Drainage morphology implications

Individually, the three pressure records presented in Figure 3 imply plausible changes in the local subglacial water pressure. Taken together, they suggest the occurrence of an intriguing hydrological switching event that led to highly localized reorganization of the subglacial water-pressure field. In Figure 4a, the small initial pressure offsets can be attributed to differences in bed elevation or errors in measurement of transducer installation depth. Similarities in the pressure signals, including both diurnal and small-scale character, indicate the presence of an efficient low-resistance connection between boreholes both before and after the event. Weakening of the connection during the event would result in differences in amplitude or phase of the diurnal signal between sensor records, or reduced coherence of small-scale features. Instead, following the switching event, the three pressure records of Figure 4a show nearly identical waveforms but with large constant pressure offsets.

Figure 5 illustrates a hydraulic reorganization that could account for the observed features in the records of C1–C3. For clarity, the system is represented by water pipes and shows three branches of a subglacial drainage system, each branch representing a region measured by an individual pressure transducer. The similar elevation and strong hydraulic connection evident in the pipe circuit of Figure 5a would ensure uniform responses to variations in pressure head and could therefore reproduce the essential features of the pre-event records for C1–C3. Switching to the pipe geometry shown in Figure 5b would produce offsets resembling those of the observed post-event records. Lowering two of the branches by distances Δh ₂ and Δh ₃ yields pressures P ₂ = P ₁ + Δh ₂ and P ₃ = P ₁ + Δh ₃. Pressure P ₁ is unaffected by the event. The low-resistance pipe allows the strong hydraulic connection to be maintained, and thus each transducer measures similar pressure fluctuations while exhibiting large offsets. Although this simple scenario reproduces the main features of the connected sensor records, it cannot occur subglacially. The pipes shown in Figure 5 represent drainage pathways at the glacier bed, and thus the sudden drops in elevation of 29.2 and 52.2 m indicated in the records of C2 and C3 would place the drainage channels deep within the glacier bed. Furthermore, movement of the drainage channels alone is insufficient to produce the observed offsets: it is necessary for the transducers to change elevation as well. Up-thrusting of the sensors is a conceivable process, but down-thrusting through the bed is certainly not.

Fig. 5. Schematic diagram showing hydraulic connections which could explain the pressure records of transducers C1–C3. (a) Before event. (b) After event.

Subglacial pressure signals have been attributed to both hydrological forcings, including changes in meltwater input and drainage morphology (e.g. Reference FountainFountain, 1994; Reference Walder and FowlerWalder and Fowler, 1994; Reference ClarkeClarke, 1996), and mechanical forcings, such as the transfer of overburden pressure between regions of the bed (Reference Murray and ClarkeMurray and Clarke, 1995). The failure of current hydrological models to explain the transducer records compels us to ask whether the observed offsets are maintained by forcings that have thus far eluded understanding, or if the signals can be more simply attributed to other causes, such as instrument failure. The record for transducer U2 argues in favour of the latter explanation. Sensors U1 and U2 (Fig. 4b) were installed in hydraulically unconnected regions of the bed, and both records exhibit low-amplitude pressure variations that are out of phase with those of C1–C4. At the time of the switching event, both sensors record large pressure decreases, but the character of the diurnal variations in each case is unchanged by the event. While U1 records reasonable pressure values following the event, the negative post-event values recorded by U2 suggest instrument failure and raise several questions: (i) Are the other observed pressure jumps due to device failure? (ii) If so, what is the failure mechanism? (iii) Is this mechanism also responsible for the failure of C4?

Implications of covert sensor failure

In order to discuss the failure of pressure sensors, it is first necessary to describe their operating principles. A schematic diagram of the transducer (Gems Sensors Series 2000, 16 bar absolute) is shown in Figure 6. Variations in water pressure deflect the measurement diaphragm, which in turn bends the sensor beam (Fig. 6a). Pressures are measured relative to a sealed reference chamber (Fig. 6b). Transducer response is highly linear with changes in water pressure over the specified measurement range, and thus the relation V = a ₀ + a ₁ h, which we refer to as the sensor-response equation, provides an excellent fit to the calibration data. Here V is the output of the transducer measured in millivolts, and h is the hydraulic head expressed in metres above the bed. To determine the pressure head for a given transducer output, the sensor-response equation is inverted to give the sensor-calibration equation h = b ₀ + b ₁ V, where, self-evidently, b ₀ = −a ₀/a ₁ and b ₁ = l/a ₁. A transducer excitation voltage of 2.5 V was used in all field measurements and laboratory studies, and data were recorded using a sampling interval of 2 min on Campbell CR10 data loggers.

Fig. 6. Schematic diagram of pressure transducer. (a) Detail of measurement diaphragm and sensor beam, shown at approximately 2 × scale. (b) Cross-section, shown at approximately 1/2 scale.

The event affected a large number of transducers, covering a large area and connected to several different data loggers; thus the failures cannot be attributed to simple electrical problems. Lightning strikes, which could potentially affect several loggers simultaneously, would be expected to induce some signature in turbidity and conductivity records as well. Such signals are not observed. Three of the six pressure transducers involved in this study were incorporated into hydrology units. While the turbidity and conductivity sensors installed with C4 were disconnected prior to the event and thus give no indication of the failure mode, those sensors installed with C3 and U2 were operating at the time, and no reflection of the event is evident in these records. Thus, crushing of the instruments or wire breakage could not explain the observed pressure records.

We propose a mode of transducer failure that reconciles the seemingly incompatible instrument records. Transient high-pressure pulses, having peak pressures well above the specified transducer measurement range, can impose a permanent strain on the measurement diaphragm. This damage results in an effective shift in the response coefficients a ₀ and a ₁. Recalibration of a transducer after exposure to a high-pressure pulse would yield new values of calibration coefficients b ₀ and b ₁. However, because the original values continue to be used, the calculated pressure fluctuations have incorrect amplitude and offset.

We conducted a series of laboratory experiments to test the validity of the failure hypothesis. Two pressure transducers, identified as PT1 and PT2 and of identical manufacture to those installed in Trapridge Glacier, were calibrated over the range 0–700 kPa (0–71.4 m) at 100 kPa (10.2 m) intervals (all pressures measured relative to atmospheric). Two measurements were taken at each calibration point, first as the pressure was increased from atmospheric to the maximum value and then again as it was released. The lack of hysteresis in these data indicates that the calibration was unaffected by fluctuations in ambient temperature or by adiabatic heating of the air-pressure chamber during testing. After calibration, the transducers were subjected to static pressure values of 1200–17 000 kPa (122–1730 m) at intervals of 500–1000 kPa (51–102 m) using a hydraulic hand pump (Enerpac Model P-39). These values represent pressures well above both the rated transducer pressure limit of 1600 kPa and typical ambient subglacial pressures of 300–800 kPa measured beneath Trapridge Glacier. The pressures were sustained only long enough to record the transducer output (typically 0.5–1.5 min). We shall refer to the extreme pressure P ^* to which a transducer has been subjected as the inherited extreme pressure or “damage pressure”. Accepting the sensor-failure hypothesis, the sensor-response equation is rewritten as V = a ₀(P ^*) + a ₁(P ^*)h, where the damaged-sensor-response parameters are assumed to depend on the device history, encapsulated in P ^*.

The transducers were recalibrated each time that the damage pressure was increased, and changes in response parameters a ₀ and a ₁ were noted. Output voltages are plotted against calibration pressure for PT1 and PT2 in Figure 7a and b, respectively. Each line represents a sensor calibration performed at successively higher values of damage pressure. After being subjected to high damage pressures, both transducers yielded an increased voltage response for a given calibration pressure. This results in an upward shift of the calibration line and effectively changes a ₀ to a greater value.

Fig. 7. Repeated calibration data. Transducers were exposed to an increased damage pressure between calibrations. (a) PT1. (b) PT2.

If the calibration line is shifted sufficiently, the transducer can produce output voltages that are greater than the maximum value measurable by the data logger. As programmed for our experiments, the Campbell data logger cannot measure voltages exceeding ∼27 mV. Figure 7 shows that damage pressures greater than approximately 15 000 kPa (1530 m) can cause calibration shifts sufficient to yield out-of-range output voltages for typical values of subglacial water pressure for Trapridge Glacier. The failure of C4 (Fig. 4c) could thus also be explained by a large pressure pulse.

If the ambient hydraulic head is h = 0 m, the damaged-sensor-response equation yields a voltage of V = a ₀(P ^*). Applying this voltage to the sensor-response equation gives an indicated hydraulic head h ^* = b ₀ + b ₁ a ₀(P ^*), which for damaged sensors differs from h = 0 m and constitutes a calibration offset. In Figure 8a, this calibration offset, h ^*, is plotted against damage pressure. Shifts are first observed at damage pressures as low as 2000 kPa (205 m). Below ∼4000 kPa (410 m), increases in damage pressure produce small calibration shifts (see inset, Fig. 8a). Above this threshold, increases in damage pressure result in large calibration offsets; for both sensors the form of the relationship approximates an exponential increase in a ₀(P ^*) with increasing damage pressure. If transducers installed in Trapridge Glacier fail in a comparable manner, we can estimate the magnitude of the pressure pulses responsible for the offsets in the records of C2 and C3 from these experimental results. The 29.2 m shift in the time series of C2 corresponds to a pulse on the order of 9000–11000 kPa (900–1100 m), with the 52.2 m shift of C3 requiring a pulse of approximately 11000–13 000 kPa (1100–1300 m). If we attribute the failure of C4 to pressure-induced calibration shift to an off-scale value, Figure 8a suggests that the pulse pressure was greater than ∼15 000 kPa (1500 m). While the transducers in this experiment were subjected to multiple damage pressures of increasing value, calibration shifts observed in field records probably resulted from a single pressure pulse. Thus the calibration offset behaviour of a transducer installed in the field might differ from those observed in this laboratory study.

Fig. 8. (a) Plot of calibration offset h ^* against damage pressure for PT1 (solid line) and PT2 (dashed line). Inset: detail of calibration shift at low damage pressures, (b) Plot of calibration slope value against damage pressure.

The parallelism of the calibration lines in Figure 7 suggests that the slope of the calibration line (calibration coefficient a ₁) does not change significantly with increasing damage pressure. Figure 8b plots the calibration-line slope against damage pressure. The pre-damage (P ^* ∼ 0) values of the calibration slope for the two transducers are very similar at a ₁(0) = 0.1551 mV m⁻¹ for both PT1 and PT2. With increasing damage pressure, PT1 shows a small overall decrease in value, while PT2 varies slightly around the initial pre-damage value. The maximum deviation of a ₁ during damage-pressure testing for PT1 occurs at P ^* = 5700 kPa, with a ₁(P ^*) = 0.1534 mV m⁻¹; the maximum deviation of PT2 gives a ₁(P ^*) = 0.1546 mV m⁻¹ at P ^* = 16 000 kPa. These values represent changes in slope of −1.07% and −0.35%, respectively, and may indicate strain hardening due to diaphragm damage (personal communication from P. Jansson, 1999). The calibration constants b ₀ and b₁ of the sensor-response equation are calculated from the initial pre-damage calibration values a ₀(0) and a ₁(0), and thus any change in a ₁(P ^*) results in the scaling of the apparent magnitude of a given pressure signal by the factor a ₁(P ^*)/a ₁(0). For example, a pulse of magnitude P ^* = 5700 kPa would reduce the response of sensor PT1 to a 20 m pressure fluctuation by 0.215 m (−1.07%).

As a consequence of the effective changes in a ₀ and a ₁, the record of an instrument subjected to a high-pressure pulse would appear to abruptly jump to a higher ambient pressure, while the magnitude of diurnal and small-scale fluctuations would change only slightly. Although sudden pressure jumps are easy to recognize in instrument records, small changes in the amplitude of pressure fluctuations are difficult to discern unless the record for an undamaged transducer is available for comparison. Sensors C2 and C1 provide such a complementary pair of field records. In Figure 9 the pressure difference between the two sensors, ΔP = P _C2 − P _C1, is plotted. The pressure record of C1 (dashed line) is shown for comparison. Prior to the event of 2120 h on day 202 (Fig. 9a), C2 registers pressures approximately 0.72 m lower than those measured by C1. Slight deviations from this value (e.g. accompanying the large pressure increase on day 199 and at peak pressure on days 201 and 202) show no systematic relationship between P _C1 and ΔP. After the event (Fig. 9b), ΔP varies sinusoidally around 28.4 m with a peak-to-peak amplitude of 0.154 m. This variation is out of phase with P _C1 and suggests a slight decrease in post-event sensitivity to the 24.9 m diurnal pressure variation measured by C2. The measured difference of −0.151 m suggests a pressure-pulse-induced deviation in a ₁ of −0.606%, comparable in value to changes exhibited by the transducers during laboratory testing.

Fig. 9. Pressure difference between C2 and C1. Time series for C1 (dashed line) is shown for comparison. (a) Detail before event. (b) Detail after event.

To further investigate this behaviour, we model the response of PT1 to a diurnal sinusoidal pressure fluctuation that varies between 40 and 60 m (Fig. 10a). The voltage response is calculated by applying the pre-damage values a ₀(0) = 1.4316 mV and a ₁(0) = 0.1551 mV m⁻¹ to the damaged-sensor-response equation. Substituting the resulting voltage into the sensor-response equation, with b ₀ = −a ₀(0)/a ₁(0) and b ₁ = 1/a ₁(0), yields the calibrated instrument output. To simulate the occurrence of a P ^* = 9000 kPa (918 m) pressure pulse at 0000 h on day 5, we calculate the voltage response of the transducer by switching to the appropriate values of a ₀(P ^*) = 5.675 mV and a ₁(P ^*) = 0.1539 mV m⁻¹ in the damaged-sensor-response equation. This results in a post-event jump of +27.0 m in the calibrated output. Figure 10b details ΔP before the modelled pulse. Because the values a ₀(0) and a ₁(0) are used both in determining the transducer voltage response and in calculating the corresponding pressure, the transducer accurately records the forcing pressure, and thus ΔP = 0. Similarly, the pre-event field records of C1 and C2 (Fig. 9a) show a nearly constant value of ΔP. Figure 10c details ΔP after the occurrence of the modelled damage pulse at the onset of day 5. The post-pulse change in a ₁ of −0.796% results in a response that is 0.159 m smaller than the 20 m forcing. This results in a pressure difference ΔP that varies sinusoidally around +27.0 m and is out of phase with the forcing pressure (dashed line). Comparison with the post-event field records of C1 and C2 (Fig. 8b) reveals very similar behaviour.

Fig. 10. (a) Modelled response of PT1 to a sinusoidally varying pressure function with a 9000 kPa (918 m) pressure pulse at 0 h on day 5. The modelled input pressure is plotted as a dashed line. (b, c) Pressure difference between modelled instrument response and input pressure. Input pressure (dashed line) shown for comparison. (b) Detail before pulse. (c) Detail after pulse.

Although the post-event amplitude reduction recorded by C2 could be explained by a change in the subglacial hydraulic system, the extreme linearity of the effect over the full range of the diurnal pressure variation suggests an instrumental cause. The remarkable similarities between the field records of C2 and C1 and the modelled pressure response of PT1, coupled with the unlikely nature of the hydraulic switching necessary to create the aggregate pressure records, strongly support attribution to transducer failure.

Pressure-pulse generation

While the weak responses recorded by other instruments fail to reveal the origin of the pressure pulses, they do provide constraints on possible sources. Because no pressure pulse was captured in the records, the duration of the pulse must be shorter than the 2 m sampling interval of the data loggers. The lack of response from conductivity and turbidity sensors precludes any significant change in the flow regime of subglacial water, and it is thus unlikely that the release of stored water gave rise to the pressure pulses. Additionally, the duration of such a release event would probably span several sampling intervals. There is little evidence for basal motion in the instrumented region at the time of the event. Although three geophones recorded counts during the event interval, it is unclear if these counts signify local basal motion or if the geophones are simply responding to the pressure pulse. No indication of change in sliding or deformation rates is evident in slidometer or tilt-cell records. The majority of ploughmeters, including those installed in-hole with pressure transducers C1, C2 and U1, do not exhibit any change in measured forcing at the time of the event. The small transient responses measured by PL1 and PL2 (Fig. 4d and e) lag the event time by 4 min and thus cannot be associated with generation of pressure pulses.

Hydraulic transients have been cited as a source of low-frequency seismic waves recorded by earthquake seismographs (Reference St. Lawrence and QamarSt. Lawrence and Qamar, 1979). These transients are caused by abrupt changes in water velocity in subglacial conduits and are analogous to the “water-hammer effect” commonly associated with piping systems. Although this mechanism can generate pressure pulses having sufficiently large magnitude and short duration to reproduce the observed instrument responses, it requires the high water velocities typically associated with conduit drainage. No evidence for conduit drainage has been found at Trapridge Glacier; water transport is instead thought to be dominated by flow along a permeable horizon of sediments at the ice–bed interface (Reference StoneStone, 1993). Inferred flow rates of approximately 0.01–0.1 m s⁻¹ (Reference Stone and ClarkeStone and Clarke, 1996) are too low to produce pressure transients capable of damaging the transducers.

We propose that extreme pressure pulses can be generated by abrupt glacier motion that compresses or dilates the subglacial hydraulic system. While no evidence for local basal motion is indicated by mechanical sensor records, transmission of remotely generated pulses through the hydraulic system seems plausible given the large-scale hydraulic communication evident from the connected transducer records (Fig. 4a). While it is unclear to what degree the hydraulic system is compressed by abrupt basal motion, the low compressibility of water (β = 5.1 × 10⁻¹⁰ Pa⁻¹) indicates that even a small volume change would result in a large increase in pressure. Because transmission of a pressure pulse does not require significant movement of basal water, little response would be expected in conductivity and turbidity records.

Spatial variations in the hydraulic system could result in modulation of the pulse magnitude, and thus individual pressure transducers would likely be affected differently by any given pulse. Negative pressure pulses are indicated by the large offsets observed in the records for transducers U1 and U2 (Fig. 4b). An extreme pressure pulse in the drainage system could result in the rapid transfer of overburden pressure from unconnected regions of the bed. This sudden drop in overburden pressure could create a strong negative pressure transient in unconnected regions, producing the observed negative transducer offsets. Through these mechanisms, a single pulse could give rise to the differing pressure-sensor responses.

The records of G1 and G2 (Fig. 4e and f) show peak count rates 2–14 min after the event time, and elevated count rates are measured for as long as 46 min following the event. Two ploughmeters demonstrate increased forcing 4 min after the abrupt changes in the transducer records. If the observed transient increases can be attributed to basal motion, the records suggest that the pressure transients are able to locally decouple the glacier from its bed and thereby induce basal motion.