Theory

The current CTIA formulation for RC-induced uncertainty is based on the concept that the lack of spatial uniformity is the dominant component of uncertainty, since chambers are typically loaded for the widest channel bandwidth to be tested, which is often 4 MHz [Reference Aan Den Toorn, Remley, Holloway, Ladbury and Wang5, 17, Reference Remley, Dortmans, Weldon, Horansky, Meurs, Wang, Williams, Holloway and Wilson19]. This type of uncertainty is calculated from the variation between different independent realizations of the stepped mode-stirring sequence, which assumes uncertainty due to variations within an independent realization to be negligible. However, for a narrow channel bandwidth, such as that of NB-IoT, this is not the case. To illustrate this, we perform a significance test as described in detail in [Reference Remley, Wang, Williams, aan den Toorn and Holloway10] to determine which uncertainty should be used:

1. (1) Only the variation between independent realizations (lack of spatial uniformity) of the mode-stirring sequence is dominant. This is the current CTIA formulation.

2. (2) Both the variation due to the number of samples within the mode-stirring sequence and the variation between independent realizations of the mode-stirring sequence are included. This is the formulation we propose for NB-IoT and CAT-M1 measurements.

The “significance” is determined in an F-test [Reference Remley, Wang, Williams, aan den Toorn and Holloway10, 20] and is defined as the ratio between the variance in the between and within samples. The significance is compared to a threshold derived from a 95th-percentile of an F-distribution, with N _B − 1 and N _B(N _W − 1) degrees of freedom, respectively. The 95th-percentile corresponds to 95

(3)$$u^{2}_{\rm Ref} = {1\over N_B( N_B-1) }\sum^{N_B}_{\,j = 1} ( \langle G_{\rm R} ( b_j) \rangle_{N_W} - \hat{G}_{\rm Ref}) ^{2}.$$

If within and between differences are both significant (Formulation 2), the formulation that should be used is given by [Reference Remley, Wang, Williams, aan den Toorn and Holloway10]:

(4)$$\eqalign{ u^{2}_{{\rm Ref}} = & {1\over N_B N_W ( N_B N_W-1) } \qquad \qquad \cr & \qquad \sum^{N_W}_{i = 1} \sum^{N_B}_{\,j = 1} ( G_R( w_i,\; b_j) -\hat{G}_{\rm Ref}) ^{2}. }$$

Note that Formulation 2 yields a lower uncertainty-estimate due to the number of samples and degrees of freedom in the denominator [20]. Physically, this means that when the lack of spatial uniformity dominates the uncertainty, the uncertainty can be significantly higher unless the stirring sequence includes a large number of spatial-stirring samples [Reference Remley, Wang, Williams, aan den Toorn and Holloway10]. In the comprehensive uncertainty analysis, both the uncertainty in the reference measurement and the DUT measurement are taken into account, where $u^{2}_{\rm DUT} = N_B u^{2}_{\rm Ref}$, since typically N _B = 1 for the DUT [17]. This is because a test lab typically performs a single measurement of each device. Next, we discuss the measurement setting for estimating G _Ref, such that we can calculate the significance, and the uncertainty using both formulations. We applied the significance test to these measurements with the results described in section “results”.

Measurement setup and mode-stirring sequence

Measurements were carried out in a 4.6 m × 3.1 m × 2.8 m RC at the National Institute of Standards and Technology (NIST), as shown in Fig. 2, which has one paddle as a mode-stirring mechanism and a turntable and height translation for position stirring. A vector network analyzer (VNA) was used in all measurements, with an IF BW setting of 1 kHz, a source power of −8 dBm and a 1 kHz frequency spacing. We focus on three different sub-bands of the Cellular NB-IoT Band 2, each with a 10 MHz bandwidth, centered at 1930, 1960, and 1990 MHz. All results are shown for the frequency-averaging bandwidths of both narrowband protocols NB-IoT (180 kHz) and CAT-M1 (1.4 MHz), and one of 2 MHz, to study a more wideband protocol. We averaged all transmission-coefficient results over these three bandwidths, with which we computed G _Ref and the significance. To investigate the effects of loading, we used one measurement setup with “light loading” (two absorbers) and one with “heavy loading” (eight absorbers), resulting in CBW values of 1.5 MHz and 3.3 MHz, respectively. We calculated the CBW with a threshold of 0.5 [Reference Chen, Kildal, Orlenius and Carlsson14, 17]. The measurement setup with eight absorbers is shown in Fig. 2. The unloaded CBW is on the order of 500 kHz, which is larger than the channel bandwidth of NB-IoT. However, for this large chamber, we always introduce some loading to minimize the potential for a large amount of constructive interference damaging the DUTs. Even a small amount of RF absorber dampens the modes sufficiently to prevent such damage. We used two low-loss broadband antennas for the reference measurement, where the calibration reference plane was specified at the connectors of the antennas using an N-type electronic calibration module. We obtained the G _Ref estimate from a transmission-coefficient measurement between two antennas (as discussed in [Reference Remley, Dortmans, Weldon, Horansky, Meurs, Wang, Williams, Holloway and Wilson19]), where the second antenna was replaced with the DUT for the DUT measurement.

Fig. 2. RC setup to measure G _ref for eight absorbers. The chamber contains one vertical paddle for mode stirring, and a turntable with height translation for position stirring.

By subsetting all of the mode-stirring samples, we acquired six independent realizations (IRs) (N _B = 6), each containing 120 stepped mode-stirring samples (N _W = 120) within the mode-stirring sequence obtained from eight paddle and 15 turntable angles with 45 ∘and 24 ∘angle spacing, respectively, as shown in Table 1. IR1-3 and IR4-6 were measured at antenna heights of 0.3 and 1.3 m, respectively, where IRs with the same height have different paddle-angle offsets, as shown in Table 1. To confirm low correlation between samples, we performed a linear autocorrelation test of the data within each of the independent realizations and a Pearsons’ cross-correlation test of the data between all independent realizations. For both cases, we show the worst-case scenario, which is, according to the data, a heavily loaded case. The within correlation is shown in Fig. 3, which shows the normalized correlation value versus lag shifted copies of the entire sequence with itself. The peak correlation value of 1 at 0 sample lag occurs because the exact same two arrays are being compared. Lag shifting the sequence over by one sample with itself, in either direction, drops the correlation value to below the 0.3 threshold [17, Reference Pirkl, Remley and Patane21], as shown in Fig. 3, verifying independent samples. The correlation between independent realizations for Band 1 is shown in Table 2. A few cases slightly exceed the 0.3 threshold. These cases are underlined in Table 2. However, since the loading is much higher than required for NB-IoT and CAT-M1, this is not expected to influence the final results significantly. In the CBW = 1.5 MHz case, which we use in the final uncertainty budget, all correlations between independent realizations are below the threshold.

Fig. 3. Correlation of within samples using linear autocorrelation for Band 1, for NB-IoT (a) and CAT-M1 (b), with a worst-case CBW = 3.3 MHz.

Table 1. Mode-stirring sequence for each independent realization (IR)

Table 2. Worst-case correlation between independent realizations using Pearson's cross-correlation for CBW = 3.3 MHz

Combined uncertainty

Using Formulation 2, (4), we can calculate $u^{2}_{{\rm Ref}}$ and $u^{2}_{{\rm DUT}}$. Using the root-sum-of-squares (RSS) technique, we can calculate the combined uncertainty of those, u _Combined, normalized to G _ref using [Reference Remley, Wang, Williams, aan den Toorn and Holloway10, 17]

(5)$$u_{\rm Combined,\; dB} = 10\log_{10} \bigg( {\hat{G}_{\rm Ref} + \sqrt{u^{2}_{\rm DUT} + u^{2}_{\rm Ref}}\over \hat{G}_{{\rm Ref}}} \bigg) .$$

The results for all bands are shown in Fig. 5. In the current standard, the user selects the highest value of uncertainty, computed over all frequencies within the band of interest, since, as shown in Fig. 5, uncertainty estimates can change over frequency. Table 4 shows this value for all cases, calculated using both Formulation 1 and 2. It can be clearly seen that Formulation 1, (3), overestimates the uncertainty in all cases. Several other effects related to the loading and averaging bandwidth can be observed in the combined uncertainty results.

Fig. 5. The normalized combined uncertainty for three bands centered at 1930 MHz (a), 1960 MHz (b), and 1990 MHz (c), calculated with (5) using Formulation 2.

Table 4. Maximum combined uncertainty in dB, calculated using both Formulation 1 (F1) and 2 (F2). These values do not include a coverage factor

First, the uncertainty reduces for higher averaging bandwidths, as expected since it reduces within uncertainty. Second, the maximum uncertainty for the NB-IoT averaging bandwidth is very similar for both loading cases (note that the black curves in Fig. 5 overlay), which is generally not the case in wideband measurements. In Figs 5(b) and 5(c), the maximum uncertainty for the NB-IoT bandwidth is even higher for a lower-loading case. Even with Formulation 1 (see Table 4), the uncertainty does not always increase for increased loading. This all implies that the within uncertainty is more dominant than the between uncertainty, and that this loading has relatively little effect on this uncertainty for the NB-IoT bandwidth. A third effect is that the uncertainty is higher for the CAT-M1 and 2 MHz averaging bandwidths in the eight-absorber case, as compared to the two-absorber case. This is as expected, since the within differences become less significant for higher averaging bandwidths, while the between differences become more significant for higher-loading cases (see Table 3).

Comprehensive uncertainty analysis

In this subsection, we estimate the uncertainty in the whole measurement, taking into account all metrics in (1). Table 5 shows a summary of all the components of uncertainty related to the measurement, split into two groups. The groups contain contributions to the uncertainty in the reference measurement and the DUT measurement. In this analysis, we used the NB-IoT and CAT-M1 bandwidth results, where CBW = 1.5 MHz, as this is wider than the channel bandwidth of interest, while it does not excessively load the chamber. We based our analysis on the components discussed in [17].

Table 5. Comprehensive uncertainty budget for NB-IoT and CAT-M1. Expanded with a 1.96 coverage factor.

In the contributions to the DUT measurement, we calculated the mismatch between the BSE and the measurement antenna, and the temperature variation in the system using equations provided in [22]. In the calculation for temperature variation, we used a variation of ±3 K, assuming worst-case values as presented in [22, 24]. Fixed worst-case standard uncertainties were used for the cable factor, insertion loss, the sensitivity search step size, miscellaneous uncertainty, and the frequency resolution for the TIS measurement. The BSE output level (stability) was extracted from the manufacturer data sheet. In the reference measurement, we extracted the VNA absolute level and level stability from an earlier work that used a similar setup. The uncertainties in the impedance mismatch and cable measurements were calculated using [22], which were, in this case, negligible. We therefore state them as being < 0.01 dB. It should be noted that these are not always negligible. In this measurement setup, the uncertainty due to the cable movements is not considered in the reference measurement, since they are calibrated out. The uncertainty from moving cables due to the movement of the turntable was found negligible due to the use of a rotary joint. We calculated the uncertainty of the radiation efficiency of the reference antenna using [Reference Bronckers, Remley, Jamroz, Roc'h and Bart Smolders25].

In [17], one component of uncertainty is the chamber “lack of spatial uniformity”, which is calculated using Formulation 1, which only uses between uncertainty. We used Formulation 2, that also includes within uncertainty, so this component does not contain only uncertainty due to a lack of spatial uniformity. Since we measured multiple bands, we used the maximum uncertainty derived from all bands. It should be noted that the maximum uncertainty value did not vary more than 0.03 dB between the bands. The same holds for the chamber “lack of spatial uniformity” component of uncertainty in the contribution in the reference measurement part. The uncertainty is lower here, since N _B = 6 for the reference measurement, while N _B = 1 for the DUT measurement.

We estimated the total expanded uncertainty by using an RSS technique on the uncertainties in dB from both groups, according to [17]. We assume all of the components of uncertainty to be uncorrelated and Gaussian distributed here. To cover the uncertainty due to a limited number of samples, we multiplied the result with a coverage factor of 1.96 to obtain a 95% confidence interval [20]. The total expanded uncertainties for NB-IoT and CAT-M1 are 1.26 and 1.14 dB, respectively. For both protocols, the uncertainty lies below the maximum allowed uncertainty for TIS, which is 2.3 dB (2.0 dB for TRP) [22]. It should be noted that, if the formulation taking only between uncertainty into account was used, these values would be 1.75 and 1.45 dB, respectively, which overestimates the uncertainty significantly. If another uncertainty component turns out to be higher than anticipated, this could lead to non-compliance with the standard. This shows the importance of taking both the within and between uncertainty into account.