Surface elevation change

The elevation change of the ice-sheet snow surface is the consequence of several vertical velocity components as illustrated in Figure 2. Snow accumulation increases the surface height at the rate A(t)/ρ ₀, where A(t) is the accumulation rate and ρ ₀ is firn density at the surface (≈300 kg m⁻³). Firn compaction, ice flow and surface ablation reduce the surface elevation (H),

Fig. 2. The velocity components contributing to surface elevation change at a given location are accumulation, ablation, firn compression, and the vertical motion due to ice flow.

where V _fc (z ₀, t), V _ice and B(t) are the components of vertical velocity of the surface due to firn compaction, ice flow and surface ablation, respectively. All components in Equation (1) are a function of time (t), but V _ice changes on time-scales much longer than the seasonal changes of the other components. In dry-snow zones such as the Greenland summit, B(t) may be neglected. On short time-scales (e.g. decadal), V _ice is approximately constant. Therefore, variations of the surface height H(t) on seasonal to interannual time-scales are determined by variations in the rates of snow accumulation and densification.

Velocity of firn compression

In steady state, the mass flux, V(z)ρ(z), through any firn depth is a constant that is equal to the mean accumulation rate, 〈A〉 = ρ _i V _ice, where 〈A〉 is independent of time and ρ _i is the density of solid ice (917 kg m⁻³), so V(z) = (ρ _i/ρ(z))V _ice. Since the total velocity V(z) is equal to V _fc(z) + V _ice, the velocity of firn compaction, V _fc(z), due to densification of firn below depth z is given by

For example, near the surface, V _fc(0) ≈ 2.1 V _ice, and the total downward velocity of firn near the surface is V(0) ≈ 3.1 V _ice. Therefore, during short intervals when A(t) = 0, the rate of surface lowering is about three times faster than the downward motion of ice at depth below the firn, even though the system is in steady state and dH(t)/dt = 0 on longer time-scales.

In non-steady state, V _fc(z, t) depends on the integral of the rate of densification below depth z,

where z _i is the depth at which ρ(z) is ρ _i.

Firn densification rate

The densification rate at depth in dry firn is determined by the overlying pressure, firn temperature and firn density (cf. Reference BaderBader, 1962; Reference Shapiro, Johnson, Sturm and BlaisdellShapiro and others, 1997). In our model, we use a constitutive equation for densification based on the semi-empirical equation derived by Reference Herron and LangwayHerron and Langway (1980):

where K is a “rate constant”, which is solely dependent on temperature, and A is the mean accumulation rate. The constitutive relation given by Equation (4) accounts for effects of stress and temperature on the densification rate, without attempting to describe the specific processes in the pressure sintering of ice such as grain-boundary sliding (Reference AlleyAlley, 1987a), dislocation creep (Reference Wilkinson and AshbyWilkinson and Ashby, 1975) and boundary and lattice diffusion (Reference CobleCoble, 1970) as used in the treatment by Reference Arthern and WinghamArthern and Wingham (1998).

Equation (4) was based on the suggestion that the proportional change in air space during densification is linearly related to the change in stress due to the weight (p) of overlying snow (Reference RobinRobin, 1958), i.e. dρ/dt ∝ (ρ _i − ρ) dρ/dt. The weight change is represented by the accumulation rate (A) which is normally a function of time (t), i.e. dρ/dt = A(t)/ρ _i, and K(T) represents the constant of proportionality. The exponent α is an empirical constant introduced by Reference Herron and LangwayHerron and Langway (1980) to account for differing stages of densification or densification mechanisms. Using data collected from 17 sites in Greenland and Antarctica, Reference Herron and LangwayHerron and Langway (1980) derived a value of α ≈ 1 for densities less than 550 kg m⁻³, and we use α ≈ 1 for all densities.

The temperature dependence of the densification rate has been taken to follow the Arrhenius relation

similar to formulations for the processes of ice creep and grain growth. Although both K ₀ and the activation energy E have usually been taken to be constants independent of temperature, Reference BaderBader (1962) found that E varies from 41.8 to 100.4 kJ mol⁻¹ for snow with different densities, with a “reasonable mean” of 58.6 kJ mol⁻¹. Reference Herron and LangwayHerron and Langway (1980) empirically derived average E values of 10.16 and 21.4 kJ mol⁻¹ for densities below and above 550 kg m⁻³, respectively. Reference AlleyAlley (1987a) obtained a value of 41 kJ mol⁻¹ from modeled density profiles for four Antarctic sites, a value which is rather close to the one often used for grain growth (42 kJ mol⁻¹; Reference PatersonPaterson, 1994). However, previous studies on ice creep and grain growth (e.g. Reference Barnes, Tabor and WalkerBarnes and others, 1971; Reference Budd and JackaBudd and Jacka, 1989) suggested that the activation energy is a function of temperature. Based on laboratory data on grain-growth and ice-creep rates, Reference Jacka and LiJacka and Li (1994) examined the temperature dependence of the activation energy (Fig. 3a) by applying Equation (5) to data for small increments of the temperature. They found that E(T) increased significantly with temperature, especially above −10°C. Values of E for grain growth were similar to the values for ice creep.

Fig. 3. Field and laboratory experiments of ice-grain growth data show that both activation energy E (a) and the rate “constant” K ₀ (b) are strong functions of temperature. E(T) data and K(T) values obtained from Reference Jacka and LiJacka and Li (1994).

Increasing values of E(T) with increasing temperature cause the rate K(T) in Equation (5) to decrease with temperature, if K ₀ is taken to be a constant. However, a decrease would be in marked contradiction to the measurements of K(T) that show a strong increase with temperature (Reference Jacka and LiJacka and Li, 1994). To increase with temperature strongly enough given the data on activation energy, the factor K ₀(T) in Equation (5) must increase with temperature. Using the K(T) data for grain growth given by Reference Jacka and LiJacka and Li (1994, table 2) and their derived E(T) values, we derived the corresponding K _0G(T) as shown in Figure 3b. The best-fit power-law curves through the activation energy E(T) and the corresponding values of the K _0G(T) factor are shown in Figure 3a and b. Both curves have correlation coefficients greater than 0.99. The stronger temperature dependence of K _0G(T) compared to E(T) is shown by the larger exponent on the inverse temperature.

To account for differences between the rates for the processes of densification and grain growth, we introduce an empirical constant β in the rate factor K ₀(T):

where K ₀(T) is the rate factor for densification and K _0G(T) is the derived factor for grain growth. Changing the value of β varies the rate of densification, and should therefore change the gradient of density with depth in the modeled density profiles. Figure 4 shows a numerical experiment with our densification model (described below) for three values of β using the smoothed density profile from the Greenland summit as an initial condition in the model. As expected, the gradient of the density changes with β. In addition, the modeled amplitude of the seasonal cycle of density also varies with β. The chosen value of β = 8.0 produces a modeled density profile that matches the smoothed density profile of the initial condition (also shown in Fig. 4). Although the measured profile appears to lie notably below the modeled profile in the figure, the smoothed value is actually very close to the measured density (difference is <10 kg m⁻³), because the modeled seasonal variation in density is not symmetrical.

Fig. 4. Comparison of density profile computed at three different values of empirical constant β as indicated beside each curve.

Firn temperature profile

Li and others (in press) have analyzed firn- and ice-temperature evolution driven by surface air temperature during the period 1982–99 for the Greenland summit. The temperature analysis follows the standard one-dimensional time-dependent heat-transfer equation (Reference PatersonPaterson, 1994) written by

where c = c(T) is the heat capacity and k = k(ρ(z), T) is the thermal conductivity, v is vertical velocity, and f is internal heating. For the advection term, which is small, we use v(z) = 〈A〉/ρ(z) based on steady-state conditions and a constant 〈A〉 = 250 kg m⁻² a⁻¹. The small f term is also neglected.

Figure 5a presents computed firn-temperature variations at several selected depths over the period April 1992–April 1999. We use daily mean temperature data (Fig. 1) and an approximation for the diurnal temperature cycle of about 9°C. The approximation in our model takes the temperature for half of each day to be the daily mean plus 4°C, and for the other half-day the daily mean minus 4°C. The temperature analysis shows that in addition to the seasonal cycles of firn temperature, significant interannual variations of the mean summer (June–August) temperatures occur at various depths. The interannual variability of summer temperature is > 5°C at the surface, diminishing to about 1°C at 10–15 m, as shown in Figure 5b. The trend in surface summer temperature is positive at 0.3°C a^–1, and the trend in mean annual temperature for this period is also positive at 0.4°C a⁻¹.

Fig. 5. (a) Variations of firn temperature calculated at several depths above 15 m for the Greenland summit region, April 1992–April 1999. The number beside each curve indicates the corresponding depth. (b) Interannual variations of summer (June–August) mean firn temperatures at several depths, April 1992–April 1999. The trend in surface summer temperature is +0.3°C a⁻¹.

Multi-layer numerical model

The surface height variations with time (Equation (1)) depend on the variations of new accumulation at the surface, A(t), and variations in the velocity of firn compaction, V _fc(z, t), as given by Equations (3–6). The rate of firn densification at time t depends on the existing density profile ρ(z, t), as well as the temperature profile, T(z, t), which also depends on the density profile according to Equation (7). Therefore, V _fc(z, t) depends on the densification and temperature history, and solution of the time-dependent equations must be coupled in order to calculate V _fc (0, t) and dH/dt.

The equations are solved using a multi-layer numerical model. Taking the density within each layer n of thickness h_n to be uniform, the rate of change (v_nj ) of the layer thickness that is caused by the density change at depth z_n for one time interval (dt) at time j is given by

We consider densification in the firn between the surface and depth z _d to be the seasonal part, where z _d ≥ 15 m, because of seasonal variations of firn temperature in this range, and below z _d as the non-seasonal part. Below z _d, the vertical velocity of firn compression is calculated based on Equation (2) under the steady-state conditions from

which is therefore independent of the small temperature variations below z _d. Above z _d, Equation (7) is used to calculate firn temperatures.

After substituting V _ice = 〈A〉/ρ _i, neglecting B(t), and splitting V _fc(z) into three terms, Equation (1) for the height change dH for each time-step, dt, becomes

The model is initialized at t = 0 with the measured density profile measured at the summit (personal communication from J. F. Bolzan, 1999). The vertical velocity from additional accumulation at each time-step is upward by A(t _j)dt/ρ ₀, followed by a decrease on subsequent days as the new precipitation compresses. The compression of the new layers is given by the second term, which sums from 1 to M − 1 the change in thickness of these layers, as given by Equation (8), where M is the new surface layer formed at t _j, and M = t _j/dt is the total number of these layers. The firn from the initial surface to z _d, which is initially set to 15 m, is divided into N layers, each with initial thickness of 0.1 m. Near the surface, these layers correspond to about 1/7 of the annual deposition. The third term sums the change in thickness of the N layers, also as given by Equation (8). The fourth term is V _fc(z _d) for the compression below z _d, which is given by Equation (9). The surface elevation H(t) is obtained by numerical integration of Equation (10).

Seasonal elevation and densification variations

To examine seasonal variations, the densification/elevation model is driven by a constant accumulation rate of 〈A〉 = 250 kg m⁻² a⁻¹ and a fixed seasonal cycle of surface air temperature. The temperature cycle has an annual mean of −29°C and a seasonal amplitude of 27°C, with a maximum In July. The model time-steps are dt = 12 hours, and for each time-step A(t_j ) · dt = 〈A〉/730. Diurnal temperature variations, which can be significant in the top meter of firn, are included in the model because of the strong non-linear dependence on temperature. As noted above, the diurnal cycle is approximated by adding 4°C to the seasonal cycle for half of each day and subtracting 4°C for the other half. This treatment is rather close to field observations. Reference Alley, Saltzman, Cuffey and FitzpatrickAlley and others (1990) monitored hourly surface snow-temperature variation at the GISP2 site. Their data indicate that 12 hour mean surface temperature is about 5°C above and below the daily mean.

Figure 6a shows the seasonal variations in the surface elevation, which are expanded in Figure 6b, as well as the sinking of the initial surface as it is buried with additional accumulation. April is chosen as the starting month because that is the start of the altimeter elevation series and corresponding data in Figure 1. In this case, the driving of surface increases is constant in time, and the resulting seasonal variations in the surface elevation are driven solely by the temperature-dependent variations in densification. The modeled peak-to-peak amplitude of the seasonal variation of surface height is 18 cm, which is close to the 25 cm mean amplitude shown in the radar altimetry measurements. The minima occur in late August which is also close to the mid-July average minima in the altimeter elevation data.

Fig. 6. Modeled steady-state seasonal variations of surface elevation for the Greenland summit (a, b) together with corresponding density changes (c). Solid and dashed lines in (c) show the modeled density variation and thefield density measurements (personal communication from J.F. Bolzan, 1999), respectively. The variations are driven by surface air temperature with a regular annual cycle with amplitude 27° and mean ∼29°C at constant accumulation rate of 250 kg m⁻² a⁻¹ The seasonal variation in surface elevation is 18 cm, but the seasonal variation in the height of the initial surface decreased quickly as it was buried by new accumulation. The seasonal variation in density is about 140 kg m⁻³, which decreases with depth.

Much of the firn densification and consequent surface lowering occurs during about 3 months of the late-spring to early-summer season when the upper firn is warmest. After the maximum in summer temperature in July, the upper firn cools and the rate of densification decreases. After the period of maximum compaction ends in late summer, the accumulation rate dominates the compaction rate through winter until the next spring and the surface rises. The enhanced firn compaction driven by the higher temperatures of summer is most striking in the near-surface firn within 1 m, and quickly diminishes with increasing depth, as indicated by the small variations in elevation of the initial surface curve in Figure 6a.

The diurnal temperature cycle is also significant in warming the upper part of the firn and increasing the rate of summer densification. When the model is run with a fixed daily temperature, without the approximation for the diurnal cycle, a slightly large value of β = 11 is required to match the modeled density profile to the measured profile. The corresponding seasonal amplitude is also somewhat smaller at 11 cm instead of 18 cm.

The seasonality of the compaction rate is also reflected in the seasonal variations in the density profile (Fig. 6c). Corresponding density variations with depth are shown in the density measurements made at 10 cm depth intervals. The density-profile data from the summit core (personal communication from J. F. Bolzan, 1999) for the top 4 m are also shown in Figure 6c. The model and the core data are reasonably similar considering that the point measurements of the core also include spatial variability in deposition processes not included in the model. The magnitude of the density variations, which is about 100 kg m⁻³ in amplitude, reduces with increasing depth in both the model and the measurements, but not as much in the field data below 4 m as would be implied by the small amplitudes at 2–4 m depth. Below 4 m, the core data also show approximately one cycle in density per year. A similar seasonal density cycle has been observed in high-resolution density measurements made on firn/ice cores in Antarctica (Reference Gerland, Oerter, Kipfstuhl, Wilhelms, Miller and MinersGerland and others, 1999), and may be reflected in the typically wide scatter of densities in other less detailed density profiles as noted in the introduction.

Interannual elevation variations

As shown in Figures 1 and 5, both the temperature and accumulation datasets used to drive the densification/elevation model have significant interannual variations during the period April 1992–April 1999. The modeled H(t) elevation series from driving the model with the temperature and accumulation data is shown in Figure 7. For comparison, the observed H(t) elevation series derived from radar altimetry measurements (overlain in Fig. 7) closely follows the modeled elevation, although the observed series shows several larger spikes. Both curves indicate that surface elevation at the Greenland summit decreased about 40–60 cm between 1992 and 1995 followed by a marked increase of 50–80 cm. Along with these variations, both curves also show significant seasonal peaks, caused by the seasonal cycles of the surface temperature in the model.

Fig. 7. Comparison of modeled and observed interannual changes of the snow surface elevation, 1992–99, at the Greenland summit.

To separate the effects of temperature and accumulation variations that are input to the model, we first compute the elevation change with the observed temperature variations (seasonal and interannual), but with a fixed accumulation rate (curve a in Fig. 8). Curve a shows the seasonal cycle in surface elevation with a sharp lowering during late spring to early summer. However, it also shows an interannual variability in both the seasonal amplitude and the year-to-year changes. For example, the seasonal amplitude is large during the warmer summer of 1995 (cf. temperature in Fig. 5b) and small during the colder summer of 1996. There is also a general decrease in elevation, which is due to the increasing trend in temperatures during this period, particularly in summer. A modeled elevation decrease of about 20 cm is the response to the increase in summer temperatures during this period.

Fig. 8. Modeled elevation change caused by (a) observed temperature variations with constant accumulation and (b) observed/modeled accumulation variations with a seasonal variation in temperature without interannual variations.

To examine the effect of accumulation variations (interannual and seasonal), we compute the elevation change with the observed variable accumulation rate and a fixed seasonal temperature cycle, but without any interannual variations in temperature (curve b in Fig. 8). Analysis of the accumulation data in Figure 1 using the multivariate fit (linear with a sinusoidal seasonal cycle) gives an increasing trend of 10 kg m⁻² a⁻¹ a⁻¹, a seasonal amplitude of 119 kg m⁻² a⁻¹, and a seasonal maximum at the end of May. For the first 3 years, in particular, the seasonal cycle of accumulation is out of phase with the cycle of firn compaction, which is shown by the reduced amplitude of the seasonal cycle of curve b vs curve a.

Curve b shows that the interannual variations of accumulation dominate the interannual changes of the surface elevation over this period. Although the 7 year trend in accumulation is positive, there is a significant decrease through mid-1995 followed by a marked increase. In response to accumulation changes, the surface elevation decreases notably between 1992 and 1995, followed by a significant increase. Although the decrease from 1992 to 1995 is primarily driven by accumulation, the warmer summer temperature of 1995 also contributes to the minimum shown in both the model and the altimeter observations. Over the 7 years, the effect of warmer temperatures lowers the surface by about 3 cm a⁻¹, but the effect of increased precipitation dominates to bring the overall increase to 4.2 cm a⁻¹ as obtained from the multivariate fit to the altimeter data. Supporting information for the variation in accumulation rates is provided by the analysis of shallow ice cores, which shows an anomalously low accumulation in 1995 followed by marked increase in 1996 (Reference McConnell, Mosley-Thompson, Bromwich, Bales and KyneMcConnell and others, 2000).