Basic topology

The basic topology of the LNA is the well-known cascode (CC). For broadband amplifiers in general, it is one of the favorite basic topologies, because of its reduced Miller effect. The Miller effect is mainly caused through the parasitic Miller-Capacitance C _m between the collector and the base node of a common emitter stage (CE). The reduction of this capacitance is achieved through the low input impedance of a common base stage (CB), which is stacked onto the collector node of the CE. Furthermore, this reduces the time constant τ ≈ R _L · C _m and enhances, in the same way, the bandwidth of the LNA. A drawback of the topology-based bandwidth enhancement is the slightly higher noise figure. The reason for that is the additional noise contribution of the CB stage. Additionally, the isolation of the LNA benefits also from the stacked CB transistor, which is important for a VNA. The gain of a basic CC can be described (based on [Reference Razavi6, Reference Gray, Hurst, Lewis and Meyer7]) in a good approximation with the following expression:

(1)$$ A_{V}(s)=-{g}_{m} \cdot (\underline{{Z}}_{out,CC}(s) \vert \vert \underline{{Z}}_{L}(s)). $$

In equation (1), g _m is the transconductance, Z_out,CC(s) describes the output impedance of the CC and Z_L(s) stands for the load impedance, which is seen by the CC. Equation (1) shows that the gain of the basic CC depends directly from the load impedance Z_L(s), and indirectly from the load current, which affects the transconductance g _m.

Techniques for bandwidth extension

As mentioned above, a combination of various techniques is necessary to reach a bandwidth over several octaves. The first technique for bandwidth extension is a shunt feedback (FB1) from the CC output node to the base of the common emitter circuit of the CC, which can be seen in Fig. 3. The shunt feedback consists of a series connection of a TaN resistor R _f and a MIM capacitor C _f. A CC stage in its basic configuration exhibits a high gain at low frequencies. To flatten the gain at low frequencies, the proposed shunt feedback (FB1) can be used, because it reduces the gain peak of the basic CC at low frequencies and pushes simultaneously the 3 dB cut-off frequency towards a higher range. This behavior can be observed by comparing the simulation results of Fig. 4. Gain and bandwidth are coupled by the gain-bandwidth product (GBW) [Reference Gray, Hurst, Lewis and Meyer7]. Therefore, the gain reduction results in a higher bandwidth.

To improve the frequency bandwidth further, shunt peaking is implemented in the LNA. In case of shunt peaking, an additional inductance L _C is implemented in series with the collector branch of the CC, as can be seen in Fig. 3. This inductance is realized as a spiral inductor on the top metal layer of the used B7HF200 technology. To get an accurate simulation model for the shunt peaking inductance, the spiral inductor was simulated with the 2.5-D simulator from Sonnet Software, Inc. For higher frequencies, the impedance of the inductor L _C increases and compensates the reduction of the output impedance Z_out,CC(s), which is caused by the equivalent capacitance C _eq on the output of the CC. The equivalent capacitance C _eq summarizes all capacitances on the CC’s output. This results in an increased gain over a wider frequency range, compared to the basic CC circuit. With the right choice of the value of the inductor L _C, the impedance of L _C helps to reach a flat gain variation over the extended frequency range. From the time domain point of view, a higher bandwidth can be achieved by reducing the time constant τ of the CC output [Reference Lee8]. In this case, especially the rise time ${t_{C_{eq}}}$ of the parasitic capacitor C _eq is important [Reference Lee8]. Through the delayed current flow caused by the inductor L _C, the current-need of the parasitic capacitance can be better fulfilled [Reference Lee8]. Hereby, the time constant on the output of the CC can be reduced and the overall bandwidth can be extended. For simplification, the following examinations for shunt peaking is done on a single-ended CC. The load impedance Z_L consists of a series connection of the load resistance R _L and the added inductance L _C, which are in parallel to the parasitic capacitances of the CC output. All capacitances are summarized in C _eq. The impedance Z _L of the resulting equivalent circuit can be expressed according to [Reference Lee8] as follows:

(2)$$ \underline{Z}_{L}(s)=(sL_C + R_L) \parallel \displaystyle{1 \over sC_{eq}}, $$

Fig. 3. Schematic of the presented LNA with the variable gain control circuit for input matching and flat gain for all gain control levels. It includes all bandwidth extension methods. Biasing is not shown here.

Fig. 4. Simulated influences of the different bandwidth extension methods to the gain function of the LNA. To demonstrate the impact of each method, the respective circuit part was deactivated during the simulation.

which can be rearranged in

(3)$$ \underline{{Z}}_{L}(s)={\displaystyle{R_L [1+s({L_C}/{R_L})]} \over{1+sR_L C_{eq}+s^{2}L_C C_{eq}}}. $$

If the magnitude of (3) is formed, the effect of the additional inductance L _C can be further investigated:

(4)$$ \left\vert Z_L(\,j\omega) \right\vert = {R_L \sqrt{\displaystyle{(\omega {L_C}/{R_L})^2 + 1} \over{(1-\omega^2 L_C C_{eq})^2 + (\omega R_L C_{eq})^2}}}.$$

By a closer view on (4), two additional terms are perceptible related to the basic function of a RC-circuit at the output. In detail, these are the term (ωL _C/R _L)² in the numerator and the term (1 − ω ²L _CC _eq)² in the dominator. Both terms yield to a higher bandwidth. The first one increases the impedance |Z _L(jω)| for rising frequencies and the second one increases the impedance |Z _L(jω)| as well for frequencies below the resonance frequency of the LC-circuit [Reference Lee8]. Additionally, the influence of shunt peaking to the gain function of the LNA is shown by simulation. By comparing the corresponding simulated curves in Fig. 4, the bandwidth extension through shunt peaking can be observed.

With EF, the bandwidth can be further increased, as shown in Fig. 4. For this, the EF has to be loaded capacitively and moreover, specific biasing conditions must be met. The goal is a RLC series resonant behavior of the EF [Reference Trotta, Knapp, Aufinger, Meister, Böck, Dehlink, Simbürger and Scholtz9]. This leads to a gain peak at high frequencies. In combination with the gain distribution of the above described enhanced CC, the overall gain bandwidth is considerably increased, as can be seen in Fig. 4. Different to [Reference Trotta, Knapp, Aufinger, Meister, Böck, Dehlink, Simbürger and Scholtz9], the EF is placed at the output rather than at the input. This allows a much better input matching, which is important for a VNA. The EF can be seen in Fig. 3 with a current mirror biasing, which realizes the second VGC functionality (VGC_EF). To understand why the EF exhibits gain under specific conditions, it is necessary to analyze the dominant parts of the input and output impedance and the resulting behavior of the transfer function. The input impedance z _i (see Fig. 5) of a single-ended emitter follower consists in a good approximation of a series connection with the series base resistance r _b, a load resistor R _L,o and a parallel connection, which can be represented by an equivalent resistor R ₁ and a capacitor C ₁ [Reference Gray, Hurst, Lewis and Meyer7]. The equivalent circuit is shown in Fig. 5. According to [Reference Gray, Hurst, Lewis and Meyer7], the resulting expression for the equivalent input impedance z _i is

(5)$$\eqalign{z_i &= r_b + {\displaystyle{{(1 + g_m R_{L,o})r_\pi } \over {1 + s {C_\pi \over 1 + g_mR_{L,o}} (1 + g_mR_{L,o})r_\pi }} + R_{L,o}} \cr & = r_b + {\displaystyle{{R_1} \over {1 + sC_1R_1}}} + R_{L,o}.} $$

In equation (5), r _π represents the small signal input resistance, whereas C _π is the parasitic capacitance parallel to r _π. The small signal resistor r _b stands for the series resistance of the base node.

Fig. 5. Equivalent circuit of the input impedance z _i of an EF with capacitively loaded output C _L,o [Reference Gray, Hurst, Lewis and Meyer7].

For the equivalent elements R ₁ and C ₁ the following expressions can be determined [Reference Gray, Hurst, Lewis and Meyer7]:

(6)$$ R_1=(1+g_mR_{L,o})r_{\pi}, $$

and

(7)$$ C_1={\displaystyle{C_{\pi}} \over{1+g_mR_{L,o}}}. $$

If the output of the EF is capacitively loaded, which is represented in Fig. 5 by the capacitance C _L,o, the input impedance of the EF exhibits also a capacitive behavior, because the capacitor C _L,o on the output is in parallel to the load resistor R _L,o, which is a series component of the input impedance. If the condition 1/g _m < (R _s + r _b) is met through a high biasing current and a large impedance of the source R _S, which is presented here through the output of the CC, the EF acts for high frequencies on its output like an inductor [Reference Razavi6, Reference Gray, Hurst, Lewis and Meyer7, Reference Trotta, Knapp, Aufinger, Meister, Böck, Dehlink, Simbürger and Scholtz9]. As a result, the EF exhibits the same behavior as a RLC circuit. For simplification and focusing on the effect itself, a single-ended version of the EF is assumed in the following mathematical expressions. As shown in [Reference Trotta, Knapp, Aufinger, Meister, Böck, Dehlink, Simbürger and Scholtz9], the function of the gain can be approximated with the following expression for a single-ended EF:

(8)$$ \eqalign{& A(\,j\omega) \approx \displaystyle{1 \over 1\!+\!j\omega\left[r_b C_{\mu} \left({1 \over g_m} \!+\! {r_b \over \beta} \right) C_{L,o}\! +\! {r_b C_{L,o\!} \over \omega_T R_{eq,o\!}} \right]\! -\! \omega^2 {r_b C_{L,o} \over \omega_T}}}.$$

In equation (8), R _eq,o stands for the parallel connection of the output resistance r _o of the transistor and the resistive part of the load R _L,o. C _μ is the parasitic capacitance between base and collector. From equation (8), the resonance frequency ω _r can be determined to

(9)$$ \omega_r = \sqrt{{\displaystyle{\omega_T} \over{r_b C_{L,o}}}}. $$

As a result, equation (9) shows that the frequency with the maximum gain peak is anti-proportional to the load capacitance C _L,o and depends on the collector current density j _C, which influences the transit frequency ω _T of the emitter follower. In the shown LNA, the EF shifts the gain peak up to approximately 28 GHz, as can be seen in Fig. 4.

Broadband input matching

Just as with the gain function, for a wideband input matching over several decades, a combination of different matching mechanisms is necessary. For the presented LNA, two different methods are combined as can be seen in Fig. 3. To achieve an input matching for the desired bandwidth from 1 to 32 GHz, a π-network is realized at the input of each branch of the quasi-differential CC and additionally, a second method in form of a shunt feedback (FB1) is implemented, which can be seen in Fig. 3. The second method is also used for bandwidth extension of the gain function, as described before.

The major impact on the input matching function comes from the feedback branch (FB1), which is implemented between the output node and the input node of the CC on each half-circuit of the LNA. In Fig. 6, the effect of the shunt feedback (FB1) can be seen by the comparison of the curve (Case 2) with the matching function of the completed LNA (Case 4) with all matching methods included. By a qualitative comparison of both curves, it becomes obvious that for the frequency range below approximately 23 GHz the matching is mainly determined by the shunt feedback (FB1). The CC itself has an input impedance Z_in, which exhibits a strong influence from its base-emitter capacitance C _π. In Fig. 7, this behavior is shown in Case 1 (see also Fig. 6, Case 1), where the CC is simulated without any matching. The shunt feedback leads to a reduction of the imaginary part of the input impedance Z_in for low and medium frequencies, as can be seen by the comparison of Case 1 with Case 2 in Fig. 7. Additionally, the shunt feedback reduces the resistive part of Z_in, which is shown in Fig. 7, Case 2. The explanation for this is that for small signal conditions, the feedback branch is in parallel to the base-emitter resistor r _π and to C _π. According to [Reference Rogers and Plett10], this can be expressed by:

(10)$$ \underline{Z}_{in} \approx R_f \parallel \underline{Z}_{\pi} \parallel {\displaystyle{R_f + R_L} \over{g_mR_L}}.$$

Fig. 6. Simulated influences of the different used matching methods on the magnitude of S ₁₁.

Fig. 7. Simulated influences of the different used matching methods including the phase. The “Cases” are named in the legend of Fig. 6.

Here, Z_π describes the parallel circuit of the parasitic base-emitter resistance r _π with the base-emitter capacitance C _π on the CC input. As a result, the resistive part of the feedback branch lowers the real part of Z_in for low and medium frequencies as shown in Fig. 7, Case 2. By a careful choice of R _f, the input impedance can be shifted near to the matching impedance Z ₀ for low and medium frequencies. Furthermore, the shunt feedback (FB1) leads to a more broadband characteristic of the input impedance Z_in, what will be apparent from the consideration of Case 2 in Fig. 7. The resulting characteristic of the input matching is shown in Fig. 6, Case 2. For frequencies higher than 23 GHz, the matching is not good enough. To achieve a more broadband matching, an additional LC-network is implemented at the input, which forms together with Z_in and the impedance of the feedback branch a π-network. The LC-network consists of the inductor L ₁ and the MIM capacitor C ₁. The π-network influences the matching only in a limited range, as can be seen in Fig. 6. The red curve (Case 3) shows the simulated influence of the π-network in absence of the feedback branches. It consists in the simulated case only of the MIM capacitor C ₁, the inductor L ₁ and the parasitic base-emitter capacitance of the common emitter transistors T1 and T2, respectively. In the realized circuit, the capacitive behavior of the feedback branches has an impact to the overall capacitance of the π-network’s branch at the input node of the CC. Furthermore, it is obvious from Fig. 6, Case 3 that the π-network is tuned in this way that its influence to the matching function appears in the frequency range from 15 to 40 GHz. The goal of the additional LC-circuit at the LNA’s input is to compensate the capacitive characteristics of the CC with a shunt feedback to a certain extend and additionally move the resistive part of Z_in more to the optimal matching point. Both effects of the additional LC-network can be seen in Case 3 in Fig. 7, where only the LC-network is implemented at the LNA’s input without the feedback branches. For low frequencies, the LC-network does not have an effect in this constellation. The plotted curves in Fig. 6, Case 4 and in Fig. 7, Case 4, show the resulting matching of the LNA, when both methods are implemented. Unlike the traditional implementation of the shunt feedback (FB1), the MIM capacitor C _f in the feedback branch is not only implemented to separate the input- and the output-biasing. In this case, its value would be very high. For the presented LNA, the value of the capacitor C _f is chosen around C _f = 200 fF. This value was carefully chosen during the design process to place the zeros in the linear matching function in this manner that the matching is best over the desired frequency range.

Extended variable gain control circuit

In the proposed design, the standard CC topology is enhanced with a special circuit (see three dotted boxes named with FB2 and VGC in Fig. 3), which provide an adjustable variable gain and make sure that the input matching is good for all gain levels over a wide frequency range. This behavior is reached due to the additional shunt feedback (FB2) in the gain control branch, which is shown in Fig. 3 in the left and right dotted box. To improve the isolation inside the VNA, a second VGC circuit (VGC_EF) is implemented in the emitter follower output stage of the LNA, as shown in Fig. 3 on the left- and right-side.

The reason for the need of the additional shunt feedback branch (FB2) in the VGC circuit becomes clear by a closer view on the mechanism, which occurs if the transistors T5 & T6 of the VGC circuits become conductive. By becoming a lower load impedance for the common emitter transistors T1 & T2, the gain of the CC decreases. Because of the strong effect of the shunt feedback on the input impedance Z_in, the matching would also be hardly degraded, if the feedback branch becomes more and more ineffective, when the current through the upper part of the CC is shifted into the VGC circuit. To compensate the declining effect of the original shunt feedback (FB1), a second feedback branch (FB2) is implemented from VGC circuit to the base node of the common emitter transistor of the CC. The values of the resistor and the capacitance of the second feedback (FB2) are equal to the ones of feedback (FB1). The additional feedback (FB2) is implement on both half-circuits of the differential CC. To keep the influence of the feedback branch on the input impedance relatively constant over all gain levels, the values of the resistors at the collectors of transistors T5 & T6 are equal to the value of the resistors R _L on top of the cascode. The measured results are shown in the next chapter.

Stability of the LNA circuit

The impedance of a DUT, which is measured with the monolithic integrated VNA, is not in every case 50 Ω. Therefore, it can cause instabilities inside the LNA. To ensure that the LNA is stable under all possible load conditions, the K-Factor method, sometimes called the Rollet-Factor, is an often used method. The DUT connected to the LNA’s input can cause instability if the LNA is not unconditionally stable. The output load connected to the LNA can cause instability as well, if the LNA is not stable under all conditions. Especially, the use of an EF as output stage of the LNA, that acts as bandwidth extension in the before described manner, is a potential source of instability. The reason for this is the resulting RLC-resonant behavior, as mentioned above. The used MIM-capacitor at the output of the EF has a major impact to the resonant behavior of the EF. Its value must carefully be chosen. Together with the inductance of the connection lines, it can lead to oscillations and as a result, the whole circuit becomes unstable [Reference Trotta, Knapp, Aufinger, Meister, Böck, Dehlink, Simbürger and Scholtz9]. To avoid this, the connection between the CC’s output and the input of the EF is made as short as possible, to reduce the parasitic inductance to a minimum. This avoids possible oscillations, if the connection is short enough. With K-Factor simulations, the stability is checked. The results can be seen in Fig. 17 in the section “Characterization results”. As explained in [Reference Ellinger11, Reference Rollet12], the circuit is unconditionally stable, if the criteria

(11)$$ K \gt 1, \; \bigl\vert \underline{S}_{11}\bigl\vert \lt1 \quad {\rm and} \quad \bigl\vert \underline{S}_{22}\bigl\vert \lt1, $$

are fulfilled. Because the Rollet-Factor determines only instabilities caused by external loads, a further analysis is necessary to detect instabilities, which are caused through slightly negative impedances inside a stacked topology like the CC. The CC is potentially unstable, because of its CB transistor on its top. So, special care is spent, to ensure a low ohmic AC-coupled connection to ground.

To detect instabilities inside the stacked CC circuit, without affecting it, a special tool is necessary, the so-called S-Probe stability simulation [Reference Schmid, Coen, Shankar and Cressler13]. The results of the S-Probe check at the base node of the CB transistors can be seen in Fig. 18 in the section “Characterization results”.

Influence of process-tolerances

In the fabrication process, the values of the single components inside the chip vary from their ideal value, which were used in the simulation. Two reasons are responsible for that. The first and most powerful reason is the process variation over the wafer. Therefore, chips from far separated places on the wafer exhibit strongly different deviations from the ideal value. Especially for components like resistors and capacitors, the variation can be far more than ±10%. This leads to variations in the performance parameters of the realized circuit. The second source of process tolerances are the deviations between components inside a single chip, the so-called “mismatch”. They are less strong than the process variations, but due to the fact that both types of variation occur during the fabrication process, the overall tolerances depend on both. The effect of these two variations on the performance parameters can be determined through a Monte Carlo (MC) simulation.

The MC simulation is done with 1000 sweeps. Both types of variations are done at the same time. In Fig. 8, the result of the MC simulation for the S ₁₁-parameter is shown. For the correct interpretation of the simulation results, it is important to note that the density of the different S ₁₁-plots is not the same along the y-axis. Therefore, the probability becomes less to the vertical edges of the family of curves. To make this visually clear, the mean-value is calculated and plotted for each simulated frequency point. The red thick solid curve shows the mean values. As a value for the ordinary deviations, the standard deviation was calculated for each simulated frequency point over the family of curves and is plotted in the diagram as red dotted curve. The key information, which can be extracted from Fig. 8, is that the matching limit of −10 dB over the desired bandwidth can be adhered. As explained before on the input matching, a MC simulation is also done on the parameter S ₂₁. The result of the MC simulation of the gain S ₂₁ of the LNA is shown in Fig. 9. With the help of the standard deviation and the mean-value, the key information can be extracted that the gain of the LNA varies usually ±1 dB around the mean value.

Fig. 8. Monte Carlo simulation of the input matching S ₁₁ in [dB] over process- and mismatch-variations. The Monte Carlo simulation contains 1000 sweeps.

Fig. 9. Monte Carlo simulation of the LNA's gain S ₂₁ in [dB] over process- and mismatch-variations. The Monte Carlo simulation contains 1000 sweeps.

Measurement setup

The measurement of the receiver’s isolation requires a true differential excitation of the receiver’s ports. This means, that a single-ended measurement with a subsequent conversion from nodal into modal S-Parameters is not sufficient in this case. The reason is that the used Gilbert Mixer only works as a double balanced downconverter, if the switching quad is driven with a fully differential signal. The common use of a balun is not preferable in this case, because of the high input bandwidth of the receiver chain. A balun would generate mode conversion, because of its not perfect symmetry over the whole bandwidth. The measurements are done with a Keysight PNA-X with iTMSA-Option (Integrated True Mode Stimulus Application), which is implemented in firmware Option 460. This option allows the interconnection of the two internal sources of the PNA-X to one balanced source. With the help of this interconnection, two balanced ports can be realized. Therefore, the modal S-Parameters can be measured directly and furthermore, the correct excitation of the Gilbert Mixer is possible.

The calibration of an iTMSA-measurement is carried out in three steps. The first step is a power calibration over the whole measurement bandwidth. With a thermal power meter from Rohde & Schwarz & Co. KG (NRP-Z55), the power calibration is done single-ended on source 1 of the PNA-X. In step 2, a 4-Port TOSM-Calibration with a CAL-Substrate is done. By this step, the reference plane is set to the tips of the measuring probes. For the isolation measurement Z-Probes (Z040-K3K) from Cascade Microtech, Inc. are used, which have a pitch of 100 μm and a GSGSG-pinning. According to [Reference Dunsmore5], a third calibration step is necessary, especially for DUTs, which need a perfect differential excitation to have a good differential mode behavior, as well as a good common mode suppression. In general, a symmetrical differential excitation can become unsymmetrical through a not perfect matching, layout inaccuracies or inaccurate contacting [Reference Dunsmore5]. This leads to a phase-skew, which has to be compensated. For determining the phase-skew, on each of the two balanced ports, a sweep of the phase is done in this way that only one of the two single-ended ports of a balanced port is swept in its phase, whereas the other is fixed in its phase. The phase-sweep is done with the highest frequency of the operating band of the receiver chain. By means of the highest isolation, which occurs over the phase-sweep, the deviation of relative phase to the ideal phase-offset of 180^° between the two single-ended ports of a balanced port can be determined. The determined phase-skew of the DUT is inserted as an offset in the iTMSA-option of the PNA-X. The proposed receiver did not exhibit any significant phase-skew in the measurement. Therefore, no phase-offset was inserted in the iTMSA-option.

Isolation of LO- to RF-port

The isolation between the LO-Port and the RF-Port is measured by stimulating the LO-Port with a CW-signal with a power level, which has the same value, as it is used in the normal operating mode. Different to the measurement of the CG, the feedthrough power level of the LO-Signal is measured at the RF-Port at the same frequency. In Fig. 15, the lower curve (3) shows the measured LO-to-RF isolation. The measured isolation for the whole input frequency band is equal or better than 60 dB. Such a high isolation is well suited for the application of a monolithic integrated VNA. The suppression of the LO-Signal on the RF-Port is very important to avoid self-mixing of the LO on a poorly matched DUT, which is measured with the integrated VNA. Furthermore, the feedthrough of the RF signal to the LO-Port is measured, because this can lead to superposition in the other integrated VNA channels, since all LO-Ports are connected via a LO distribution network. Especially, a superposition with the reference channel would falsify the measurement results of the monolithic integrated VNA. In Fig. 15, the middle curve (2) shows the measured isolation from RF-Port to LO-Port, for the case that the gain of the LNA is set to its minimum. This means that the gain control voltage VGC (see Fig. 3) is set to 3.3 V and the Emitter Follower is fully disabled (VGC_EF = 0 V). The RF-to-LO isolation is better than 30 dB over the whole input bandwidth. For the low and middle frequency range up to 26 GHz, the isolation is better than 40 dB. As a result, the enhanced gain control function improves the isolation for a disabled measurement channel in the integrated VNA. For the case that the gain of the LNA is set to its maximum, the EF of the LNA is enabled (VGC_EF = 3.3 V), as well as the gain control voltage of the CC has to be set to VGC = 0 V. The resulting RF-to-LO isolation seems to be worse, as can be observed in Fig. 15 at the upper curve (1). But here, the gain of the LNA must be taken into account, which leads to a stronger RF signal on the downconverter’s RF-Port. With an input power of −30 dBm on the LNA and the maximum gain level of the LNA, the isolation is better than 20 dB for frequencies below 22 GHz and reaches its minimum of 15 dB at around 28 GHz.

Fig. 15. Measurement results of isolation between LO- and RF-Port and vice versa.

Isolation of LO- to IF-port

A further important feedthrough path is from LO- to IF-Port. Especially, for low measurement frequencies of the monolithic integrated VNA, where the LO frequency has only a small distance to the IF frequency in the spectrum, it is difficult to filter out the harmonics of the LO-Signal. This results in an impure output spectrum, which degrades the measurement performance of the integrated VNA significantly. Therefore, the LO-to-IF isolation has to be as high as possible. In Fig. 16, the measured isolation between the LO- and the IF-Port is shown. Over the whole LO frequency band the isolation is better than 35 dB. The LO power, which was used for the measurement, is 3 dBm on the balanced port.

Fig. 16. Measurement results of isolation between LO- and IF-Port.

K-factor analysis

According to [Reference Ellinger11, Reference Rollet12] the K-factor can be determined out of the measured or simulated S-Parameters. The K-factor can be expressed according to [Reference Ellinger11, Reference Rollet12] by

(14)$$K={\displaystyle{1- \vert\underline{S}_{11}\vert^2-\vert\underline{S}_{22}\vert^2 + \vert {\rm det}\underline{\bf\,{S}}\vert^2} \over{2 \vert\underline{S}_{12}\underline{S}_{21}\vert}}, $$

with

(15)$$ \det\underline{\bf\,{S}}=\underline{S}_{11}\underline{S}_{22}-\underline{S}_{12}\underline{S}_{21}. $$

The simulation results in Fig. 17 show that the LNA is unconditionally stable over the used frequency range, because the conditions in equation (11) are met for all frequencies.

The test is done for a frequency range of 100 MHz up to 100 GHz to ensure, that neither the relevant higher harmonics nor subharmonics can cause an instability. Note, that in Fig. 17 the K-Factor for high frequencies is too high for plotting, but it is simulated until 100 GHz.

Fig. 17. Results of the simulative stability test with K-factor method of the LNA.

S-probe analysis

With the help of the S-Probe, the input reflection coefficient Γ_IN(ω) and the output reflection coefficient Γ_OUT(ω) can be determined for every node inside a circuit without split up the single parts. Finally, by using the simulated reflection coefficients Γ_IN(ω) and Γ_OUT(ω), the Nyquist stability criterion can be determined over frequency. For this purpose, the product of Γ_IN(ω) · Γ_OUT(ω) has to be plotted. If the resulting curve encircles the point (1,0) clockwise, this indicates an instability. This is equivalent to poles in the right-half plane in the Pole-Zero-Plots, as it is typical for oscillators. In Fig. 18, the results of the stability test with the differential S-Probe is shown. Because the plotted product of Γ_IN(ω) · Γ_OUT(ω) does not nearly encircle clockwise the point (1,0) for any frequency, the tested node is stable.

Fig. 18. Results of the simulative stability test with a differential S-Probe, at the base node of the CB transistors of the CC inside the LNA. The stability test was done from f1 = 100 MHz to f2 = 100 GHz.