800 MHz impulse radar

The 800 MHz radar was a Malå Geoscience RAMAC system with 800 MHz shielded antennas (essentially a ground-coupled bowtie). The antennas were placed on a plastic sledge and dragged behind the snow-scooter sledge (Fig. 2). Pulses were triggered at a rate of 4 traces s⁻¹. At our average driving speed of 8 km h⁻¹ this corresponds to 2 traces m⁻¹. Each trace was resolved with 1024 samples at 16 bits over a time window of 186 ns so that one wavelength (in air) is resolved by seven samples. Most commercial GPRs are built with a bandwidth approximately equal to the centre frequency; the resolution of the radar is therefore approximately 19 cm in air or 10 cm in ice (using an average relative permittivity, ε _r = 3.15 for ice). Processing was performed using the software ReflexW (http://www.sandmeier-geo.de) and included a dewow filter (removing low-frequency signals within each trace) and background removal (to remove horizontally constant signals which are mainly instrumental noise). The system noise, calculated as the mean signal level before the direct wave, normalized to the peak direct wave power, is −26 dB.

5.3 GHz frequency-modulated continuous-wave (FMCW) radar

The radar used to acquire the 5.3 GHz data was a polarimetric FMCW radar (Reference Hamran, Langley, Daniels and ChenHamran and Langley, 2006). The antennas are dual-ridged horns with a gain of 6.6–7.4 dB and a 3 dB beamwidth of 70–65° in both planes over the bandwidth used. They are contained in a box suspended 30 cm above the snow surface on an arm protruding from the side of the snow-scooter sledge (Fig. 2). The frequency sweep is 4.8–5.8 GHz, giving a centre frequency of 5.3 GHz and a bandwidth of 1 GHz. We acquired 2 traces m⁻¹, although the sweep itself only takes 20 ms.

We refer to polarization in terms of X and Y, whereby the X plane is aligned in the direction of the GPR travel (i.e. along glacier) and the Y plane is perpendicular to the direction of travel (i.e. across glacier). The data were collected and processed in the frequency domain. A Hamming window was applied to reduce the side lobes, followed by conversion to the time domain with a fast Fourier transform algorithm. The bandwidth of 1 GHz should yield a resolution of 0.15 cm in air (Reference DanielsDaniels, 2004). However, a side effect of the Hamming window is a broadening of the main lobe, which influences the obtainable resolution. Inspection of the data suggests that the filter causes a 25% broadening of the main lobe. Resolution is therefore reduced to 1.25 ns, equal to 19 cm in air or 10 cm in ice (ε _r = 3.15).

The data were calibrated using a technique proposed by Reference Sarabandi, Ulaby and TassoudjiSarabandi and others (1990) for field calibration of polarimetric radars. The method determines the phase and amplitude deviations in the antennas from the nominal gain values. These field transfer functions were obtained using two reference targets: a sphere with radar cross-section 0.1 m² and a diplane, which has a strong cross-polarized radar cross-section. This method is particularly applicable to field operations, as it does not require accurate alignment of the calibration targets or knowledge of the radar cross-section of the depolarizing target (i.e. the diplane) (Reference Sarabandi, Ulaby and TassoudjiSarabandi and others, 1990). For the calibration measurements, the calibration targets were placed at a horizontal distance of 1 m from the radar. To improve the signal-to-noise ratio, a measurement was also made without the targets, allowing the background signal to be removed.

Comparison of the different polarizations shows that the co-polarized channels YY and XX are approximately equal, as are the cross-polarized channels YX and XY. Thus we limit ourselves to the presentation of the YY and YX data as representation of the co- and cross-polarized responses respectively. There is some noise (system artifacts) in the X channel, which is noticeable in the figures as a horizontal banding. The system noise, calculated as the mean signal level after the direct wave for a shot in air, and normalized to the maximum profile value, is −28 dB for the co-polarized channel and −8 dB for the cross-polarized channel.

Radar backscatter using the radar equation

In order to compare the two radar systems we convert the radar response to a scattering cross-section, σ _M, σ_YY and σ_YX (where the subscript M denotes the 800 MHz frequency, and YY and YX the co-and cross-polarized channels of the FMCW 5.3 GHz radar). _q (where q = M, YY or YX) was calculated according to the standard radar equation (Reference Ulaby, Moore and FungUlaby and others, 1981),

where P _t and P _r are the transmitted and received power, G is the antenna gain, is the wavelength, V _s is the scattering volume, R is distance from the radar, and is attenuation.

Wavelength is dependent on the velocity profile of the medium, as is the scattering volume which also includes ray bending at interfaces. Velocity profiles are based on density measurements in snow pits and common-midpoint (CMP) measurements taken at stakes 6–8. An average velocity of 231 m μs⁻¹ is used for the snowpack. For ice and firn, bulk velocities derived from the CMP measurements of 190 m μs⁻¹ and 220 m μs⁻¹ respectively are used. These are constant over depth.

Radar-specific parameters such as antenna gain and beamwidth (necessary for the calculation of the scattering volume) are unknown for the 800 MHz radar, and arbitrary values were assigned (gain of 7 dB, beamwidth of 60°). This is justified since these parameters are constants and are applied to each trace, resulting in a constant trace offset.

Attenuation, α, is a combination of the absorption and scattering losses experienced by the wave as it travels through the medium. In ice, the absorption is frequency-dependent (Reference Robin, Evans and BaileyRobin and others, 1969). Extrapolating from the graphs provided by Reference Robin, Evans and BaileyRobin and others (1969), loss due to absorption in ice at −1°C is on the order of 0.08 dB m⁻¹ at 800 MHz and 0.32 dB m⁻¹ at 5.3 GHz. In addition, the loss due to scattering from air bubbles will be greater at 5.3 GHz than at 800 MHz, but is an unknown quantity. In the firn, attenuation is estimated from dielectric profiling of the firn cores (described below). An average conductivity of 7 μs m⁻¹ was measured, giving a loss tangent very much lower than 1 (i.e. ε″/ε′ ≪ 1), indicating this to be a very low-loss medium. Absorption losses are therefore assumed to be frequency-independent and much lower than in the ice. According to our assumptions, attenuation in the firn is thus due to scattering losses, which are very much greater at 5.3 GHz than at 800 MHz, but again undetermined. Since the actual attenuation is unknown, this term remains a factor in our calculated scattering cross-section, and the values presented here are weighted scattering cross-sections, σ _wq :

From σ _wq , the backscatter coefficient is calculated as the sum of all scattering responses over the length of each trace:

This integration is performed from 0 to the depth equivalent of 100 ns so that the same time window is applied to both radar systems. Changing the integration time window beyond 50 ns does not significantly alter the pattern of backscatter along the radar profiles.

Our use of σ _wq and is for a relative comparison of backscatter along the profile as measured by the two radar systems. The focus is therefore on the relative changes rather than the absolute values.

Superimposed ice core

A single 5 m long core was taken in the superimposed ice area (location indicated in Fig. 1). Digital images with below and side lighting were taken of the whole core length. The images (9 m⁻¹) were stitched together to form a single image of the core (Reference SjögrenSjögren and others, 2007), illustrating the variability and range of structures within the ice (Fig. 3). Due to the lighting, clear ice is white, whereas bubbles show up as black. An attempt was made to weigh representative sections within the core to obtain density estimates, but this was unsuccessful. Instead, to obtain a measure of the variability of the bubble content along the core, we integrate the digital image pixel values across the core. The values are then normalized, smoothed and thresholded at 70% to highlight where the highest and lowest bubble concentrations are.

Fig. 3. Top 117 cm of the superimposed ice core, taken 1 km up-glacier from stake 6; 0 cm is at the previous summer surface. The different textures seen are due to varying air-bubble content (air bubbles are dark).

Firn core

Five firn cores, each approximately 10 m long, were recovered in a 10 m grid in the firn area (Fig. 1). The cores were analysed with a dielectric profiler (DEP) instrument (Reference Wilhelms, Kipfstuhl, Miller, Heinloth and FirestoneWilhelms and others, 1998) and digital imagery for visual interpretation. The digital imagery was done using a similar set-up to that for the superimposed ice core but using side lighting (Reference SjögrenSjögren and others, 2007). In this case, firn appears bright and ice dark (Fig. 4). The DEP instrument measures the capacitance, C, and conductance, G, of the ice and firn at 250 kHz in 5 mm steps along the cores. The electrodes are 10 mm long and the measurements are influenced by the material properties over approximately a 30 mm window, so data close to cracks in the ice/firn have been excluded.

Fig. 4. Digital imagery of the upper sections of firn cores 1 and 2, along with the DEP-derived permittivity profiles. Firn appears white and ice dark. The depth scale starts at the previous year’s summer surface.

The DEP measurements are converted to relative permittivity, ε _r (non-dimensional), and conductivity, cond (S m⁻¹), according to (Reference Kohler, Moore and IsakssonKohler and others, 2003):

where ε _air = 8.854187 × 10⁻¹² F m⁻¹ is the permittivity in vacuum and C _air = 64.5 × 10⁻¹⁵ F is the free-air capacitance, a constant obtained by taking a reading with an empty instrumental set-up. Density (in kg m⁻³) is then calculated from (Reference Kovacs, Gow and MoreyKovacs and others, 1995; Reference Eisen, Nixdorf, Wilhelms and MillerEisen and others, 2002):

The density differences within the core (i.e. firn or ice) are much larger than the absolute accuracy of the measurements, thereby justifying the relatively simple conversion made with Equation (5).

Due to the smoothing nature of the sample window (approximately 30 cm), abrupt changes in density, transitions that are not horizontally flat, and very thin layers are probably not correctly resolved. This is problematic for GPR comparisons since the nature of an interface (with respect to the radar wavelength) is important for determining how the wave will be reflected. It is for this reason that we complement the DEP record with digital images.

The winter snowpack at the time of data collection was nearly 2 m deep. Since this snow is less consolidated and thus not suitable for transportation, the actual DEP measurements start at approximately 1.8 m depth, the top of the firn. The permittivity profile of the snowpack was obtained from density measurements in snow pits about 10 m away from the core sites, and by bulk weight/volume measurements of the upper core pieces that were not transportable.

These processing steps give a density vs depth profile for each core. To compare these profiles with the GPR profiles, the depth scale is converted to two-way travel time, TWT, using:

where z is the depth interval, Z is the total depth and v _air = 3 × 10⁸ m s⁻¹. The profiles (examples in Fig. 4) are interpreted visually where high values indicate ice and low values indicate firn.

Radar response to superimposed ice

The superimposed ice area extends up-glacier from 0 to 2.5 km. It has a clearly different radar signature compared to the firn for both frequencies and polarizations shown (Fig. 5a–c). The undulations are caused by variable rates of superimposed ice accumulation influenced by topography, as discussed above. The cause of the layering and reflections is discussed below.

The superimposed ice core revealed that bubbles of the order of 1–5 mm predominate at this location in the superimposed ice, but larger bubbles of the order of 10 mm and smaller bubbles are also seen. Comparison of the processed digital imagery of the superimposed ice core with the radargram (Fig. 6a) indicates that the areas of high bubble content (red) correspond well with the bands of higher backscatter. The exact vertical positioning of the core within the radargram is dependent on the velocity profile used to convert the core depth axis to time and also the positioning of the core with respect to the PSS. To address the former, we show the core with time axes converted using ±10% of our CMP velocity (Fig. 6b and c). The relationship of high bubble content and high backscatter holds well for the lower velocity, but breaks down at depth for the higher velocity. Still, the fit is good enough to suggest that, in the superimposed ice, the reflection horizons in the radar profiles are the result of density contrasts caused by varying bubble content.

Fig. 6. Comparison of the 5.3 GHz co-polarized radargram with the integrated, normalized, smoothed and thresholded (70%) superimposed ice core. Blue represents low bubble content; red represents high bubble content. Depth-to-time conversion of the core was performed with a velocity of (a) 190 m μs⁻¹, the bulk CMP velocity, (b) 171 m μs⁻¹ and (c) 209 m μs⁻¹.

The cores and radar data thus show that, using 800 MHz, the greatest reflection occurs at the PSS due to the relatively high permittivity contrast there (snow to ice). Below the PSS, the density contrast between the layers is relatively small, hence the lower backscatter compared to firn (discussed later). The evolution of through the superimposed ice area (Fig. 5d; 0–2.5 km) is a consequence of both the number of layers per metre depth and the overall depth of the superimposed ice. More interfaces over a given depth result in more reflections and thus a higher . An increase in the vertical extent of the superimposed ice leads to an increase in the number of potential reflection horizons, leading to an increase in down to the penetration limit of the radar system (which is at least as great as the time window here).

At 5.3 GHz the PSS induces both a co- and a cross-polarized response (Fig. 7a), and is therefore probably a rough interface. Within the ice below, relatively strong reflections at layer interfaces dominate the co-polarized response, as at 800 MHz, giving the clear layered structure (Fig. 5b). Scattering also occurs at the interfaces and to a lesser extent between them (Fig. 5c). With a wavelength of ∼3 cm in ice, the scattering is probably due to the size and distribution of the air-bubble inclusions, which are mostly sub-centimetre size, rather than individual air bubbles. The areas of very low backscatter, i.e. at ∼30 ns between 1100 and 1600 m for both the co- and cross-polarized response, are interpreted as ice with very few or very small air bubbles. Such clear layers are less common in the upper 500 m of superimposed ice (2000–2500 m), which has a different structure than the down-glacier superimposed ice (0–2000 m). In this upper 0.5 km of the profile, horizons are less distinct and more closely spaced (more layers per unit depth), resulting in more uniform scattering over depth (Fig. 5b and c). The reason for this difference could be related to the proximity to the firn line.

Fig. 7. (a) Traces illustrating the 5.3 GHz co-polarized and cross-polarized normalized scattering cross-section extracted from Figure 5. The cross-polarized response is given in red and the co-polarized response in blue. (b) Co-polarized and cross-polarized backscatter trends over depth for the superimposed ice and firn areas. Each trace is an average of 100 consecutive traces. The PSS response is indicated by the dashed grey arrows. Reflection horizon at the bright layer (BL in Fig. 5 and text) is marked.

In the superimposed ice, a number of isolated patches of strong incoherent scattering occur, indicating areas of more complex structure. These are labelled ‘a’–‘d’ in Figure 5c. In cases where the increased scattering is aligned along a horizon, it is attributed to more favourable bubble size/ distribution. Patches ‘b’ and ‘c’ are of this sort. Patch ‘a’ lies below a surface drainage channel clearly seen in the PSS. The relic and existing drainage structures could well be the cause of the greater scattering. Patch ‘b’ also lies beneath an area of higher drainage (assumed from the anticline nature of the layers), and thus may also be associated with this. Patch ‘d’ is composed of a number of isolated patches, not fully resolved by the 5.3 GHz radar, but clear at 800 MHz (Fig. 5a). The cause of these is unknown, but similar reflections have been observed with an 800 MHz radar on Austfonna, Svalbard (personal communication from T. Dunse, 2007).

Radar response to firn

The firn area extends up-glacier from 2.5 km and is characterized by gently up-glacier-dipping layers. Although visually quite distinct, the transition from superimposed ice to firn is likely to be a zone where the two facies inter-finger somewhat due to fluctuations of the snowline over time. Indeed horizons can be traced across this transition zone (e.g. the layer marked F4 (Fig. 5a)).

Cores taken in the firn area reveal it to be a highly variable medium, with ice lenses varying in thickness from millimetres to >0.5 m over relatively short horizontal distances. The digital images reveal a degree of heterogeneity not apparent in the DEP record (due to the across-core averaging in the latter), with layers sloping at 10–15° and vertical ice fingers, sometimes present on just one side of the core slice (the photographed slices are 7.5 cm wide). We observe that features more than 0.15 m thick are traceable between cores (approximately 10 m), while thinner ice features are highly irregular and localized. We refer to the thicker traceable features as ice layers, and the thinner less extensive features as ice lenses.

Comparison of the cores with the 800 MHz radar profile shows that, below the PSS, reflection horizons correspond to firn–ice interfaces. Phase changes at these interfaces are in agreement with the expected permittivity changes, i.e. incoming wavelet has the same phase polarity as the emitted wavelet if the reflection is caused at an interface of low to high permittivity, such as firn to ice, and is reversed when the interface goes from high to low permittivity, such as from ice to firn (Fig. 8). To interpret the radargram away from the core sites, we use the phase of the radar reflection to indicate the ordering of firn/ice layering (Reference Arcone, Lawson and DelaneyArcone and others 1995). Layers F1–F4 are associated with the top and bottom of relatively thick ice layers (Fig. 5a). We find that for thick ice layers, the firn–ice interfaces give more continuous reflection horizons whilst the actual ice body is a low-backscatter band in the radar profile (compare the end of the radar profile in Figure 5a with the averaged DEP profile; low-backscatter layers correspond to ice layers, i.e. high permittivity). Smaller ice lenses that are not so laterally extensive give a more clutter-rich response where individual ice lenses cannot be easily traced. At 800 MHz (wavelength 37.5 cm in air, 26.5 cm in firn of ε _r = 2), scattering from firn grains almost certainly does not occur. Depth-hoar layers may also play a role, but the lower preservation potential of these low-density, coarse layers (common in firn exposed to extensive summertime percolation) makes them hard to capture in the cores.

At 5.3 GHz, scattering is much more effective in the firn than in the superimposed ice. This is seen by the much greater increase in the total relative cross-polarized backscatter compared to co-polarized backscatter (Fig. 5d at ∼2500 m). The wave is attenuated, and strong coherent reflections are limited to the upper 50 ns of signal penetration.

Low-backscatter areas are apparent for both co- and cross-polarized responses. These were identified as ice layers in the 800 MHz profile. The traced interfaces indicate that, while there is a coherent response at the top and bottom of the ice layers in the final (down-glacier) 1 km of firn, scattering is not concentrated there (Fig. 5b and c; F1–F4 at 2500–3500 m). Rather, scattering tends to be stronger in the areas between the large ice layers where firn is presumably intermixed with thinner, laterally less extensive ice lenses and pipes, resulting in clutter-rich radar layers at this frequency.

Particularly notable is the bright layer labelled BL in Figure 5b and c, which, for the co-polarized response, is on average 5 dB brighter than the PSS. The narrow width of the reflector and lateral extent suggests that it is associated with a continuous feature. Interestingly, it is approximately at the depth of BL that strong scattering appears to start and continues over depth in the cross-polarized response (Fig. 7b).

Comparison of the location of this reflection with the DEP core profiles places it approximately 1 ns (approximately 11 cm) below the base of the first sizable ice layer (Fig. 9; ice layer at 23–27 ns). This location is in agreement with the depth of BL at the upstream end of the along-glacier profile (Fig. 5b; compare the end of the radargram with the permittivity profile, which is an average of all five DEP profiles). We believe this reflection is associated with the base of the ice layer, but there are uncertainties including: (a) radar resolution (at best 10 cm in ice), (b) possible delay of response peaks due to scattering, (c) possible digitization uncertainties, and (d) uncertainties in the velocity profile (±10% would result in a 1 cm shift up or down). That the reflection comes from the base of an ice lens as opposed to the top is reasonable. The upper boundary of an ice layer is expected to be more irregular due to feeder ice fingers, or due to differential lateral spreading and freezing of meltwater. This upper boundary may exhibit a more gradual change from firn to ice, giving a less discrete permittivity contrast. In the 800 MHz radargram, the bases of ice lenses are certainly easier to follow than the tops.

Fig. 8. 800 MHz profile in grid section at stake 8 in the firn area (Fig. 1). The profile passes over cores 1 and 2 at the approximate locations indicated by the arrows. The DEP-derived permittivity profiles for the five cores, C1–C5, are shown either side of the radargram. Red dashed lines show the mean depth (in ns) of the interfaces.

Fig. 9. 5.3 GHz co-polarized profile in the grid at stake 8 in the firn area (Fig. 1). The profile passes over cores C1 and C2. The approximate location of the cores is indicated by the arrows. The DEP-derived permittivity profiles for the five cores, C1-C5, are shown either side of the radargram. Red dashed lines are the mean depth of interfaces digitized on the 800 MHz grid profile. The green dashed line is the mean depth of the bright layer (BL).

Why this ice layer should cause such a strong backscatter response at 5.3 GHz compared to 800 MHz is unclear, but is surely linked to some physical property of the horizon. Close inspection of the firn cores reveals that the first large ice layer (Fig. 4; 23–27 ns) contains a lot of bubble inclusions similar in size and structure to those observed in the superimposed ice core, and thus potential scattering sources at 5.3 GHz. Excavation of the layer may help resolve this question.

Averaging a number of traces (100 traces) in both the superimposed ice and the firn areas gives the backscatter trend over depth (Fig. 7b). Although we cannot identify specific scattering sources from this, it provides insight into the differences between the two areas with respect to the scattering mechanisms. In the superimposed ice area (below the PSS response), the magnitudes of both the co- and the cross-polarized responses remain approximately parallel and constant over depth (Fig. 7b). In the firn area (below the PSS response), the magnitude of the co-polarized response drops off exponentially, whilst that of the cross-polarized response increases very slightly by ∼1 dB. This confirms that scattering is significant in the firn where greater depolarization of the wave occurs the greater distance it travels through the medium.