Electronic

A block diagram of the system is shown in Figure 1.. The transmitter and receiver, shown within the dashed outlines, are both towed behind the instrumentation hut. The digital data-acquisition system (DAS), computer, tape drive, and gain-control unit are inside the hut and are powered by a 4 kW gasoline-powered generator. This system was designed specifically for acquisition, averaging, recording, and display of data in digital form while profiling, hence the DAS is central to the operation of the system. A digital oscilloscope could be substituted for the DAS, but with significant reductions in averaging and data-transfer rates. A full description of the DAS is given in Reference Wright, Bradley and HodgeWright and others (1989).

Fig. 1. Block diagram of the electronics of the ice-radar system. Trigger #1 first turns on the latching “wake-up” circuit to apply high voilage to the pulser; subsequent trigger signals fire the pulser. Trigger #2 initiates the gain ramp in the receiver. Sensitivity time-control (STC) gain set-up commands are also transferred on this channel. All trigger signals and the radio-frequency analog dala are transmitted over a multi-fiber-optical (F/O) cable.

The battery packs for the transmitter and receiver consist of six sealed lead–acid 6 V batteries rated at 8 A-h capacity. The current requirements for the transmitter depend on the transistor type used, since different types have different break-down voltage ratings, and on the repetition rate of the pulser. As operated in Antarctica, the transmitter required approximately 750 mA at 30 V at a repetition rate of 5 kHz. The battery capacity is sufficient for 8 h of non-stop operation under these conditions, even allowing for some derating of the batteries.

Because the high-voltage transmitter power supply consumes the most power, even when the pulser is not firing, a “wake-up” circuit is employed that applies voltage to the input terminals of the power supply only when trigger pulses are sensed. The trigger pulses are generated by the DAS. If the system is in stand-by mode (no pulses), the battery packs will last for more than 24 h.

The high-voltage power supply, a Venus Scientific Model F-6, has an output voltage adjustable over a range of 300–700 V and will maintain a constant output voltage over a range of input voltages from 24–31 V. The first feature allows different transistor types to be used in the pulser, and the second provides a constant transmitted signal level even though battery voltage decreases during operation.

Electromagnetic coupling between the transmitter, receiver, and vehicles was minimized by using a Siecor all-dielectric construction multi-fiber optical cable that carries trigger signals, control commands, and the radio-frequency received signal. Each of the lines passing through the dashed boxes in Figure 1. represents one fiber in the multi-fiber cable. The optical cable was also used as the tow cable for the transmitter and receiver.

The transmitter, shown in Figure 2., is a three-stage avalanche transistor Marx-bank puiser. A Marx-bank is a bank of capacitors charged in parallel, but discharged in series to gain a voltage multiplication. The transmitter is similar in many respects to the older model used for the airborne sounding of Columbia Glacier, Alaska (Reference Wright, Olhoeft and WattsWatts andWright, 1981). Depending on the transistor type used in the new model, the peak power output may be slightly greater or less than that of the older pulser. Unlike the earlier version, the present one is triggered rather than free-running so that the transmitted pulses maintain phase coherence with the 100 MHz clock that controls DAS timing. The ability to trigger the transmitter synchronously with sub-nanosecond shot-to-shot jitter maximizes the benefits of digital wave-form addition, discussed later, and makes it possible to obtain uniform spatial data density in spite of vehicle speed variations. The pulser is compact, light, easy to build, and relatively reliable if certain construction and operational precautions are observed (see Appendix). Further discussion of avalanche transistor circuits is available in Reference HerdenHerden (1976), Reference HenebryHenebry (1961), and Nicholson and others (1976).

Fig. 2. The ihree-slage avalanche-transistor pulser. This pulser can he built in a box of about 200 cm³ and weighs only about 200 g. yet delivers peak output power in excess of 10 kW at a repetition rate of up to IOkH=. V_cc ranges from 300 to 600 V depending on the transistor type used. A TTL logic level is often adequate as a trigger. Further discussion and a parís list (Table I) are in the Appendix.

The receiver design presented some challenges because of limited dynamic range in the analogue optical link and the digitizer. Dynamic range for a linear analog system is the ratio of the maximum input signal for linear operation to the minimum detectable input signal. The dynamic range of a digitizer is approximately 6 × n dB where n is the number of bits. A design criterion for the radar system was to use a very high-speed DAS with a 100 Megasample/s digitizer and high-speed wave-form addition for S/N enhancement (Reference Wright, Bradley and HodgeWright and others, 1989). The digitizer, a LeCroy TR8818A, is an eight-bit device and thus provides only 48 dB of dynamic range. In addition, the fiber-optic link used to transmit the radio-frequency received signal to the digitizer has a dynamic range of only about 50 dB at the frequencies we are using. Much greater dynamic range is required to resolve important features present in the wave form, but whose return amplitudes are small compared to the surface and bottom returns, and to compensate for signal attenuation in the ice. For this reason, sensitivity time control (STC) was built into the receiver (Fig. 3).

STC, also known as time-varying gain, increases the sensitivity (gain) of the receiver as a function of time (proportional to distance) to compensate for the smaller amplitude of return signals from more distant objects. In a period as short as 2 µs, the gain can be smoothly varied by as much as 60 dB. The ability of the amplifier to present received signals, separated in time by as little as 2 µs and differing in amplitude by as much as 60 dB, to the digitizer at the same amplitude (though not with the same S/N ratio) compensates for the limited dynamic range of the digitizer and fiber-optic link. An electromechanical programmable attenuator precedes the receiver, but is used only when very large signals would saturate the amplifiers. In Antarctica, except for the lowest frequencies, no such attenuation was used so that the system could achieve the best S/N ratio. In this case, the pre-amplifier restricts the electronic linear dynamic range to about 60 dB although limited momentary overloads can be tolerated.

The wave-form averaging performed in the DAS improves the S/N ratio and effectively provides additional dynamic range subject to the restrictions discussed below. In Antarctica, we generally coherently added 4096 wave forms for a theoretical S/N improvement of 36 dB. The actual improvement was essentially equal to the theoretical improvement except for some slight system-generated coherent noise discussed below. When added to the 60 dB electronic dynamic range, the system thus provided the equivalent of 96 dB, or 16 bits, of linear dynamic range without using the programmable attenuator.

The maximum number of wave forms that the DAS can add without overflow is 65 536 (2¹⁶). Normalization is not used in order to preserve the full dynamic range. For uncorrelated Gaussian noise and a coherent (phase-preserving) receiver the theoretical S/N (power) enhancement derived from signal addition is 10 × log₁₀(n) where n is the number of wave forms added, thus the maximum enhancement by the DAS, apart from any separate computer addition which was not done in the field, but could be performed on the recorded data, is 48 dB. Coherent addition of wave forms, however, assumes that all signals add in phase; therefore, a limit is set on the physical distance that may be traveled while adding. The distance limit is a function of (a) the geometrical shape and roughness of “targets of interest”, such as bottom topography, crevasses, or internal layers, (b) possible vertical antenna motion due to surface roughness (or aircraft motion in airborne applications), and (c) the wavelength of the radiated signal. The limit is more severe for higher frequencies (shorter wavelengths). A safe practice followed in bore-hole radar applications (Reference Wright, Watts and BramsoeWright and others, 1986) is to restrict the motion of the transmitter and receiver to no more than one-tenth of a wavelength during addition. Such a stringent limit is not always necessary in ice, but in our Antarctic profiling the horizontal distance traversed during addition was generally about 1 m, thus this severe condition was satisfied even at the highest frequency used. Therefore, all return signals, including those from the smallest features detectable by the system, were added in phase during the entire addition process.

Another performance figure, sometimes confused with receiver dynamic range, is “system sensitivity” which is sometimes given as the ratio of the transmitter maximum output power to the receiver minimum detectable signal. We refer to this ratio as the “electronic” system sensitivity. Additional factors, including antenna gain, system losses such as those due to antenna and cable resistivity, pulse expansion and compression, if any, and signal recording enhancements need to be included when making total system sensitivity comparisons. For the system described here the minimum detectable signal power, with no additional signal processing, is theoretically −90 dB m (10⁻¹² W). The peak output power from the pulser is +70 dB m (10⁴W), so the theoretical electronic system sensitivity is 160 dB. Laboratory measurements show an electronic system sensitivity of about 145 dB. The 15 dB reduction is due to television and radio transmissions in the pass band of the receiver, and to some system-generated digital noise from the gain-control circuitry. Since there is very little television and radio interference in Antarctica, the system sensitivity should be somewhere between these two values. Careful noise measurements were not made in the field because the calibrated oscillator used for signal level measurements was not available.

For our system, the antennas are resistively loaded to shape the radiated pulse and are less directional than those of higher-frequency multi-element antennas. Although measurements on our antennas are not available, theoretical calculations place the (two-way) net antenna directional gain plus resistive losses in the range of −2 to −16 dB, depending on antenna loading. Adding the antenna loss and the 36 dB gain from wave-form addition to the electronic system sensitivity gives a total system sensitivity of 165–179 dB using the laboratory measured receiver-noise figure, or 180–194 dB if the receiver reached its theoretical noise limit. If the DAS were allowed to add to its full capacity, a total system sensitivity of 192–206 dB is theoretically possible, but this may be impractical, except for very local studies, because of the phase coherence requirement.

Fig. 3. The receiver–amplifier circuit diagram. Sensitivity lime control was accomplished using a three-stage cascade of wide hand-width operational amplifiers with the gain set by low-capacitance field-effect transistors (FETs) used as voltage-controlled resistors. A parts list is in Table II in the Appendix.

For comparison, the 60 MHz tuned radar system developed by the Technical University of Denmark (TUD) has a maximum transmitter power of 10 kW, the same as our radar system, but has an electronic system sensitivity, depending on selected band width, of 171–182 dB (Reference Skou and SondergaardSkou and Sondergaard, 1976). Antenna gain, system losses, and recording gain must be added to arrive at the total system sensitivity. Skou and Sondergaard calculated a 22 dB two-way antenna gain, including a small antenna feed-system loss, and estimated a photographic recording gain of 15 dB at typical airborne recording speeds. These additions, less a small loss in the transmit/receive switch, give a total system sensitivity for the TUD system of 207–218 dB. If used on the ice surface with fast digital signal addition such as that provided by our DAS, even higher total system sensitivities might be possible. Our DAS has already been successfully used with the TUD radar system in airborne profiling of the Greenland ice sheet (Reference Wright, Bradley and HodgeWright and others, 1989).

Estimates of range versus system sensitivity can be derived from the “radar equation” which is discussed in many radar texts such as the one by Reference SkolnikSkolnik (1962). This equation, specialized to the case of reflection from a planar interface, may be written in the form

where P_r is the received power, P₁ is the transmitter power, G is the antenna gain where we assume that the transmitting and receiving antennas are identical, η is the antenna and feed-system efficiency, λ. is the wavelength in meters, ρ is the electric field reflection coefficient at the ice−rock interface, given by

for normal incidence where ε_r and ε_i are the relative dielectric permittivities of rock and ice, respectively. R is the distance in meters measured from the transmitting antenna to the bottom. We ignore the fact that the receiving antenna is not at the same location as the transmitting antenna because, for separation distances small compared to the ice thickness, the correction does not substantially alter the results, α has the units of m⁻¹ and is related to the effective attenuation in dB/m by the relation

The effective attenuation excludes the geometric spreading factor, R⁻², but includes all other means by which power density is reduced in the propagating wave, including conductive losses in the ice which convert electromagnetic energy to heat, scattering and diffraction from inhomo-geneous inclusions and crevasses in the ice, and specular reflection from interior ice surfaces. An example is plotted in Figure 4. with effective attenuation in dB/m as a parameter. To generate these curves, we assume that G is 1.6 which is appropriate for a half-wave dipole in free-space and is an underestimate when the antenna lies on the air–ice interface. The antenna efficiency is taken to be 10%, the wavelength is taken to be 84 m which corresponds to a frequency of 2 MHz in ice if the ice has a relative permittivity of 3.2, and the relative permittivity of the rock underlying the ice is taken to be 10, giving a reflection coefficient of 0.277. The −150 dB level in Figure 4. represents the estimated detection limit set by the electronic sensitivity of our system with no wave-form addition.

Fig. 4. The ratio of received to transmitted power for our system, when operated at a centre frequency of 2 MHz. versus distance to the ice–rock interface with effective attenuation as a parameter. For short distances, the curves are dominated by the geometrical spreading (R⁻²) factor. For large distances, the curves are dominated by the attenuation (e^−4αR) factor. The left-hand intercept is at −16 dB. partIv because of the assumed antenna efficiency of 10%.

During static tests on Ice Stream B we noted a bottom-return S/N ratio of slightly more than 40 dB at 2 MHz through 800 m of ice when adding 4096 wave forms (36 dB of enhancement). This indicated that the bottom return should have been detectable under these conditions with no wave-form addition. Indeed, this was the case. Comparing this result to the curves in Figure 4., we estimate that the effective attenuation in the ice may have been as much as 40 dB/km. For this effective attenuation, and with the system parameters we assumed above, the range limit with no wave-form addition is about 900 m, and with 36 dB of S/N enhancement the range limit is about 1300 m. If the effective attenuation were 30 dB/km in the ice, the range limits would be 1200 m with no wave-form addition and 1750 m with 36 dB of S/N enhancement and the same system parameters. For very cold ice, much greater ranges are possible. Estimates of expected attenuation versus ice temperature may be derived from data in Reference Bogorodsky, Bentley and GudmandsenBogorodsky and others (1985). Since range clearly depends not only on system parameters but on the effective ice attenuation, which varies with ice temperature and factors such as crevassing and internal reflecting surfaces, a range obtained in a given field situation does not assure equal performance elsewhere. The older Reference Watts and WrightWatts and Wright (1981) system performance with identical field conditions and antennas would roughly equal that of our new system with no wave-form addition.

For sounding deep polar ice, the system with the highest possible system sensitivity is normally the system of choice. There are situations, however, where a lower frequency short-pulse system has advantages despite a lower system sensitivity. First, the short-pulse system is a coherent system and phase information is preserved. The TUD receiver and other gated carrier receivers usually, though not necessarily, use square-law detection and thus lose phase information. Preservation of phase information makes it possible, for example, to determine from a reflection at an interface between materials of differing dielectric permittivities which material has the higher permittivity. Secondly, wave-form addition improves the S/N ratio faster for coherent signals than for detected ones. Thirdly, conductivity and scattering losses often increase substantially with frequency in warm and crevassed ice, respectively. These losses are sometimes so great that a low-frequency system can have greater depth penetrating ability than higher-frequency radars with more sensitivity. Fourthly, operation at various frequencies within the wide pass band of the receiver is simply a matter of changing four wires that make up the antennas, whereas frequency changes for a tuned system are more complicated. Finally, the transmitter and receiver for the short-pulse system are quite compact and light and can easily be battery powered, not usually the case for high-power tuned radar systems.

Resolution is another criterion by which radar systems are sometimes compared, where resolution is defined as the ability to distinguish two nearby objects from one another (not range accuracy or a limit on minimum detectable size). Details of radar resolution depend on factors such as radiated pulse shape, pulse length, and receiver characteristics, but in general a spatial separation corresponding to a two-way propagation time equal to or greater than roughly half the pulse length is required to resolve two objects. An ideal short-pulse system that radiates only one cycle of a sine wave of a given frequency would have a pulse duration equal to the cycle length, thus providing the best resolution possible at that frequency. The radiated wave form for our system is dependent on the resistive loading and length of the antennas. The antennas used on Ice Stream B were slightly underdamped, causing an additional “tail” of about 1 cycle which degraded the resolution. However, ignoring this tail, the ideal resolutions for our system are approximately 84, 42, 21, 10, and 7 m in ice at 1, 2, 4, 8, and 12.5 MHz respectively. For the TUD system, the pulse lengths can range from 1000 to 60 ns, yielding resolutions of about 80−5 m. The most common pulse length used with the TUD system is 250 ns, corresponding to about a 20 m resolution. Thus, except for degradation caused by pulse tails resulting from underdamped antennas in our system, the two radars yield similar resolutions.

In our system, a multi-fiber optical cable carried trigger signals, control signals, and data between the transmitter, the receiver, and the DAS. Digitally encoded control signals were sent over one fiber to the receiver to set the attenuator level, the base gain level, the gains in each of 15 time windows, the total length of the gain ramp, and the delay to the start of the ramp. The encoded gain settings were stored in a memory in the receiver and then, at each trigger signal, sequentially read out to a digital-to-analog converter which generated the voltages to be applied to the gain control and voltage-divider inputs on the receiver. Filtering was used so that the voltages changed smoothly from one time window to the next. The control unit also sent all the settings to the computer over a serial (RS-232C) port; these settings were recorded with the data on tape so that, if needed, a calibration correction can be applied to the data whenever relative signal amplitudes are important in interpretation.

An IBM PC/AT computer was used for a system controller. This computer set DAS parameters, read data from the DAS, read the odometer and the receiver control unit settings, displayed the data on a colour-graphics screen, and then wrote the data to a nine-track tape drive. Data were buffered into 6 Megabytes of extended memory while traversing along the surface, and dumped to the tape drive after coming to a complete stop. This avoided any potential problems which might be caused by actually writing to the tape drive during the occasionally rough ride over the snow surface. Several kilometers of profiling could be accumulated in this memory buffer. All software was written in assembly language, both for maximum speed and to make possible many of the required hardware tasks. Data were displayed in real time on a 256 colour, high-resolution (640 × 480 pixel) monitor.

Mechanical and thermal

The transmitter and receiver were placed in separate cylindrical tubes with conical ends so that they would ride over the wind-induced roughness (sastrugi) on the surface (Fig. 5). To ensure that the cylinders would not roll over, lead plates were placed in the bottom of each cylinder. The inside of each cylinder was lined with foam to provide both shock and thermal insulation. The cylinders were towed using the fiber-optic cable, which had Kevlar and fiberglass/epoxy stress members embedded in it.

The instrumentation hut, also shown in Figure 5., pulled the fiber-optic cable and was itself towed by a tracked vehicle. The hut was insulated both electromagnetically and thermally, and housed the control electronics, monitor oscilloscope, data-acquisition system, computer, and tape drive, as well as one or two operators. Power was supplied by a 4 kW gasoline-powered generator. The hut was carried on an aluminum frame suspended by 16 low-pressure “all-terrain-vehicle” tires. These tires eliminated most shock and high-frequency vibration, and provided an undulating ride over the sastrugi. A heavy-duty bicycle wheel drove a shaft encoder to provide distance and speed information, and to achieve a uniform spatial data density by controlling the transmitter repetition rate.

Fig. 5. The instrumentation hut, towing vehicle, and receiver. Sixteen low-pressure tires smoothed the ride over the sastrugi. The electric generator and odometer wheel (raised) are mounted on the rear platform. The radar receiver is in the cylinder in the left foreground. The fiber-optic cable was the low cable for the transmitter and receiver, and the antennas were tied to this cable.

During operation, the instrumentation, operators, and solar radiation supplied more than enough heat in the hut. After sitting for several hours with no power, the interior temperature of the hut would typically be in the 5−10 °C range depending on ambient temperature, wind, and cloud cover. At the beginning of each day’s operations, a 1500 W electric heater and the tape drive were turned on to bring the hut interior temperature up to a minimum of 13 C which was required before the tape drive would load a tape. The heater usually was needed for only 30–45 min. All of the other equipment could be started cold, although the usual practice was to allow the computer to warm prior to applying power. The interior temperature in the transmitter and receiver housings would often fall to −5 °C after sitting for several hours without any power, but power could be applied to both transmitter and receiver at this temperature without causing any problems.

System Specifications, Construction, And Operation

Table I lists components required for the construction of a pulser of the type used in this work. The theory of operation of the pulser (Fig. 2) is explained in the references, but certain construction and operational details, often learned by trial-and-error, may be helpful to anyone desiring to build and use a similar pulser for ice sounding or other applications.

Three types of transistor have been successfully used in the pulser: 2N2219AS, 2N2102s, and MM3009s (in order of increasing rated break-down voltage). Hand selecting sets of transistors for equal break-down voltages is sometimes helpful. Not all transistors of the same type can be used. For example, 2N2102s from International Devices Incorporated have been successful, but those of another manufacturer did not avalanche well. The MM3009s (not the same as 2N3009s) are Motorola transistors and have performed well in avalanche mode. All of the 2N2219As that were tried have been satisfactory. None of these transistors was designed as an avalanche device, thus it is possible that a manufacturing process change that left a transistor the same in all its rated characteristics would render it unsuitable for use in an avalanche circuit.

When a pulser fails, typically the transistors will no longer stand off the voltage applied to them and are in the “on” state continuously. This can in turn lead to failure of the charging resistors and sometimes the bias and equalizing resistors as well. Power ratings of at least i W are advised for the charging resistors. The failure mechanism for the transistors appears to be thermal. In general, the 2N22I9S last the longest, the 2N2102s are intermediate, and the MM3009S fail most frequently, consistent with the output power levels. In order to maximize transistor life, heat sinks should be installed on the transistors and the pulser should be operated at less than maximum repetition rate and with the applied voltage below the maximum possible level. The applied voltage must be below the level at which spontaneous break-down occurs, but high enough that the pulser will go into avalanche break-down when trigger pulses are applied. Often, transistor–transistor logic (TTL) devices are sufficient to drive the base of Q₁. If not, a low output impedance buffer stage can be added between a TTL trigger source and Q₁.

A repetition rate of up to 5 kHz is generally safe and, with adequate heat-sinking, continuous operating rates of up to IOkIIz are possible with this design. Above 10 kHz, the peak output power begins to diminish, because the limited output current of the high-voltage power supply is not adequate to recharge fully the capacitors to peak voltage in less than 0.1 ms.

The pulser must always be operated with a load, which can be either an antenna or a resistor in the range of perhaps 50–500 Ω. Capacitors C₁–C₃ must be rated for at least the full applied voltage and should have low loss at frequencies up to 100 MHz. Construction on a copper-clad board is recommended to provide a good ground plane. One-half of the dipole antenna is directly attached to V_out and the other half to the pulser ground, which should be isolated from the chassis.

The receiver (Fig. 3) uses wide band-width operational amplifiers with field-effect transistors (FETs) employed as voltage-controlled resistors. Three FETs set the gains of the operational amplifiers and two FETs are in inter-stage resistor divider networks. To achieve a better noise figure, the operational amplifiers are preceded by a low-noise fixed-gain pre-amplifier. Inter-stage high-pass filters are included to prevent feed-through of the amplifier gain (V_g) and resistor-divider shunt (V_s) control voltages and any gain-dependent offset voltages. The components are listed in Table II.