ideal unwrap phase is

(19)\begin{align}{\xi _{{\textrm{Di}}}} & = {{\mathop \sum \left( {{\emptyset _{{\textrm{unwrap}}\left( {{\textrm{pre}}} \right)}} - {{\bar \emptyset }_{{\textrm{unwrap}}\left( {{\textrm{pre}}} \right)}}} \right)\left( {{f_{{\textrm{ci}}}} - {{\bar f}_{{\textrm{ci}}}}} \right)} \over {\mathop \sum {{\left( {{f_{{\textrm{ci}}}} - {{\bar f}_{{\textrm{ci}}}}} \right)}^2}}} \nonumber\\ &\quad\times {f_{{\textrm{ci}}}} + {\textrm{Average}}\left( {{\aleph _{{\textrm{Di}}}}} \right).\end{align}

Ideal unwrapped phases have been calculated by using Eq. (19) against the practically computed unwrapped phase values (164°, 357°, and 2567°). Calculated new ideal unwrap phase values are 159.3°, 368.77°, and 2618.22°. If the system were purely ideal, then the above calculated unwrap phase values would have been 159.3°, 368.77°, and 2618.22° instead of 164°, 357°, and 2567°, but practically that is not possible.

(20)\begin{equation}\Delta \xi = {\emptyset _{{\textrm{unwrap}}\left( {{\textrm{pre}}} \right)}}\left( {{D_m}} \right) - {\xi _{{\textrm{Di}}}} \approx \Delta \psi \left( {{k_1}{m_{\max }}} \right).\end{equation}

Equation (20) is used to find out the phase nonlinearity for any phase correlator, where Δξ is the computed phase nonlinearity. Thus, calculated final phase nonlinearities for m = 3, 4, and 5 are 4.61°, −11.77°, and −51.22°, respectively, for the above ϕ _unwrap(pre) values. The whole exercise is carried out in the excel sheet. Error in computed phase nonlinearity by following this method is <1% from actual value due to rounding off ϕ _unwrap(pre). Phase nonlinearity calculation is easily carried out instead of using Eq. (9).

Design problem identification

All sub-modules used in these phase correlators are tested separately and then integrated within a metallic housing. Then stage-by-stage evaluation is carried out. At last, final frequencies are resolved and error frequency calculated by subtracting the resolved frequencies from applied input frequencies. Resolved and error frequencies have been plotted against input frequency and shown in Fig. 3 for three various power levels, that is, low (−55 dBm), medium (−25 dBm), and high (+5 dBm), respectively. From the figure it is evident that error frequencies in most of the discrete frequency points are very high at all the power levels (from the specified values, especially at higher power levels). It is about ±200 MHz in few frequency points and more than ±50 MHz in many of the frequency points. Thus, the calculated rms value of the error frequency is far more than 3 MHz. As per specification, only ±9 MHz or 3σ absolute frequency spreading is acceptable, but the plotted error as shown in Fig. 3 is far beyond the acceptable specifications. Thus, root cause analysis of this fault has now been initiated in the backward direction from the error frequency calculation. During investigation, it was found that the phase nonlinearity data inspection was unfortunately skipped while evaluating the module. This was the last step, which had to be performed before error frequency calculation but missed due to the high confidence level of precision. Now phase nonlinearity of each phase correlator has been checked and plotted against input frequency. Measured phase nonlinearities for five phase correlators at mid power level (−25 dBm) are shown in Fig. 4. Measured phase nonlinearity for D4 and D5 phase correlators are the worst comparably from D1, D2, and D3, respectively. Overall phase nonlinearity of D5 phase correlator is almost ±60° for most of the frequency pockets and reaches −85° between 1 and 2 GHz bands at room temperature (RT) itself! Phase nonlinearity of D4 line is also very poor for 1–3 GHz, 6–7.5 GHz, and beyond 9 GHz frequency bands, respectively, as per Fig. 4 at RT. Maximum phase nonlinearity that can be accommodated for any correlator is ±40° for r _l = 3.5 over the temperature −40°C–71°C. Now it is clear that why is error frequency far beyond 3 MHz rms? Thereby, fault finding process has been carried out one step backward to verify amplitude and shapes of y _p(t) and y _q(t) for all the phase correlators. Power levels for all LO and RF ports of phase correlators had been set enough; hence, output of I and Q levels are >±180 mV at the evaluation stage. This is another internal specification for digital processor card to avoid least significant bit resolution issue of analog to digital converter. A sample I and Q output of D₅ correlator is shown in Fig. 5. Here I and Q levels are abruptly changing over frequency, and in some places, I and Q levels do not reach the specifications (>±180 mV). The most significant issue noticed is that the phase difference between I and Q output is randomly varying over frequency instead of maintaining at 90°. Ideally, phase shift between I and Q output must exactly be 90° over the whole frequency band. This is one of the major reasons of very high-phase nonlinearities for D₄ and D₅ phase correlators, respectively. Same issue has also been observed for the other correlators but with less intensity. This phenomenon indicates that there must be phase irregularities between I and Q channels of all phase correlators. Hence, again all the power and phase levels of d(t) and r(t) for all the phase correlators have been reassessed. Unwrapped phase of Q path has been tracked with respect to I path (reference) for all five phase correlators. Measured tracked Q path phase response is shown in the Fig. 6. Measured phase variations for Q paths against reference path is >±25°, which is not at all acceptable to achieve <±35° phase nonlinearities for D₄ and D₅ phase correlators, respectively. Now power levels of I and Q paths have been investigated. Measured I and Q power levels for all LO and RF paths are shown in Figs. 7 and 8, respectively, and the levels are varying over ±4 dBm and ±8 dBm. Response of LO and RF power levels are not flat enough, as well as interchannel power variations are also very high. I and Q output voltages do not reach the specified level (>±180 mV) at the higher frequencies due to abrupt flatness (±8 dBm) of RF channels. These above mentioned problems are the main troublemakers for increasing the final phase nonlinearities of the phase correlators; thus, these issues must be addresses with proper solutions.

Figure 3. Final calculated error frequency against applied input frequency over 1–10 GHz band.

Figure 4. Measured phase nonlinearity for five phase correlators.

Figure 5. Measured I and Q output voltage level for D5 phase correlators at the output port for the 1–10 GHz band.

Figure 6. Measured Q path relative phases over I reference path for five phase correlators over the 1–10 GHz band.

Figure 7. Measured power levels for all five I and five Q LO paths (reference) in dBm against input frequency band.

Figure 8. Measured power levels for all five I and five Q RF paths (delayed) in dBm against the input frequency band.

Corrective action

Corrective actions must be taken to resolve all the above identified issues. From the above analysis, the below course of corrections must be exercised.

1. 1. LO and RF power of mixers must be set to a fixed level; thereby, I and Q waveforms become uniform over frequency.

2. 2. Maintain maximum power level difference between LO and RF to produce >±180 mV I and Q outputs, respectively.

3. 3. Phase tracking between Q and I (reference) of LO channels must be corrected. Phase tolerance between Q and I paths must be within ±10° (90 ± 10°).

4. 4. Overall, 90° phase shifts between I and Q (IF output) waveform must be maintained in all the cycles to calculate phase nonlinearity in each phase correlator.

To carry out the above steps, a sample phase correlator with arbitrary delay has been considered for experimentation. It has been decided that final corrections in the main housing will be carried out after finalizing all the above mentioned parameters in the sample phase correlator (SPC). This SPC has been experimented with various LO–RF level differences. I and Q levels, phase differences, phase nonlinearity, etc., have been measured at the output of the SPC to optimize the LO and RF power levels. This optimization helps to generate uniform I and Q voltage levels with minimum phase nonlinearity. Two samples of I outputs are shown in Fig. 9 for two different LO and RF power levels, respectively. Here outputs in (a) and (b) of Fig. 9 are for 15 dBm LO with 3 dBm RF (LO–RF = 12 dBm) and 9 dBm LO with 6 dBm RF (LO–RF = 3 dBm), respectively. Output of Q mixer of this SPC also follows the same responses thus not included here. Phase difference between I and Q of Fig. 9(b) is almost 90° rather varying randomly in the case of Fig. 9(a). From the above figure, response of (b) is more convincing in all the respects. Hence, it can be predicted that phase nonlinearity will be controlled in case of (b) instead of case (a), respectively. A sample I and Q waveform for 15 dBm LO and 12 dBm RF is shown in Fig. 9(c). Here I and Q waveforms are not uniform due to highly nonlinear RF signal. Phase shift between I and Q waveforms are also not maintained at 90° due to nonlinearity effects. Wrinkles in I and Q waveform create high-phase nonlinearity at the output. From the above experiment, satisfactory output has come with 9 dBm LO and 6 dBm RF power (LO–RF = 3 dBm) with M1-0012 mixer part. Thereby, these power levels have been standardized for all the phase correlators. In both the cases (“a” and “b”), amplifiers are in nonlinear region but in case of (b), power level of LO is less from (a) and RF power level just beyond the P1dB (4 dBm). Thereby, this combination will push amplifiers in the reference path into less nonlinearity as compared to (a) and will procure better phase nonlinearity. Phase difference between I and Q output is shown in (d) and is almost 90°. Hence, gaps between two waveforms are equally maintained in each cycle. From the above experimentation, it is evident that when incident LO power is average drive level and RF power is just beyond P1dB of the mixer then, I and Q waveforms are almost uniform. Thus, phase nonlinearity is also controllable. This approach is implemented to all phase correlators of the main housing. Corrected and measured power levels for all 10 LOs (I and Q) are shown in Fig. 10. This is done by putting various equalizers having different slopes and attenuators [Reference Sarkar, Anand and Sivakumar19, Reference Sarkar, Anand and Sivakumar20]. Power adjustment has been carried out from P₂ (in Fig. 2). Several discrete component equalizers with linear and parabolic characteristics have been designed and used to improve RF power levels. Flatness of all LO channels have been corrected using the above technique. Judicious use of attenuators keeps each amplifier just beyond P1dB. This method does not push the next amplifier unnecessarily into hard saturation. Specification for LO drive level is set to 9 ± 1.5 dBm for the entire band. Adjusted and measured power levels for all 10 RF (I and Q) delayed paths are shown in Fig. 11. Here 6 dBm minimum (8 ± 1.5 dBm) power is set at the highest frequency. It is observed that usage of more equalizers across amplifiers produce oscillations due to amplifier mismatch (input/output). Thus, flatness improvement is not carried out beyond the above mentioned limits. Difference of power level between LO (reference) and RF (delayed) is shown in Fig. 12. Here the difference is within ±1.5 dB. This power level difference before amplitude adjustment was ±3.5 dB with 8 dB positive slope as shown in Figs. 7 and 8. Power level and flatness correction have fulfilled the first two objectives (i and ii). Now, next target is to keep 90° ± 10° phase tracking between Q and I LO. Phase of I and Q LO paths have to be fine-tuned to achieve it. Tracked phase data were not smooth (as shown in the Fig. 6) due to the presence of over/undershoots in the power level at those points. When power level varies randomly, then it experiences more nonlinearities and the results abrupt phase deviation at the output. Equalizers that were used for power adjustment also helped significantly to improve phase flatness. In the development stage, each module was evaluated by tracking amplitude, flatness, P1dB (by adjusting input power and current), best harmonics performance, etc. Phase tracking for few sub-modules were not done carefully assuming it may not affect final output substantially. Henceforth, each channel is tracked with better phase-tracked components. All active and passive components are phase matched within 5°. Every channel is tuned by readjusting the lengths. Extra stubs are also used in few places to keep phase tracking <5°. Various types of transmission lines are also used to keep phase convergence within limit. Power levels have again been readjusted after phase match to keep every parameter within the committed targets. Phase tracking of Q against I channels is shown in Fig. 13. Here tracked phase responses are smooth without abrupt over/undershoots due to corrections. Measured phase of Q channels from reference (I channel) is within 90° ± 11.5°, which is close to the targeted tolerance value (±10°). This correction leads 90 phase shift between I and Q waveform at the mixer output; thus, the other two objectives are also fulfilled (iii and iv). Initially, mixers of I and Q channel were not phase-tracked. Phase imbalance between I and Q mixers also contribute to the final phase nonlinearities. Thus, they are also now phase-tracked and five different pairs have been made according to their phase responses. Phase-tracked mixers for I and Q channels are shown in Fig. 14. All the phase and amplitude tracking have been carried out by using vector network analyzer as input and output frequencies are the same (before down conversion). Instantaneous I and Q discrete data samples have been collected (for entire band) by using a simple program with the help of digital accumulation card (DAQ).

Figure 9. Measured power levels phase correlator with arbitrary delay length. (a) I output with high LO and RF power; (b) I output with proper LO and RF power; (c) Output I and Q waveform for high LO and RF input; (d) Output I and Q waveform with almost 90° equal phase difference in all the cycles for 9 dBm LO and 6 dBm RF input.

Figure 10. Measured power levels for all 10 I and Q LO ports in dBm of five sets of phase correlators.

Figure 11. Measured power levels for all 10 I and Q RF paths in dBm at phase correlator input ports.

Figure 12. Measured power level difference for all 10 I and Q LO–RF paths at I and Q port of phase correlators of 1–10 GHz frequency band.

Figure 13. Corrected and measured Q path phase over I reference path for five phase correlators.

Figure 14. Measured phase tracking response of I and Q path mixers against reference mixer used in the five phase correlators.

Result discussion

Finally, phase nonlinearity check has been carried out after fulfilling all the above objectives. Routing of I and Q output lines is done carefully with proper grounding. Now DAQ is connected to fetch the output of all five phase correlators simultaneously. The whole data sample collection process is semi-automatic. Initially, few I and Q data samples have been collected and examined. LO and RF port of the phase correlator has been matched slightly based on the nature of I and Q samples. This small modification (gaps between RF tracks and mixer modules) has smoothened the I and Q outputs, especially for D₄ and D₅ (which having longest delay lines). Extra substrate has been used to fill the unwanted gaps beneath the RF interconnects wherever gaps are >100 µm. It has improved the quality of I and Q data. This process in turn improves the final phase nonlinearity. Wrapped phase of arbitrary delay (>D₃) phase correlator is shown in Fig 15. Wrapped phase comparison between before and after corrections (I and Q path power levels and phase adjustments) is shown here. As shown in Fig. 15, wrapped phase is highly nonuniform over frequency before power levels and phase corrections (dotted line response) were not carried out. Hence, phase nonlinearity was very high at lower frequencies. Most alarming issue in phase data was that same amount of phase information had been repeating for multiple frequency points due to non-uniformity. Hence, it was merely impossible to resolve the final frequency by using digital algorithm. Corrected wrapped phase has not produced such non-uniformities; thus, frequency resolve algorithm can easily be applied over it. Final phase nonlinearity for D₅ having longest delay line is shown in Fig. 16. Maximum measured phase nonlinearity (in Fig. 16) is well within ±35° for r _l = 3.8. Controlled phase nonlinearity is achieved for 1–2.5 GHz bands (within −40° to +22°) as compared to previous data (−85° to +58°). Overall phase nonlinearity in Fig. 16 is within ±25° throughout the band except few random pockets. Phase nonlinearities for other phase correlators have also been calculated as well. Nonlinearity response for D₅ phase correlator is only shared here as it has contributed to maximum phase nonlinearities among all the phase correlators. Calculated phase nonlinearities for D₁, D₂, D₃, and D₄ phase correlators are within ±15°, ±17°, ±20°, and ±22°, respectively. Error frequency and final resolved frequency have been calculated by using asymmetric digital algorithm. Better algorithm can calculate output frequency with better accuracy for the same kind of input I and Q waveforms [Reference Medhurst, Roberts and Walsh17, Reference Clark, Silva, Moulthrop and Muha18]. To prove the concept, four modules have been developed and evaluated over temperature (–40°C to +71°C). RF and digital sections of this receiver have been shown in Fig. 17(a) and (b), respectively. Digital card is stacked over multi-stacked RF module. Final resolved frequency and error frequency have been plotted in Fig. 18. Here error frequency is <±9 MHz and calculated rms frequency is 2.6 MHz, which is well within the specification (<3 MHz). Digital processing card is used to hold frequency consistency by correcting the final output digitally over wide temperature range (–40°C to +71°C) and other environmental specification requirements (ESS, SOFT, and QT).

Figure 15. The sample phase comparison between measured wrapped phase before correction and after correction of D₅ phase correlator.

Figure 16. The measured final phase nonlinearity of D₅ phase correlator.

Figure 17. The developed prototype: (a) RF section and (b) digital section.

Figure 18. The measured final output frequency and error frequency.