Introduction

Alaska’s Arctic Coastal Plain (ACP) is covered by numerous shallow lakes that are generally elongated perpendicular to the prevailing wind (Fig. 1) (Reference Black and BarksdaleBlack and Barksdale, 1949; Reference Carson and HusseyCarson and Hussey, 1962; Reference BlackBlack,1969; Reference Sellmann, Brown, Lewellen, McKim and MerrySellman and others, 1975). These lakes range in size from a few tens of meters in diameter to >10 km long. Some of the largest lakes cover >3000 ha. Estimates vary, but at a minimum the lakes cover 25% of the ACP (Reference Sellmann, Brown, Lewellen, McKim and MerrySellman and others, 1975), an area of >27000 km².

Fig. 1. Image of the Arctic Coastal Plain (ACP) south of Barrow, Alaska, showing the large number of thaw lakes. Several of the stations where measurements were made, including Imikpuk Lake, are marked and delineate the traverse route of 2000 and 2002.

Lakes of the ACP have a thermal origin: thawing of ice-rich permafrost leads to a reduction in soil volume, creating a basin that fills with water. Lake elongation and preferred orientation, initially a puzzling phenomenon, is now widely accepted to be caused by interactions between lake currents and soil thermal processes, with the prevailing wind providing the orientation (Reference Carson and HusseyCarson and Hussey,1962). Despite receiving considerable attention in summer, we know little about the winter regime of the lakes and their associated snow cover. This is unfortunate because the lakes are frozen and covered by snow from October to June, more than 8 months per year. During that period, the snow insulates the ice and plays a critical role in determining how thick it will grow (Reference Jeffries, Morris and ListonJeffries and others,1996).

A common assumption has been that lake snow cover is essentially the same as that on the surrounding tundra, but field observations show that there are many important differences. The observations discussed here were begun in 1994 when we started a series of over-snow traverses using snowmobiles in arctic Alaska (Sturm, unpublished data; see also Reference König and SturmKönig and Sturm, 1998; Reference Liston and SturmListon and Sturm, 2002; Reference Taras, Sturm and ListonTaras and others, 2002). Differences between lake and land snow covers were impressed upon us literally through the “seat of our pants”: the snowmobile ride was bumpier and considerably rougher on the lakes. On tundra, snow-free areas were comparatively rare, while on the lakes they were common. We recognized that the differences in snow would have implications for the thermal regime of the lakes, as well as their winter energy balance and ecology, so between 1996 and 2002 we made paired sets of snow measurements (lake and land) that form the basis of this study.

Field Area and Methods

Measurements were made at 13 paired lake/non-lake stations along a traverse route from Oumalik to Barrow via the village of Atqasuk in northern Alaska (Fig. 1; Table 1). With one exception, the same pairs of sites were measured in April 2000 and April 2002. Lake stations were chosen by plotting straight-line tracks between villages and then selecting lakes intercepted by the track lines. Measurements were made near the middle of lakes and along transects crossing the lakes. Corresponding measurements on land were made far enough away from the lakes to avoid complications resulting from lake-rim snowdrifts, but close enough that regional meteorological variations could be assumed negligible. The sampled lakes range in size from 8 to 906 ha (Table 1); the land surrounding the lakes is mostly flat and covered by tussock tundra.

At each station (lake and land), we measured snow depth using hand or automatic probes (Reference Sturm and HolmgrenSturm and Holmgren,1999) at 0.5 m intervals along a 100 m line (n = 201). On lakes, depths were accurate to ±0.1 cm; where the probes could penetrate the softer tundra, they were accurate to ±1.5 cm. In 2002, we also measured snow depth at approximately 5 m intervals along east–west-trending traverse lines 500–3000 m long. Where possible, these lines crossed the lakes from one shore to the other.We measured bulk snow density and snow water equivalent (SWE) at 10 locations along100 m lines by collecting snow cores using an aluminum auger (a Federal sampler) with a cross-sectional area of 11.5 cm². Cores were weighed on a digital balance (±0.01 g). In addition, snow stratigraphy was measured in five snow pits spaced evenly along the 100 m line. We used one of these snow pits as an intensive measurement site where we measured the density of each snow layer in duplicate, using a 100 cm³ cutter and a digital balance. In addition, we bracketed this snow pit with two Federal sampler cores. Summing the thickness–density products for each layer and dividing by the total snow depth allowed us to compute the snow-pit bulk density. This was compared to the bulk density determined by coring. Results indicate core-based bulk densities were 4% lower than pit densities in 2000 (n = 62; r ² = 0.98) and 10% lower in 2002 (n = 27; r ² = 0.98).We have corrected the core densities and SWE values reported here by these amounts.

In the main snow pit, we also measured the grain-size, grain type, hardness (using the traditional “fist–finger–pencil–knife” criterion) and resistance to penetration of each snow layer. The latter was measured using a spring-loaded device that recorded the resistance to a plate penetrating the side-wall of a snow pit. One of four different plate areas (in ratios of 1 : 10 : 100 : 1000) was selected for use based on snow strength.The penetration pressure (MPa), defined as the pressure at which point the snow face gave way and the selected plate collapsed into the snow, is reported here. In many cases, based on layer characteristics and sequence, a direct 1 : 1 correspondence was established between layers of snow on land and on the nearby lake, thereby allowing direct comparison of snow strength and characteristics between the two.

Unlike many lower-latitude snow covers, the ACP snow cover experiences extremely strong temperature gradients (>0.3°C cm⁻¹) and high vertical heat-flow rates for prolonged periods (>100 days). These result in high rates of water vapor transport and rapid snow metamorphism (Reference Sturm and BensonSturm and Benson, 1997), producing extreme forms of depth hoar. Even wind-slab layers of >0.4 g cm⁻³ density metamorphose into a depth-hoar-like material exhibiting kinetic growth forms (Reference ColbeckColbeck, 1986), somewhat in contradiction to Reference AkitayaAkitaya’s (1974) finding that depth-hoar metamorphism is minimal in high-density snow. For classifying snow types within each layer in this study, we used the International Classification for Snow on the Ground (Reference ColbeckColbeck and others, 1990), but have added one additional type of snow: slab-to-hoar, a compact layer of snow exhibiting the cohesiveness of a wind slab but consisting of snow grains with kinetic growth features and depth-hoar grains.

In addition to the Oumalik–Barrow traverses, over-snow traverses were conducted in 1996 and 1997 in the Kuparuk Basin south of Prudhoe Bay, Alaska, a region about 400 km east of the Oumalik–Barrow line. During these traverses, in addition to our standard measurements, we surveyed 100 m long snow surface profiles using a rotating laser and self-reading rod accurate to ±2 cm. Using a snow radar (Reference Holmgren, Sturm, Yankielun and KohHolmgren and others,1998), we measured closely spaced (∼0.1 m) snow depths along traverse lines up to 1 km long on both lake and land to examine snow-cover surface and subsurface roughness.

Results

We found five snow-cover characteristics that were distinctly different between lakes and land.

Discussion

Four processes critical to the development of a snow cover function differently on ACP lakes than they do on tundra. The first is snow accumulation. Snow begins to fall in late August, but the lakes do not freeze until mid-September (Reference BrewerBrewer, 1958; Reference Jeffries, Morris and ListonJeffries and others, 1996; Reference Liston and SturmListon and Sturm, 2002). The early-season snow falls into the water and is not incorporated in the snow cover. This explains, in part, why there is less SWE on the lakes than on the tundra. However, as discussed below, it cannot explain the full SWE contrast.

The second process is the interaction of surface roughness with wind-blown snow. Tundra tussock and hummock relief (Fig. 6b) traps and immobilizes early-season blowing snow, but on the smooth ice of a recently frozen lake, this snow is more mobile and blows around more. It does so for a much longer period of time, and perhaps at a higher speed. The bigger and harder snow dunes on the lakes (Fig. 5a and b) are evidence of this enhanced transport. The greater amount of transport results in more dune growth, more pulverized snow grains, and therefore greater sintering (Reference GermanGerman, 1996) and harder snow (Table 2).

A third factor is vertical temperature gradients, which are consistently greater through the lake snow cover than through tundra snow. The water under the ice provides a latent-heat source that lasts throughout the winter, maintaining snow–ice interface temperatures several °C higher than land snow–ground interface temperatures. On land, much of the latent heat associated with unfrozen soil moisture in the active layer is exhausted by mid-winter, so the interface temperatures drop as winter progresses (Reference Sturm, Holmgren and ListonSturm and others, 1995; Reference Jeffries, Zhang, Frey and KozlenkoJeffries and others, 1999; Reference Taras, Sturm and ListonTaras and others, 2002; Reference Olsson, Sturm, Racine, Romanovsky and ListonOlsson and others, 2003). The stronger lake temperature gradients result in more rapid and intense kinetic crystal growth. Although lake snow is deposited harder and more wind-packed, the higher temperature gradients convert much of it to depth hoar, or at least to slab-to-hoar texture (Figs 2 and 3).

Lastly, snow ice can form on lakes but not on land. During early freeze-up, when lake ice is thin, a relatively large snowfall can depress the ice below the water surface, and liquid water will invade the bottom of the snow, saturating it and later refreezing into snow ice (Reference Liston and HallListon and Hall, 1995). Our stratigraphic data suggest this is a rare process in this area of the Arctic (cf. Reference Bilello, Bates and HadlockBilello and others, 1964; Reference BilelloBilello, 1980; Reference Zhang and JeffriesZhang and Jeffries, 2000), though in regions with greater winter snowfall this could produce important snow-cover differences.

Based on the first process described above, we have estimated the winter mass balance on lakes and contrasted it with that on land. For this comparison, we have assumed that 9.7 cm of SWE fell during the winter (average SWE value for land (Table1)), with 75% of the accumulation occurring linearly between September and November, and the remaining 25% occurring at a constant rate in March–April (Reference Olsson, Hinzman, Sturm, Liston and KaneOlsson and others, 2002), a pattern consistent with our understanding of ACP snowfall timing. Lakes are assumed to develop a snow-bearing ice cover on 15 September (Reference BrewerBrewer,1958;Reference Jeffries, Morris and ListonJeffries and others,1996;Reference Liston and SturmListon and Sturm,2002). By that time,1.1 cm of SWE has already fallen, so the computed SWE covering the lakes at winter’s end should be 8.6 cm, a value that is 1.2 cm (16%) higher than the measured value (Table 1). In order to bring the computed value into line with observations, an additional reduction is needed. For this amount to fall into the water, either the lake would need to freeze as late as 1 October, or 100% of the accumulation would need to come in September–November, both somewhat unreasonable assumptions. The 16% mismatch points to some other lake snow sink.

There are three sink possibilities: (1) the snow is trapped in bank drifts surrounding the lakes, (2) there is an additional erosion mechanism on the lakes, or (3) winter sublimation is higher on the lakes.We believe that sublimation is the least significant of these possibilities (discussed below), and therefore focus our discussion on bank drifts and erosion. Using data from Figure 4, along with other snow depth profiles not shown, we can estimate how much snow might be stockpiled in bank drifts. We assume that the lakes are elliptical in shape, with major and minor axes of length a and b, and that a drift with a triangular cross-section (Fig. 7) of height h _d and width w _d completely rims each lake. Measured values of h _d and w _d appear in Table 4. Results from Reference Benson and SturmBenson and Sturm (1993) and Reference Sturm, Liston, Benson and HolmgrenSturm and others (2001) indicate the drift density (ρ _d) is higher than lake snow density (ρ _l), so we also account for that difference. Solving for the snow layer thickness (h, units of SWE) that would blanket the entire lake surface were the snow not in the drifts, we find:

Fig. 7. A snow bank drift at the edge of a lake south of Prudhoe Bay.

Solving for h using measured values of h _d, w _d, a and b (Table 4) and average values of ρ _d and ρ _l, the results range from an SWE layer exceeding 4 cm for the smaller lakes (<100 ha), to layers less than 1 cm for the larger lakes (>400 ha). This range brackets the additional loss (1.2 cm) of SWE needed to balance the winter mass.

Stockpiling snow in drifts along the lake banks has another ramification: it produces the observed snow depletion along the windward edge of the lakes and snow depth profiles that increase downwind (Fig. 4). To investigate this effect, we implemented a simplified two-dimensional version of SnowTran-3D, a blowing-snow transport model (Reference Liston and SturmListon and Sturm,1998), on a cross-lake profile oriented parallel to the prevailing wind.The model is based on the mass-balance equation:

where h is now snow depth in meters, t is time, x is the along-profile coordinate, Q _s is saltation transport (units: kgm⁻¹ s⁻¹) and ρ _s is snow density (280 kg m⁻³). We assume that the upwind bank traps and holds any snow blown into it, so that the saltation flux at the upwind edge of the lake (the downwind edge of the bank drift) is zero. Anyone who has sheltered in the lee of a cut-bank during an Arctic blizzard will recognize that this is a realistic assumption.With this zero-flux-upwind boundary condition and a constant wind-shear velocity (or wind speed) over the lake surface, the saltation flux is:

where μ ( = 3.0) is a non-dimensional scaling constant, f is the equilibrium fetch distance, and Q _{s_max} is the equilibrium (or fetch) saltation transport rate (assumed to be 0.01224 kg m⁻¹ s⁻¹: see Reference Liston and SturmListon and Sturm (1998) for details).

For the model simulations, we assumed there was a period without wind during which a 20 cm uniform snow (1)cover was deposited on the lake. This was followed by a period of wind with no precipitation. We ran three cases (f = 250,500 and 1000 m), blowing the snow until the snow depth at the leading edge of the lake (downwind toe of the bank drift) was eroded down to 1 cm (Fig. 8), matching the observed average snow-depth gradient (19 cm km⁻¹; Table 3). The model ran 4, 8 and 17 days, for the three fetch distances, respectively, before this point was reached.The 1000 m fetch distance best matched the observed profiles (Fig. 4). The model results, of course, are less noisy than the natural system, but the general trends are similar. Both observations and model suggest that the trapping of snow in lake-edge drifts is the cause of the east–west snow-depth gradients we observed on the lakes.The model simulations are also consistent with depth profiles measured from the western edges of large lakes where near-uniform snow depths were observed.

Fig. 8. Modeled snow depth on a lake, for wind flowing from left to right, with a bank drift at the left edge of the domain that effectively traps all of the upwind snow blowing into the lake. The snow depth varies with distance from the lake edge due to erosion. At the equilibrium fetch distance (the distance at which the snow transport is within 95% of its equilibrium flux), erosion is matched by deposition and the depth does not change.

The model and our observations suggest that snow deposited in bank drifts balances the snow eroded from the lake surface, with the one caveat that the bank drifts can contain snow from the period before lake freeze-up. This leads us to conclude that the increased erosion from the lake surface which ends up in bank drifts, plus the snow falling into the water before it freezes, is sufficient to explain the difference in the mass balance between lakes and land. Sublimation, the one other possible “sink” for lake snow, seems unlikely to be important. For the sublimation to be greater over the lakes, the generalwind speed over lakes would need to be higher than over the flat tundra. There is currently no evidence for this general difference, but, as we discuss below, localized areas of higher wind speeds are almost certainly present on the lakes (a consequence of surface roughness differences), and these local wind effects are responsible for some of the key contrasts between lake and land snow: namely, that the snow on the lakes is harder, denser and often accumulates into larger dunes.

The source of local snow erosion/deposition that produces the relatively large lake dunes is the variation of wind speed over bare ice and snow-covered ice. Consider a lake that has recently frozen and on which a thin snowfall has been deposited. Turbulent wind fluctuations will redistribute this snow irregularly, creating a mosaic of snow-covered and snow-free areas.We do not completely understand the mechanisms that lead to this initial patchy distribution, but we have seen the resulting patterns many times. To be consistent with Figure 6b and images like Figure 9, we assume that the dunes and bare patches have characteristic lengths of about 6 m, producing a surface which in the downwind direction has alternating bands of snow and ice with a 12 m wavelength. Using a two-dimensional dynamic wind model (Reference Liston, Brown and DentListon and others, 1994), and assuming a logarithmic wind profile (10 m s⁻¹ at 10 m height) and ice and snow roughness lengths of 0.00001 and 0.001 m, respectively (see Reference Berry, Gray and MaleBerry,1981), we computed wind speeds along the downwind profile. The model results indicate near-surface wind speeds (5 cm height) as much as 15% higher over bare ice than over snow-covered ice (Fig. 10). The enhancement is limited to a layer not much higher than the dunes themselves, because 1 m above the surface the speed is nearly uniform. This vertical speed distribution requires a complex three-dimensional wind pattern (necessary for conservation of mass and momentum) with higher speeds over bare ice patches and flow over and around the dunes (inset, Fig. 9).

Fig. 9. Oblique aerial photograph of snowdrifts on lake ice in arctic Alaska.The light-colored ripple patterns are snowdrifts, and the darker areas are the bare lake ice.The wind has been blowing from the bottom to top of the picture.The smooth bump on the right is an island in the lake. It has created a drift and bare ice area much like that formed by a bank at the edge of a lake. For scale, the distance across the island from top to bottom is about 100 m.The inset suggests the complex nature of the true flow of wind over and around individual dunes.

Fig. 10. Near-surface wind-speed variations over alternating bands of snow and bare lake ice, showing zones of erosion and deposition that tend to enhance the growth of drifts and perpetuate the bare-ice patches.

Over bare ice patches where the wind is stronger and accelerating, erosion is favored and the ice patches will tend to remain snow-free. Over existing snow dunes, where the opposite conditions prevail, accumulation will take place. Though not modeled here, form drag will also enhance snow accumulation on the dune’s lee side, contributing to the growth. Dunes will get bigger, and bare patches will remain until snowfall exceeds the wind’s ability to completely erode snow fromthe patches. Once formed, the dunes will continue to modify the wind field and associated erosion/deposition, and thus perpetuate themselves throughout the winter.

Implications

The thinner, denser, more wind-blown snow found on lakes of the ACP is a much poorer thermal insulator than the snow on adjacent tundra, a difference that has implications for lake ice formation, the ACP winter energy balance, and possibly lake life cycles. To quantify this difference, we computed the bulk thermal resistance of a typical lake snow cover and compared it to the thermal resistance of a typical land snow cover. Using average snow depths and densities (Table 1), additional data from 1996 collected near Prudhoe Bay, and a regression equation for density vs thermal conductivity (Reference Sturm, Holmgren, König and MorrisSturm and others, 1997), we found that lake snow had a thermal insulation value that was about 40% that of land snow.We further refined this comparison by directly incorporating the textural results from Figure 2 into our calculations. Using the layer proportions in Figure 2 for the snow cover on both lakes and land, and depths from Table 1, we obtained bulk thermal conductivity values (k _b) of 0.119 vs 0.222 W m⁻¹ K⁻¹ for lakes and land, respectively. The values were computed for 2001 using a series-type solution for layered media. Similar values were obtained in 2002. In both cases, lake snow had a thermal insulation value that was 54% that of land snow.

The poor insulating value of ACP lake snow was experienced by Reference Jeffries, Zhang, Frey and KozlenkoJeffries and others (1999) and Reference Zhang and JeffriesZhang and Jeffries (2000) when they found spring heat-flow rates 12 times higher on lakes than on the nearby tundra. To tune their lake ice growth model to match observed ice thicknesses, they had to apply a factor to weather-station snow-depth records (land snow) that ranged from 0.34 to 0.88, a procedure that effectively decreased the thermal insulation value of lake snow by a factor consistent with the results of our study. When they did not apply the factor, Zhang and Jeffries’ model underestimated ice growth by 35–65 cm. One conclusion is clear: if lake snow is not differentiated from tundra snow in models, serious under-estimates of heat flow and ice thickness will result.

A simple, constant correction factor for lake snow cannot be used, however, because the thermal insulation of both land and lake snow varies by a factor of 2 across the ACP (Fig. 11a and c). We tracked this variation using thermal resistance (R), which has units of K W⁻¹ and is a quantity that combines snow depth and thermal conductivity:

where φ_i is the thickness of the ith layer, k_i is the thermal conductivity of that layer, A is the area (m²), and the summation is over all layers in the snowpack. R values were highest in the south and decreased with distance north, reaching a minimum at the coast near Barrow. In 2002, for example, R for lakes (solid symbols in Fig. 11a and c) decreased from about 1.5 to 0.8 K W⁻¹ across the ACP. In 2000, the trends were of similar magnitude and slope, though not as clearly defined. These gradients mean that for a set of constant winter environmental conditions (i.e. temperature, wind, radiation, etc.), 50 cm more lake ice would have grown at the north end of the ACP than at the south end.

Fig. 11. (a, c) Variation in lake and land snow thermal resistance (R) with latitude in 2000 (a) and 2002 (c), showing a decrease from south to north, but no minimum.The slopes of the lines (change in R value per degree of latitude) are marked. Open symbols are for land, solid symbols for lakes. (b, d) Variation in lake and land snow depths with latitude in 2000 (b) and 2002 (d), showing a decrease from south to north to a minimum at 70.8° N, followed by a slight increase to the coast at Barrow. Open symbols are for land, solid symbols for lakes. Stations are indicated at the bottom of (d).

The variation of R with latitude is not solely a function of snow depth (Fig. 11b and d). Depth decreased with distance north (both 2000 and 2002), reaching a minimum at 70.8° N, followed by a subtle but significant increase to the coast. This V-shaped pattern is not preserved in the trends for R. We have observed a similar V-shaped pattern to the snow depth on south–north transects in the Kuparuk Basin south of Prudhoe Bay (Reference Liston and SturmListon and Sturm, 2002; Reference Taras, Sturm and ListonTaras and others, 2002). A consistent regional snow texture trend must offset the depth minimum. Based on our knowledgeof snow thermal properties (Reference Sturm, Holmgren, König and MorrisSturm and others, 1997), this is likely to be an increase in wind slab and a decrease in depth hoar with distance north, but the stratigraphic data for individual stations (cf. Fig. 3) are too noisy to identify these trends with certainty.

One ramification of consistent and strong regional R gradients across the ACP is that lake bathymetry determined using spaceborne radar may require reassessment. Using synthetic aperture radar (SAR), it is possible to distinguish lakes that have floating ice covers from those frozen to their beds (Reference Sellmann, Brown, Lewellen, McKim and MerrySellman and others, 1975; Reference Weeks, Fountain, Bryan and ElachiWeeks and others, 1978; Reference Jeffries, Morris and ListonJeffries and others, 1996; Reference Kozlenko and JeffriesKozlenko and Jeffries, 2000). Using a sequence of SAR images, it is possible to estimate the day the lakes freeze to their beds, and to then invert the elapsed time into an ice thickness value and lake depth. The method hinges on accurately modeling the lake-freezing rate, which is first-order sensitive to the lake snow amount (Reference Zhang and JeffriesZhang and Jeffries, 2000). Recent studies have used Barrow weather data and assumed a constant freezing rate across the ACP (Reference Jeffries, Morris and ListonJeffries and others, 1996; Reference Kozlenko and JeffriesKozlenko and Jeffries, 2000). A higher percentage of lakes not frozen to their bed in the southern ACP has led to the conclusion that more of these lakes are deeper than 2.2 m (depth of maximum freeze before spring thaw) than in the northern part. Our results suggest an alternate interpretation: lakes in the southern ACP freeze slower due to a more insulative snow cover, producing less ice per unit time than in the northern ACP.

Lastly, we would like to speculate that the minimum snow depths found on the eastern side of the lakes (Figs 4 and 5) may play a role in their evolution and life cycle. The snow minimum is the result of the same prevailing wind that has been shown (Reference Carson and HusseyCarson and Hussey, 1962) to be the cause of the remarkable orientation of the lakes (Fig. 1). On the eastern side where snow is thinnest, the ice grows thicker and there is greater winter frost penetration into the banks and bed of the lake. Thicker ice lasts longer into the summer (Carson and Hussey estimate 3–6 weeks longer), and more solidly frozen banks and bed will resist thermal and mechanical erosion better and longer into summer. Because the lakes are basically thermo-erosional features (Reference Black and BarksdaleBlack and Barksdale, 1949; Reference Carson and HusseyCarson and Hussey, 1962; Reference BlackBlack, 1969; Reference Sellmann, Brown, Lewellen, McKim and MerrySellman and others, 1975; Hinkel and others, in press), the localized thermal impact due to east-side snow scouring may be important enough to warrant further study.

Conclusions

Lake snow cover of Alaska’s ACP is thinner, denser and composed of more wind slab and less depth hoar than snow on surrounding land. The SWE is also lower. Consequently, lake snow provides less than half the thermal insulation of land snow, leading to more rapid lake-ice formation rates than would be predicted if the characteristics of land snow were used for lake modeling. The reduced lake snow thickness and SWE arises from (1) loss of snow precipitation into the water early in the winter, (2) stockpiling of snow along lake banks during wind drifting, and (3) snow-depth depletion along the eastern side of the lakes due to non-equilibrium blowing-snow fluxes. Consistent south–north snow-depth and snow-insulation trends exist across the ACP, with greater depths, and insulation values almost twice as high in the south end of the ACP as in the north. These regional gradients may account for apparent lake depth differences reported using SAR and lake-freezing models. The lower snow depths, poorer insulation and regional gradients in these snow properties should be used when modeling ACP lake ice formation and winter surface energy fluxes.