2.1 Geometric calibration

Although Z-scopes are more challenging than A-scopes to calibrate radiometrically, they are better suited for initial visual interpretation and identification of bed and surface interfaces. Z-scope traces can be associated with the individual A-scope measurements using the CBD counter. The vertical red lines in Figure 1b show the locations and spacing of CBD markers where A-scope traces are recorded along a continuous Z-scope profile.

In terms of fast-time calibration, both record types include calibration pips or ‘cal pips’ recorded every 2 microseconds. In Z-scope records, they appear as horizontal lines along a vertical ruler (Fig. 1d), and in A-scope records, they appear as vertical lines superimposed on the A-scope trace itself (Fig. 1e). The presence of these marks on both types of records enables the cross-calibration of the vertical scale of a Z-scope to the horizontal time axis of A-scopes and both to physical units of time (in microseconds).

Picking the Z-scope bed and surface follows the common visual interpretation process used in modern radar sounding data and does not require radiometric calibration to be performed. There are automatic picking algorithms for radar sounding data (Panton and Karlsson, Reference Panton and Karlsson2015, e.g.) but the most common approach is semi-automated picking in which a human interpreter picks two bounds, one above and one below the bed or surface interface and then an automatic re-picker selects the highest power echo between those bounds. However, because Z-scopes are produced by taking the fast-time derivative of A-scope echo power, a radar echo will show up as two sequential opposite-signed peaks in the Z-scope (Fig. 1g). As a result, the automated portion of picking Z-scope data involves selecting the largest Z-scope signal (or positive-to-negative difference) rather than the largest peak. This includes first measuring the number of pixels between positive and negative peaks in a particular scanned Z-scope image (3, e.g., in Fig. 1g) and then identifying the largest difference (within the manual picking bounds) across that number of vertical pixels.

Once Z-scope picks have been recorded, the delay between the bed and surface can be used to identify bed echoes in A-scope traces. In order to do so, the surface return must first be identified in the A-scope record. The left side of an A-scope record (e.g. Fig. 1f) corresponds to the shortest fast-time delay after transmission and the first strong signal is usually the ‘main bang’ caused by leakage between the transmitter and receiver (or another artifact of the transmission event itself). This is discernible from the surface return because it has a fixed delay and strength across many observations, as is evident in both A-scope and Z-scope records. The surface return is usually followed by a decay in echo power until the bed echo. The bed echo is usually followed by the relatively constant noise floor power level. Once the surface return is identified, the delay at each CBD can be used to identify the bed echo in the A-scope traces.

2.2 A-scope signal, saturation and calibration

Although A-scopes directly record log-detected received power, they do not contain a radiometric calibration reference. Fortunately, the dynamic range of A-scope records can be used to radiometrically calibrate echoes within A-scope traces. Figure 3 is the result of bench-top loop-back testing of the receiver with an in-line variable attenuator (Christensen, Reference Christensen1970; Christensen and others, Reference Christensen, Gundestrup, Nilsson and Gudmandsen1970; Skou and Sondergaard, Reference Skou and Sondergaard1976) and shows a typical amplifier response starting with a noise floor at low input levels, increasing linearly, and saturating at high input levels (Pozar, Reference Pozar2011). We adapted Figure 3 from Christensen (Reference Christensen1970); Christensen and others (Reference Christensen, Gundestrup, Nilsson and Gudmandsen1970); Skou and Sondergaard (Reference Skou and Sondergaard1976) by assuming that the highest A-scope values measured in the test were at saturation and that the lowest values were at the noise floor. As a result, the vertical pixel range in A-scopes (e.g. Fig. 1f) can be converted into A-scope SNR values by picking the noise floor and setting the SNR value of that vertical pixel to be 0 dB, picking the ‘main bang’ and setting the SNR value of that vertical pixel to A _scale = 70 dB (Fig. 3) (Christensen, Reference Christensen1970; Christensen and others, Reference Christensen, Gundestrup, Nilsson and Gudmandsen1970; Skou and Sondergaard, Reference Skou and Sondergaard1976), and linearly interpolating (in dB) between these values.

Fig. 3. (a) 60 MHz and (b) 300 MHz A-scope saturation curves from benchtop loop-back tests with variable attenuation (Christensen, Reference Christensen1970; Christensen and others, Reference Christensen, Gundestrup, Nilsson and Gudmandsen1970; Skou and Sondergaard, Reference Skou and Sondergaard1976).

With the y-axis of A-scopes calibrated in term of A-scope SNR (in dB), A-scope records can be used to perform the same kind of relative, along-profile echo-power, attenuation and reflectivity analysis common in modern digital radar sounding data (Schroeder and others, Reference Schroeder2020). However, A-scope traces are recorded only every 1.5 or 2 km and can therefore only be used to observe reflectivity patterns that would not be aliased by such sparse spatial sampling. Given the significant variability between individual radar traces on scales of 2 km and below, A-scope reflectivity patterns should be interpreted either at the scale of profiles, catchments or ice shelves (Neal, Reference Neal1982, e.g.) or, with great care, as single traces (Gorman and Siegert, Reference Gorman and Siegert1999, e.g.). However, despite these caveats, the pioneering A-scope based analysis of relative reflectivity and echo character of the Ross Ice Shelf by Neal (Reference Neal1982) is just now being matched by modern data (Tinto and others, Reference Tinto2019).

2.3 Z-scope signal

Z-scope records are produced by differentiating log-detected A-scope signals in fast-time resulting in sequential opposite-signed peaks for a single echo (Fig. 1g). The vast majority of the SPRI/NSF/TUD survey (and surveys of Greenland from the same period) were collected in a short-pulse (rather than chirped) mode so that the pulse-length (rather than the waveform) determined the system bandwidth and range resolution (Christensen, Reference Christensen1970; Christensen and others, Reference Christensen, Gundestrup, Nilsson and Gudmandsen1970; Kuiven, Reference Kuiven1975). In this configuration, Z-scope signals can be treated as the fast-time derivatives of a square-wave with a ‘height’ equal to the A-scope SNR (in log-detected A-scope units of dB) resulting in Z-scope signals with units of dB/ns. To illustrate this, we simulate Z-scope signal strength as a function of A-scope SNR using the A-scope geometry in Figure 4a and calculate the Z-scope signal (Fig. 4b) as its fast-time derivative. Figure 4c illustrates the 1 to 1 mapping of A-scope SNR to Z-scope signal before compression. This intuitive relationship is the result of the fast-time differentiation calculating a slope for which the A-scope SNR is the vertical component.

Fig. 4. (a) Simulated A-scope echo with red arrows showing the A-scope SNR (in dB) and the fast-time differentiation window (in ns) used to calculate the (b) simulated Z-scope signal (in dB/ns). (c) These simulations show that, without compression effects from the actual differential amplifier, limiter, and film, Z-scope signals vary linearly with A-scope SNR. The vertical scale in (c) is normalized to the range of SNR values used in the simulation.

2.4 Z-scope saturation and calibration

Z-scope records also pass through a differential amplifier, limiter and are recorded on film, the net effect of which is to compress the Z-scope signal (Christensen, Reference Christensen1970; Christensen and others, Reference Christensen, Gundestrup, Nilsson and Gudmandsen1970; Kuiven, Reference Kuiven1975). In order to calibrate that compression, we utilize a segment of radar sounding data collected in the Gamburtsev Mountain region of interior East Antarctica, which is an ideal area for calibration because the significant relief in ice thickness produces a wide range of bed echo strengths across the dynamic range of both the A-scope and Z-scope records. To empirically constrain and correct for Z-scope compression, we plot the calibrated A-scope SNR (as described in section 2.2) and Z-scope signal for bed echoes along this profile as a scatter plot (Fig. 5b) and approximate the receiver response (Pozar, Reference Pozar2011) including compression due to the differential amplifier and limiter (see Supplementary Materials) as a logistic function (Fig. 5a) given by

(1)$$Z = {A\over \left(1 + {\rm e}^{B( A_{{\rm SNR}} + C) } \right)},\; $$

where Z is the Z-scope signal strength, A _SNR is the calibrated A-scope SNR, A is the max value, B is the growth rate, and C is the sigmoid mid point. Fitting the curve in Figure 5b yields values of A = 0.378, B = −0.212 and C = −7.78 for Equation (1). Since A-scope traces are acquired much more sparsely than Z-scope signals (Fig. 1b), Z-scope signal strengths are compared to interpolated A-scope SNR values (as shown in Fig. 6). As a result, the spread in Figure 5b is due to the along-track variability in Z-scope bed echo power (due to noise, speckle and clutter as well as changing bed reflectivity and roughness) and the coarse spatial sampling of A-scope traces rather than the receiver compression itself (which is a smooth, deterministic function with unknown parameter values). As a result, the impact of the scatter in Figure 5b is increased uncertainty in the estimations of the parameters (A, B and C) in the saturation function rather than the introduction of a stochastic character to the receiver itself. With A, B and C estimated, Equation (1) can be used to convert the more spatially continuous Z-scope records into equivalent A-scope SNR values.

Fig. 5. (a) Generic response of a receiver (adapted from Pozar, Reference Pozar2011), showing the output power (P _out) as a function of input power (P _in) including the noise floor, linear and saturation regions of that response. The dotted lines illustrate the one realization of a logistic function, which we use to approximate that response. (b) Observed Z-scope signal strength as a function of A-scope SNR for the profile in Figure 6. The black line shows the logistic curve used to estimate the effect of compression for the Z-scope signal along this profile.

Fig. 6. (a) A Z-scope profile from the Gamburtsev Mountain region of East Antarctica (f) along with (b) extracted ice thickness, (c) Z-scope signal, (d) calibrated A-scope SNR (in dB) and (e) calculated Z-scope relative reflectivity profiles. The red lines correspond to the span of the zoomed-in Z-scope of a single subglacial lake (g) and its corresponding reflectivity signature (h).