3.1. Ripple waveform

Figure 5 shows the shape of the blue-ice surface at each of the five sites on visit I. The dominant wind direction (also that of the strongest winds) is from the right to the left side of the plot. At each site, the surface height varies in a regular manner. Obvious similarities between the five sites are the wavelength of about 20 cm and the wave height of about 1–2 cm. R2 and especially R5 exhibit very regular and symmetric waves. In contrast, the profile at R1 especially, but also at R3 and R4, shows ripples of far more asymmetrical form. In fact, the ripples at R1 (and, to a lesser extent, at R3 and R4) exhibit a sawtooth pattern with the steepest part of the wave at the lee side. The surface forms at R1 and R4 actually resembled cups rather than ripples. According to Reference Bintanja and ReijmerBintanja and Reijmer (2001), turbulence is most vigorous at R1 and R4 due to the proximity of the upwind valley wall (see Fig. 3). Therefore, it may well be that asymmetrically formed cups are more common in strong turbulent environments, while more uniform ripples tend to occur in places where turbulence is less intense.

Fig. 5. Measured blue-ice profiles at each of the five sites on visit I (29–30 December 1997). Profiles are shifted vertically to facilitate intercomparison. Predominant winds are from right to left.

3.2. Ripple wavelength

The average wavelength of the blue-ice ripples was measured in two ways. In the first method, we measured the total distance between the first and last crests of each profile shown in Figure 5 and divided that by the number of waves (profile method). In the second method, we visually selected 5–10 uniform ripple profiles whose average wavelength was determined over a stretch containing 5–10 wavelengths (selection method). The latter method was applied only at the first visit, since we did not expect significant temporal changes in ripple wavelength. The repeated profile measurements confirmed this.

Table 1 depicts the wavelengths determined by both methods at each site. It is clear that the ripple wavelengths at the Scharffenbergbotnen BIA range from 20 to 24 cm, with no significant differences between the sites. Moreover, the results of both methods agree well at most sites. The values also agree well with the ripple wavelengths reported by Reference Mellor and SwithinbankMellor and Swithinbank (1989), but are much larger than those observed by Reference WellerWeller (1968) who found a typical wavelength of 5 cm. This is most likely due to differences in nearsurface meteorological conditions, in particular friction velocity (see Fig. 2). According to Equation (1), stronger winds and higher u* values will lead to surface ripples with shorter wavelengths. During our frequent visits to this and other nearby BIAs we never encountered ripples with a markedly different wavelength.

3.3. Ripple wave height

Wave height was also measured in two ways. First, we determined successive crest–trough and trough–crest height differences from the observed profiles (“profile wave-height method”). Secondly, a horizontal rod was placed on top of two successive crests, and the vertical distance with the trough in between was measured (“bar method”). At each site, 10–20 bar measurements were carried out at “random” locations but, again, only at the first visit. Table 2 shows the results. The bar method appears to have yielded too large wave heights compared to the profile method at four of the five sites, although the differences are not statistically significant. Apparently, the visual selection procedure had resulted in a bias towards more prominent (and hence higher) waves, making our selection of waves in the second method not random at all. We should therefore disregard the results of the bar method. The profile method yields wave heights of 1.1–1.3 cm at R2–R5, and of almost 2 cm at R1. These values are much lower than the ripple heights of 10 cm reported by Reference Mellor and SwithinbankMellor and Swithinbank (1989). They are also lower than what we loosely estimated from visual inspection before the actual measurements were performed. This raises the question whether the ripple heights reported by Reference Mellor and SwithinbankMellor and Swithinbank (1989) were perhaps also overestimates, based on visual estimates only. Alternatively, meteorological conditions over the BIAs in the Heimefrontfjella region may favour ripples with relatively small amplitudes. The exact reasons for the presumed differences in wave height are currently unknown.

3.4. Ripple evolution

Wave height was found to increase with time at all sites (Table 2). During the 35 day period, average wave height increased between 0.27 cm (R1) and 0.74 cm (R5). These values represent increases of 14–60%, which strongly indicates that mechanisms favouring an increase in wave height were active during the measuring period. Moreover, the standard deviation also increases in time, which indicates an increase of the height differences between the waves. Apparently, the increase in wave height is not uniform. Generally, the ripples with the largest amplitude appear to grow more than the smaller ones. The consistency among the four sites indicates that the increase in wave height of blue-ice ripples may well be a general feature in summer. Interesting in this respect is the aforementioned observation of the formation of ripples with a wave height of 1 cm from an initially flat ice surface within 1 month. It is clear that ripple-forming mechanisms are active during summer when sublimation rates are at their peak.

3.5. Ripple ablation

The observed increase in wave height indicates that more ablation takes place in the wave troughs than at the crests. This is further illustrated in Figure 6, which shows the two measured profiles at R5 as well as the difference between the two. Evidently, the troughs deepen much more than the crests, while the general waveform remains the same. The maximum difference between trough and crest ablation at R5 is >1 cm. Obviously, the stake-ablation method, which usually records only the ablation of the crests (when using a horizontal rod to define the surface), will generally underestimate spatially averaged ablation. This was quantified by comparing the average ablation measured at the two stakes by the conventional method (the stake-ablation method), at each site, with the average ablation detectable in the profile measurements (Table 3). The results show that the stake-ablation method generally underestimates true ablation by 6–15%, except at R1 where it overestimates true ablation (ablation measured at stakes near the weather station at S1 was lower, and would have led to an underestimate of the ablation at R1, as will be discussed below; this illustrates the uncertainties involved in the ablation measured using stakes). Total ablation ranges from 4 to 6 cm over the entire period, the highest values being found in the low eastern part of the BIA near R1 and R4. This spatial pattern in the ablation rate over the Scharffenbergbotnen BIA agrees with the stake-ablation method observations carried out by Reference Nälund, Melander and CarlssonNäslund (1992) over a period of 4 years, and can be attributed to warmer and drier conditions, and hence higher sublimation rates, at R1 compared to R2. Reference BintanjaBintanja (2000c) used meteorological data from S1 and S2 to calculate the surface energy balance, and arrived at mean sublimation rates of 1.22 and 1.01 mm ice d⁻¹, respectively, confirming that sublimation at S1 is higher than at S2. A consistent feature at all sites is that sublimation is highest in daytime.

Fig. 6. Measured profiles at R5 on the first (I) and last (III) visits (2∼4 February 1998), as well as the difference between the two. This difference reflects the ablation rate during 1 month, which is clearly highest in the troughs.

From the average profile ablation and the mean crest ablation rates, one can estimate the error in measured ablation if a (hypothetical) stake had been used to determine the ablation rates of the profile crests only (the stake-ablation method). The last column of Table 3 shows this error. The results are quite conclusive, with crest ablation rates consistently smaller than average ablation at all sites. This is roughly in concert with the comparison using real stakes, except at R1. This confirms, as explained before, that the short-term ablation of blue ice as measured via the stake-ablation method underestimates true ablation in summer.

The profile measurements at R1 can be compared with the traditional ablation readings (stake-ablation method) taken near meteorological station S1 and with ablation measurements obtained using an acoustic height sensor (Reference Bintanja, Reijmer, Snellen and ThomassenBintanja and others, 1998). The latter is fixed on a frame drilled into the ice and measures the vertical distance from the sensor to the surface (about 80 cm initially) by transmitting and receiving sound pulses. The sensor samples a circular area with a diameter of about 40 cm, which thus includes two wavelengths. Like the stake-ablation method, this technique probes only the highest surface elements, as these cause the first return pulse detected by the sensor. Figure 7 shows that the sensor readings yield higher ablation rates than the profile and stake-ablation methods. For 18 January–4 February, the ice-ablation values recorded at S1 and R1 by the acoustic sensor, the average ablation values obtained by the traditional stake-ablation method, and the ablation determined by the profile method were 1.67, 1.69 and 1.78 cm, respectively. The two conventional ablation measurement techniques agree well, but underestimate true blue-ice ablation by about 5–6% at this location. This concurs with the results at the other sites (Table 3).

Fig. 7. Ablation near R1 during January 1998 as measured using (1) the acoustic height sensor of the AWS, which samples every 2 h (the bold red line indicates the 11-point running mean), (2) the ripple profiles at the three visits, and (3) the three stakes close to the weather station (stake observations were carried out every 2–3 days). Motice that these stakes apparently underestimate ablation, whereas the ablation measured at the stakes used to measure ripple profiles exhibited an overestimation.

The general ripple evolution during summer raises an intriguing question relating to ice-ripple evolution during winter. Clearly, the increase in wave height as observed in summer cannot continue throughout the year. Hence, the wave height of the ripples must somehow reduce during the winter, when sublimation rates are low but generally non- negligible (Reference Bintanja and ReijmerBintanja and Reijmer, 2001). Perhaps semipermanent snow coverage in the ripple troughs occurs more regularly during winter, which would leave only the crests exposed to sublimation. However, it is impossible to answer this question with any certainty at present since we have summer observations only. An account of this phenomenon awaits future year-round ripple observations.

3.6. Ripple orientation

The orientation of the ripples was determined simply by compass. This was done several times and by two persons independently to enhance accuracy. Generally, winds inside the Scharffenbergbotnen valley can be subdivided into two categories (Reference BintanjaBintanja, 2000a): (1) weak westerly winds with relatively small sublimation rates, and (2) stronger easterlies with high sublimation rates. Additionally, the irregular orography of the surrounding mountains affects the wind direction throughout the valley, resulting in different mean wind directions at S1 and S2. A period-average value was calculated, as well as a mean wind direction for the highest 10% of 30 min mean wind-speed values. The sites close to the northeasterly valley wall (R1, R4 and R5) experience southeasterly winds, whereas R2 and R3 located closer to the centre line of the valley experience easterly winds. Table 4 shows the results. Evidently, the ripple crests and troughs are oriented perpendicular to the direction of the strongest winds within the accuracy of the measurements. At R1 and R4, the ripple pattern is oriented in a more southeasterly direction, in good agreement with the wind directions measured at S1. At R2, the orientation of the ripples corresponds well with the wind direction of the strongest (easterly) winds, while the mean wind direction is more northeasterly. Evidently, little sublimation and ripple formation takes place during the relatively weak westerly winds, which contribute to the mean values at this site. At R1 and R4, the direction of the ripples also corresponds better with the direction of the strongest winds than with that of the mean winds. The overall good agreement between ripple orientation and the direction of the strongest surface winds indicates that the existence of the ripples is definitely linked to the interaction between the ice surface and atmospheric near-surface flow. This also provides an indirect method to estimate the spatial pattern of the direction of the strongest winds: measuring BIA ripple orientation.

3.7. Ripple migration

An interesting question is whether blue-ice ripples migrate laterally. If somehow the phase of the spatial pattern in ablation rate is different from that of the actual wave, the ripple pattern will undergo a lateral movement (due to differential ablation). In other words, if the ablation on the lee side of the crest is larger than that on the upwind side then the wave will move in a downwind direction. Consider Figure 8, which shows the first (I) and last (III) measured profile at R2, minus the mean value. The entire profile obviously appears to have moved in the downwind direction, as becomes particularly clear in the comparison of individual crest and trough positions. But is this apparent migration significant? (Note that ice flow has no effect on these results, as both stakes move with the ice; the measurements were made within a coordinate system which would move along with the ice flow, and spatial gradients in ice velocity are extremely small on this BIA.)

Fig. 8. Ripple profiles at R2 (with the mean value subtracted) measured on the first and last visits. The phase difference suggests a downwind migration of the ripples.

In order to quantify any horizontal movement of the ripples, the individual profiles (with the mean value subtracted, and scaled with their variance) measured at different visits were correlated with each other. In each comparison of two individual profiles, one of the two was shifted 1–5 measuring points (2–10 cm) to either side. This procedure was followed for each site, except for site 3. If the maximum correlation occurs at zero shift, then no significant lateral migration has occurred. If, on the other hand, maximum correlation is obtained at other shift values, then the entire profile has apparently moved. Figure 9 shows the correlation coefficients for the various sites and periods. R2 is the only site at which the ripples appear to have migrated over a measurable distance. The shift at R2 amounts to about 2 cm in the downwind direction, as could be anticipated from the profiles shown in Figure 8. Most of this shift occurred during the first half of January. The other sites show no significant movement, although there is some indication of upwind migration, of <2 cm, at site 1. Had we sampled at 1 cm intervals, we probably would have found a maximum correlation at 1 cm, in the windward direction.

Fig. 9. Correlation coefficients (R) between two profiles measured at different times for horizontal shifts of the second profile relative to the first profile. R is defined as , where x and y represent the height of the two profiles, i is the horizontal shift and N is the total number of points (101). In each case, one of the profiles wasshifted1∼5 points (2–10 cm) to either side, and the correlation between the two profiles was determined. At R2, the maximum value in R for the first and last profiles occurs at −2 cm, which indicates a downwind migration of 2 cm during the 35 day interval.

Of course, the lateral displacement of ripples is significant only if the mean vertical difference in successive data points is larger than the accuracy of the individual measurements. The value of the former is 0.2–0.3 cm, which is larger than the accuracy of the measurements (i.e. 0.05 cm). The downwind migration of the rippled structure at R2 at a rate of about 2 cm month⁻¹ is therefore indeed significant. At present, it is unclear why the ripples at S2 did migrate, whereas the ripples at the other sites did not exhibit a (significant) lateral movement. Obviously, taking a larger temporal interval between measurements or extending the sampling might help answer this question. In any case, our observations show that the possibility of blue-ice ripple migration is real. Any future attempts to measure the characteristics of BIA ripples should involve the observation of wave migration.

4.1. Description of the model

We assume cross-ripple uniformity and take the following, simplest possible, model able to describe the flow in the vertical plane (x, z) just above the surface:

where x is the horizontal coordinate perpendicular to the ripple crests (and parallel to the mean wind direction), z is the vertical coordinate, and u and w are the horizontal and vertical components of the the wind. Downwind and upward directions are taken positive. Equations (2) and (3) govern the conservation of horizontal momentum and continuity, respectively. The turbulent viscosity is given by K(=1 × 10⁻³ m² s⁻¹), which is assumed independent of height. The change in surface height (h) is described by:

where the first term on the righthand-side (typically, b ≅1.5 × 10⁻⁸ at S1 and S2) represents the sublimation rate, which is taken proportional to the velocity just above the viscous sublayer, and the second term (c ≅ 3 × 10⁻⁹ m s⁻¹) equals the continuous overall upward movement of the ice surface. In steady state, c equals the ablation rate which at S1 and S2 is about 10 cm w.e. a⁻¹.

The ice surface evolves slowly (i.e. ∂h/∂t ≪ w) so that just above the ice surface (z = h):

where s is a parameter that can be interpreted in terms of a friction velocity. It is included to ensure that the shear stress at the surface attains realistic values. The first condition ensures that the flow follows the evolving surface. Far away from the ice surface (z → ∞) we assume that the shear stress (τ) is constant with height:

where ρ is the air density. The simple ice-surface–airflow system is now complete: we can solve the set of prognostic variables Ψ = {u, w, h} by using Equations (2), (3) and (4), supplemented with the boundary conditions (5) and (6). It should be noted that this is probably the simplest possible model to study the formation of ice ripples in a physically realistic manner.

4.2. Basic state: a flat ice surface

The stability analysis involves a perturbation of a basic state (subscript 0). Here, we take a basic solution which is horizontally uniform (i.e. ∂Ψ₀/∂x = 0). Physically, this refers to a flat horizontal ice surface (h ₀ = 0) without vertical motion (w ₀ = 0). This leads to a horizontal flow that increases linearly with height:

where

We should note that extension of a linear velocity profile beyond the viscous sublayer is not very realistic, even though we do believe that the precise form of the velocity profile is not vital. The linear profile was chosen because it facilitates an easy solution of the model.

4.3. Perturbations of the basic state

We perturb the basic state by allowing for arbitrary perturbations. Mathematically this means substitution of Ψ = Ψ₀ + Ψ₁ in which ∥Ψ₁∥≪∥ Ψ₀∥. Using the structure of the starting equations, the basic state, Equations (2–8) and a Taylor expansion at the boundary conditions (see, e.g., Reference HulscherHulscher, 1996), this leads to a problem for Ψ₁ in which the air circulation is related to the existence of surface ripples of a specified wavelength.

Primarily, we investigate sinusoidal ice-forms having wave- number k, so that the perturbed problem can be analyzed after Fourier transformation, by defining Ψ = (u, w, h) as:

where cc is the complex conjugate.

4.4. The growth rate of surface ripples

The perturbed problem splits into two parts which can be solved one after the other. The first part involves the reaction of the flow to a rippled ice surface of wavelength 2π/k and initial amplitude h. This problem is solved here using a combination of approximation and numerical techniques (for details, see analogous sand-wave models (e.g. Reference HulscherHulscher, 1996; Reference Komarova and HulscherKomarova and Hulscher, 2000)). The second part of the perturbation problem deals with the amplification or damping of the initial ice-ripple perturbation h, given by

where ω = Im(ω) + Re(ω) is the complex growth rate that is composed of an imaginary and a real part, respectively. Solving this equation and making use of the Fourier transform (Equation (9)), we arrive at

This means that the ripple migration speed equals Im (ω)/k. The real part of the growth rate Re(ω) governs the amplification (Re(ω) > 0) or damping (Re(ω) < 0) of the ripples.

4.5. Results

We allow for a non-zero airflow close to the surface and take A = 0.4 m s⁻¹ and B = 35 s⁻¹, which provides a background flow that, in the region of interest, agrees well with the logarithmically extrapolated wind speeds that were measured at S1 and S2. Figure 10 shows the perturbation flow field over the ice surface for the case k = 31.4 m⁻¹ (i.e. a wavelength of 20 cm), which is a typical flow pattern over ice ripples that grow in time. As can be seen, crests experience weaker flow than would be the case in the absence of ripples, and troughs stronger flow. As a result, sublimation decreases at the crests and increases in the troughs, and ripple growth occurs. This spatial pattern in sublimation allows the amplitude of these ripples to grow in time. Incidentally, the model only specifies whether ripples with certain wavelengths can initially grow. Once ripples are formed, other, probably nonlinear, mechanisms will counteract ripple growth so that a certain optimum wave height is achieved. Modelling these effects is far beyond the possibilities of this model, so we are unable to predict ripple wave heights.

Fig. 10. Pattern of the perturbed flow over blue-ice ripples with a wavelength of 20 cm as calculated by the model. The horizontal and vertical dimensions of the plot are 0.4 and 0.1 m, respectively. The background flow is from left to right, which implies that the airflow (and sublimation rate) over ripple crests (troughs) is diminished (enhanced). This favours ripple growth.

For shorter wavelengths, the situation is reversed, and the sublimation over crests is larger than in the troughs. Hence, according to the model, ripples with shorter wavelengths cannot grow. The transition from negative horizontal perturbation flow (decrease of the background flow) over the ice crests to a positive horizontal perturbation flow (increase of the background flow) over the ice crests is found at k = 40 m⁻¹ (i.e. a wavelength of 16 cm). This is reflected in the change of sign of the real part of the growth rate (Fig. 11), with positive values at higher wavelengths indicating growth of the amplitude of the ripples. Hence, the model predicts that wavelengths shorter than 16 cm will never form under the specific atmospheric conditions imposed here. Thus, spatial variations in shear stress and sublimation rate caused by a specific surface pattern determine whether ripples of a certain wavelength can grow. Such spatial differences exist because of the presence of circulation cells in the perturbation flow field in the boundary layer above the rippled ice surface.

Fig. 11. Real and imaginary parts of the growth rate (see Equations (10) and (11)) as a function of ripple wavelength. Positive values indicate ripple growth and downwind migration of ripples, respectively.

The imaginary part of the growth rate (Fig. 11) is always negative. This means that, according to this model, the ripples always migrate in the upwind direction. For a ripple having a wavelength of 20 cm we find Im(ω) ≈ −2×10⁻⁸ s⁻¹, which is equivalent to a migration rate of 1.5 mm month⁻¹ in a direction opposite to the background flow. This small migration speed might explain why the ripples at most sites did not exhibit a significant migration speed over the 1 month measuring period.

The results of this simple model agree reasonably well with the observed ripple characteristics presented in section 3. Ripples of the observed wavelength of 20 cm grow in time, and wavelengths shorter than 16 cm are suppressed. Apparently, this simple model does not contain mechanisms by which longer wavelengths are suppressed, so that a maximum growth rate (at the wavelength that will actually form) could not be established. The small migration rate for ripples with the observed wavelength seems to be of the correct order of magnitude (too small to be detected within a 1 month period), but the direction of movement is contrary to the observations at S2. A future modelling attempt will include an explicit moisture equation so that the sublimation rate can be calculated more accurately.