Solution domain

We calculate gravity variations within a solution domain that encompasses most glaciers in Alaska, USA, as well as glaciers in Yukon and British Columbia, Canada, that are part of the icefields that straddle the US/Canada border (Fig. 1). On its southeastern boundary, our domain ends just south of the southern end of the Stikine Icefield. We exclude those glaciers of the Aleutian Island Arc (1793 km²) and the Brooks Range of northern Alaska (531 km²). The total glacier-covered area of our domain is 82 505 km², calculated from a new glacier inventory (Randolph Glacier Inventory version 2.0 or RGIv2.0) derived almost entirely from modern (~2005–11) satellite imagery (Reference ArendtArendt and others, 2012). We solve for GRACE mascon parameters at every 1 × 1 equal area mascon defined in Reference Luthcke, Sabaka, Loomis, Arendt, McCarthy and CampLuthcke and others (2013). Our GOA region is a subset of the larger GOA domain defined in Reference Luthcke, Sabaka, Loomis, Arendt, McCarthy and CampLuthcke and others (2013) that includes glaciers of the western Canadian Rockies. We exclude those glaciers in this analysis because they have traditionally not been included in earlier GOA mass-balance assessments. As a result, our mass-balance estimates are slightly different from those reported in Reference Luthcke, Sabaka, Loomis, Arendt, McCarthy and CampLuthcke and others (2013). We combine mascons into eight mountain ranges, similar to those defined in Reference Arendt, Echelmeyer, Harrison, Lingle and ValentineArendt and others (2002).

Fig. 1. GRACE solution domain for GOA glaciers. Boxes with gray outlines delineate 1 × 1 equal area degree mascons, and red outlines show groupings of these mascons into eight mountain ranges: 1. southwestern Alaska Range; 2. central Alaska Range; 3. eastern Alaska Range; 4. Chugach Mountains; 5. Wrangell Mountains; 6. St Elias Mountains; 7. Juneau Icefield; 8. Stikine Icefield. Blue shading showsthe location of Alaska glaciers, derived from a global glacier inventory (Reference ArendtArendt and others, 2012). Black dots show locations of ICESat elevation change measurements. Red dots show locations of USGS benchmark glaciers, and of Mount Redoubt volcano that erupted on 31 March 2009.

GRACE solution

The GRACE mission maps changes in Earth’s gravity field by precisely measuring changes in distance between tandem satellites using a microwave K-band inter-satellite range and range-rate (KBRR) system with GPS data for positioning, star tracker data for orientation and accelerometer data to remove the non-conservative surface forces needed to isolate the gravity signal. GRACE measures changes in gravity from all components of the Earth system. In order to isolate the glacier mass-balance signal, it is necessary to forward-model the time-varying gravity from atmosphere, ocean, TWS and solid Earth variations.

The v12 GRACE solution (Reference Luthcke, Sabaka, Loomis, Arendt, McCarthy and CampLuthcke and others, 2013) calculates surface mass anomalies (mascons) directly from the GRACE KBRR observations taking into account the full noise covariance. We employ a unique method for accelerometer calibration (Reference Luthcke, Rowlands, Lemoine, Klosko, Chinn and McCarthyLuthcke and others, 2006b) and for calculating mass changes as scale factors on the differential set of Stokes coefficients in a spherical harmonic expansion of the geopotential field (Reference RowlandsRowlands and others, 2005). The mascons are estimated globally at 1 × 1 arcdeg (~25 000 km²) spatial and 10 day temporal sampling, and we apply anisotropic temporal and spatial constraints between neighboring mascons representing similar surface types (land, ocean and glaciers). These neighbor constraints help to isolate signal and minimize signal leakage in and out of the land ice regions of interest. A detailed error and resolution analysis has shown that the basic mascon spatial resolution within a constraint region is equivalent to a Gaussian spatial smoother with 300 km radius (Reference Luthcke, Sabaka, Loomis, Arendt, McCarthy and CampLuthcke and others, 2013). The signal within the GOA glacier region is isolated using these anisotropic spatial constraints, and the leakage errors estimated in Reference Luthcke, Sabaka, Loomis, Arendt, McCarthy and CampLuthcke and others (2013) are included in our error estimates reported here. We estimate all errors at the 68% confidence (1σ) level.

The v12 mascon solution uses a similar GOA mascon solution domain and similar forward-modeling techniques to those in Reference Luthcke, Arendt, Rowlands, McCarthy and LarsenLuthcke and others (2008), including explicit accounting for post-Little Ice Age isostatic rebound resulting from the collapse of the Glacier Bay ice field (Reference Larsen, Motyka, Freymueller, Echelmeyer and IvinsLarsen and others, 2005). A different ocean model is used, namely the Ocean Model for Circulation and Tides (Reference ThomasThomas, 2002), based on the Hamburg Ocean Primitive Equation Model (Reference Drijfhout, Heinze, Latif and Maier-ReimerDrijfhout and others, 1996; Reference Wolff, Maier-Reimer and LegutkeWolff and others, 1997). Over land we continue to use the 0.25° spatial, 3 hour temporal resolution GLDAS (Global Land Data Assimilation System) hydrology model (Reference RodellRodell and others, 2004) with a 0.25° mask to remove glacierized regions from the TWS corrections, because these are not well modeled in GLDAS. We use a glacial isostatic adjustment (GIA) model based on the ICE-5G deglaciation history (Reference PeltierPeltier, 2004), and an incompressible two-layer approximation to the VM2 viscosity profile (Reference Paulson, Zhong and WahrPaulson and others, 2007, computed and provided by Geruo A). We also apply geocenter corrections derived from the degree 1 Stokes coefficients determined from Reference Swenson, Chambers and WahrSwenson and others (2008). The v12 solution has been iterated three times to minimize residuals in modeled and observed KBRR data, resulting in improved recovery of non-modeled or mismodeled signal.

We present 10 day mass anomaly estimates together with a 10 day width Gaussian filter applied to the time series. We assume the 1σ errors for each 10 day estimate are the difference between the filtered and unfiltered estimates, which we combine in a root-sum-square fashion to estimate the total error of the GOA mass changes due to noise in the GRACE signal. These errors are combined with leakage and forward-modeling errors described in Reference Luthcke, Sabaka, Loomis, Arendt, McCarthy and CampLuthcke and others (2013) to obtain the total GOA error reported here. We calculate seasonal balances as the difference between yearly maximum and minimum values in the Gaussian-filtered mascon time series, and we identify balance years based on the end-of-summer minima. For mass-balance calculations over the entire period of record we report both an average of the annual balances determined by summation of the summer and winter balances, as well as mass trends determined from a least-squares simultaneous estimate of bias, trend, annual, semi-annual and 161 day cycle (alias period of S2 tide errors).

We present summations of 1 × 1 mascon solutions over each of the eight mountain ranges, even though these mascon aggregates are not formally constrained in the way the total ice, land and ocean constraints are applied in the mascon approach (Reference Luthcke, Sabaka, Loomis, Arendt, McCarthy and CampLuthcke and others, 2013). Our purpose is to ascertain the extent to which we can resolve mass variations at spatial scales smaller than the entire GOA region. Without any formal constraints, we are unable to quantify errors in the GRACE results we present for each of the eight regions. Instead, our comparison of the subregional GRACE estimates to independent climate and mass-balance observations is itself a form of error assessment, from which we can draw conclusions about the spatial resolution of the mascon approach.

ICESat data

We use Release 633 data from the GLA06 altimetry product of NASA’s Geoscience Laser Altimeter System (GLAS) on board the Ice, Cloud and land Elevation Satellite (ICESat; Reference ZwallyZwally and others, 2002) to calculate changes in surface elevation of GOA glaciers, and compare these with our GRACE-derived mass balances. We choose ICESat data for this purpose because they cover the entire GOA during 2003–09, thereby fully overlapping with the GRACE observation period. Other elevation datasets derived from airborne altimetry (Reference Johnson, Larsen, Murphy, Arendt and ZirnheldJohnson and others, 2013) or satellite stereoscopy (Reference Berthier, Schiefer, Clarke, Menounos and RémyBerthier and others, 2010) are also available, but these span discontinuous time periods and do not cover the entire study region. The coverage of ICESat tracks over GOA glaciers is shown in Figure 1.

ICESat data were acquired over 17 repeated campaigns of a 33 day orbit sub-cycle between October 2003 and October 2009. ICESat provides surface elevations of ~70 m diameter laser altimetry footprints, each having a ~170 m along-track spacing. The elevation accuracy is highly dependent on surface slope but has been found to be within 1 m in typical glacier terrain (Reference Moholdt, Nuth, Hagen and KohlerMoholdt and others, 2010). In addition, there is a recently discovered bias in ICESat elevations resulting from an incorrect selection of the centroid, rather than the Gaussian peak, of the transmit pulse to calculate surface elevation (the GC offset; personal communication from A. Borsa, 2013). We simulate the effect of this time-variable offset using global mean offsets calculated for each observation campaign.

We calculate elevation changes by examining elevation trends and residuals of surface planes fitted to 700 m long segments of near repeat-track data with 50% overlap, following methods in previous studies (Reference Smith, Fricker, Joughin and TulaczykSmith and others, 2009; Reference Moholdt, Nuth, Hagen and KohlerMoholdt and others, 2010, Reference Moholdt, Wouters and Gardner2012; Reference Gardner, Moholdt, Arendt and WoutersGardner and others, 2012, Reference Gardner2013). The method simultaneously solves for cross-track slope effects that are used to correct for repeat-track separation, as well as the true elevation changes used in our analysis. We use the same data-filtering parameters to remove data outliers as detailed in Reference Moholdt, Nuth, Hagen and KohlerMoholdt and others (2010), except that we increase from 5 m to 10 m the maximum allowable elevation residual with respect to the trend of the plane. This was done to capture more of the steep topography and rapid elevation changes that are characteristic of many GOA glaciers.

A total of 80 000 ICESat laser returns passed our filtering criteria, resulting in 6257 elevation change estimates that each cover a time-span of minimum 2 years within the 2003–09 period. We examined the sampling density within each of the eight mountain ranges, but found that the coverage of ICESat tracks was not sufficient for reliable mass-balance estimation in the smallest GOA regions. However, at the scale of the entire GOA region, we found that ICESat sampling density as a function of elevation matched well with the glacier area–elevation distribution (Fig. 2b), allowing us to proceed with regional volume change calculations. For each 200 m elevation bin we calculated differences between the ICESat sampling and area distribution density, and used that as a weighting factor on the ICESat elevation changes. This corrected elevation change was multiplied by the total glacier surface area within each bin to yield the total volume change in the GOA region. We converted the volume changes to mass changes assuming Sorge’s law (Reference BaderBader, 1954), and an average density of 900 kg m⁻³. We also calculated annual mass changes between ICESat campaigns in October/ November, which resulted in larger errors but allowed us to investigate links to our GRACE and climate observations.

Fig. 2. (a) Change in elevation determined from 2003–09 ICESat data, averaged within 200 m elevation bins. Error bars are the standard deviation of the mean change per elevation bin, divided by the square root of the number of uncorrelated observations. (b) Histograms of GOA glacier surface area (gray bars) and numbers of ICESat laser returns (orange line) used to estimate GOA glacier mass balance. The x-axis labels the midpoint of 200 m elevation bins over which the histograms and elevation changes are calculated.

We calculated errors by dividing the standard deviation of elevation change by the square root of the number of uncorrelated observations, assuming a correlation length of 5 km (Reference Moholdt, Wouters and GardnerMoholdt and others, 2012). We assume a fractional area uncertainty of ±10% (Reference ArendtArendt and others, 2006) and a density uncertainty of ±100 kg m⁻³ (Reference Moholdt, Wouters and GardnerMoholdt and others, 2012). The total mass-balance uncertainty was then calculated from the quadrature sum of these error components. Sensitivity tests revealed that our error budget was dominated by the large scatter in ICESat elevation changes, with uncertainties in density and area having relatively small effects on the total error. Also, the uncertainty of the annual mass balance for 2009 was higher than for the other years due to the failure of the last laser instrument one-third of the way into the October 2009 observation campaign.

Satellite snow-cover and albedo data

We use the Moderate Resolution Imaging Spectoradiometer (MODIS)/Terra Snow Cover Monthly L3 Global MOD10CM V005 dataset (Reference Hall, Riggs and SalomonsonHall and others, 2011) to investigate the spatial extent of snow cover on glacier-free terrain during the GRACE observation period. The MODIS snow-cover data are distributed at 0.05° spatial resolution of the Climate Modeling Grid. Daily maps are determined from a normalized difference snow index and averaged for the monthly product. The daily MODIS snow map accuracy has been reported at 93%, with larger errors occurring over complex terrain, and where snow cover is thin (Reference Hall and RiggsHall and Riggs, 2007). The largest source of errors likely results from clouds and mixed pixels (Reference Painter, Rittger, McKenzie, Slaughter, Davis and DozierPainter and others, 2009), which tend to confuse the algorithm, generally resulting in an underestimation of snow cover.

We sample the snow-cover grids at locations within our GOA solution domain exclusive of the ice-covered regions. Our purpose is to assess interannual patterns in snow accumulation that may not be captured in ground station observations or reanalysis products, and to quantify potential snow water equivalent errors in the GLDAS TWS model. We note that the 0.25° spatial, 3 hour temporal resolution version of the GLDAS model used here ingests the daily MODIS snow-cover product and adds an arbitrary snow water equivalent of 0.01 kg m⁻² to locations at which MODIS gridcells show >40% snow cover (Reference Rodell and HouserRodell and Houser, 2004). Here we assess the sensitivity of TWS calculations to the 40% threshold value by counting the number of MODIS gridcells classified above and below 40% snow cover.

We examine change in the spectral albedo of the glacier surfaces using the MODIS albedo product MCD43C4 for the years 2000–10. The MCD43C4 albedo is determined from the angular integration of a parametric model of the bidirectional reflectance distribution function (BRDF) that has been fit to 16 days of MODIS multi-angular reflectance observations in seven spectral bands. The product is available at 8 day intervals at a 0.05° horizontal resolution. We choose the coarse-resolution constant degree product over the higher-resolution 1000 m product (MCD43B3) for ease of processing, and because our GRACE analysis occurs on a low-resolution grid of mascons. The MODIS albedo product was found to agree with ground observations of snow albedo over the Greenland ice sheet within measurement error (Reference Stroeve, Box, Gao, Liang, Nolin and SchaafStroeve and others, 2005). However, particular attention must be given to the quality flags (QF) that accompany the dataset (Reference Schaaf, Wang and StrahlerSchaaf and others, 2011). Here we only use albedo estimated from fully inverted BRDFs (QF = 1). To ensure that we primarily capture changes in glacier albedo and not changes in terrestrial snow extent, we mask out all MODIS pixels with <95% glacier coverage as determined from the RGIv2.0.

Climate data

Here we build upon previous efforts to simulate seasonal variability of Alaska glaciers (Reference Rasmussen and ConwayRasmussen and Conway, 2004; Reference Arendt, Luthcke and HockArendt and others, 2009; Reference Rasmussen, Conway, Krimmel and HockRasmussen and others, 2011), including an assessment of the relative influence of land surface physics on air temperature patterns, by comparing surface and 700 mbar air temperature records. For the upper air analysis we calculate the mean of two daily 700 mbar temperatures, one from the US National Centers for Environmental Prediction (NCEP) Reanalysis-2 and the second from the European Centre for Medium-Range Weather Forecasts (ECMWF) ERA-Interim reanalysis products. For each balance year in the GRACE record we calculate glacier area-weighted summer (June–August) departures from the 2004–10 mean for each of the eight mountain ranges. For the surface products we include both monthly temperature and precipitation fields derived from 1961–2009 station data using a total of 322 and 261 weather stations for temperature and precipitation respectively (note that 2010 data were not available). This surface product was calculated from absolute (for temperature) and proportional (for precipitation) anomalies of the station data from 1971–2000 climate normals (personal communication from D. Hill and S. Calos, 2011). These scattered anomalies were then interpolated onto a regular 2 km × 2 km grid covering all of Alaska. This approach assumes that the temporal derivative of the anomaly field is more spatially coherent than that of the normal field. The climate normals were taken from the Parameter-elevation Regressions on Independent Slopes Model (PRISM; Reference Daly, Neilson and PhillipsDaly and others, 1994). PRISM uses a digital elevation model to correct for orographic effects on precipitation distribution, using regression equations that incorporate elevation and aspect for each gridcell. We assume precipitation is a suitable proxy for snowfall, given the difficulties in determining a solid precipitation temperature threshold when using monthly data. Summer average (June–August) temperature and winter (September–May) total precipitation were calculated to compare with summer and winter mass balances determined from GRACE. We calculated temperature and precipitation anomalies as the difference of these average/totalized values from their mean values over the period of record.

Field mass balance

We compare GRACE measurements to field observations of glacier mass balance acquired by the USGS at Gulkana and Wolverine Glaciers (Reference Van Beusekom, O’Neel, March, Sass and CoxVan Beusekom and others, 2010). Biannual observations are carried out at each of three ‘index sites’ that are used to represent different zones of each glacier. The glacier geometry and extent are updated every ~5 years. The glaciers are located in two distinctly different climate settings (Fig. 1). Gulkana Glacier had an area of 15 km² in 2009 and is located on the south flank of the eastern Alaska Range in a continental climate. Wolverine Glacier was 17 km² in 2009 and is located in the Kenai Mountains in a wet, maritime climate. Measurements on both glaciers have been extrapolated to produce estimates of total GOA mass losses (Reference MeierMeier, 1984; Reference Meier and DyurgerovMeier and Dyurgerov, 2002) that are consistent with independent geodetic estimates (Reference Cox and MarchCox and March, 2004; Reference Harrison, Cox, Hock, March and PettitHarrison and others, 2009).

GRACE-derived mass balance

Based on our least-squares estimate of the linear trend, the average annual mass balance (B _a) of GOA glaciers was −65 ± 11 Gt a⁻¹ during December 2003 to December 2010 (Fig. 3). When we average only the 2004–10 B _a values we obtain −71 ± 11 Gt a⁻¹. The difference results from the slightly different time period and the biases introduced in the linear fitting due to exceptionally negative summer balances at the start and end of the time series. We report both values because most GRACE studies calculate trends using the least-squares fitting method.

Fig. 3. Cumulative mass balance of GOA glaciers determined from the high-resolution GRACE v12 mascon solution (Reference Luthcke, Sabaka, Loomis, Arendt, McCarthy and CampLuthcke and others, 2013). Ten-day estimates (blue dots), and the same data smoothed using a Gaussian filter with a 10 day averaging window (green curve); and trend (red line) recovered from simultaneous estimation of bias, trend, annual, semi-annual and 161 day cycle. GRACE errors for each 10 day estimate are assumed to be the difference between the filtered (green line) and unfiltered (blue dot) data.

The range in B _a in Alaska between 2004 and 2010 was 174 Gt, approximately double the mass loss rate estimated from a linear fit to the entire time series (Table 1). B _a became progressively less negative from 2004 to 2008, with near-balance conditions occurring in 2008. This was followed in 2009 by the most negative B _a in the 2004–10 period. We examined departures of summer (B _s) and winter (B _w) balances from the 2004–10 mean, calculated as the ratio of each year’s seasonal balance to the mean seasonal balance over the period of the GRACE record. Our sign convention is such that a negative departure in each season indicates a more negative mass balance. B _s departures (−83 to 91 Gt a⁻¹) were larger than B _w departures (−25 to 22 Gt a⁻¹), showing that variations in B _s accounted for most of the variability in B _a (Fig. 4). The slightly positive 2008 and large negative 2009 B _a values were caused by strong positive and negative departures of B _s in the respective years.

Fig. 4. Departures (difference from 2004–10 mean) of GOA summer (orange) and winter (gray) mass balances. Seasonal balances are calculated as differences between successive minima and maxima in the GOA mascon time series (Fig. 3). Negative departures for both summer and winter balances indicate a contribution toward more negative annual balances, as compared to the 7 year mean.

We observed large spatial variability in the patterns of glacier mass loss between different balance years (Fig. 5). Notable mass gains occurred for glaciers in the central and eastern Alaska ranges (mountain ranges 2 and 3) during the 2008 balance year, the Stikine Icefield (mountain range 8) during 2007, and glaciers of the Alaska and Kenai peninsulas (mountain ranges 1 and 4) during 2008 (Fig. 1). Large mass losses occurred through all regions during the 2004 and 2009 balance years due to exceptionally negative B _s. During the entire period, the St Elias, Glacier Bay and Juneau icefields regions lost the greatest amount of mass relative to other regions. The amplitudes in glacier mass increased with decreased latitude, and were largest in southeast Alaska.

Fig. 5. Spatial distribution of summer, winter and annual mass balance (orange, gray bars and red lines) in Alaska from the GRACE v12 mascon solution (Reference Luthcke, Sabaka, Loomis, Arendt, McCarthy and CampLuthcke and others, 2013), for each balance year spanning 2004–10. Mountain ranges (numbered 1–8) are labeled in Figure 1. Summer, winter and annual balances are calculated as in Table 1. Blue shading shows glacier locations.

Comparison to ICESat-derived mass balance

ICESat elevation changes averaged over the 2003–09 observation period show a strong elevation dependence, with 2–4 m a⁻¹ of thinning at low elevations tapering to near-zero changes at high elevations (Fig. 2a). We multiplied these elevation changes by the area distribution of GOA glaciers to obtain an average B _a of −65 ± 12 Gt a⁻¹ or −0.79 ± 0.15 kg m⁻² a⁻¹ (Table 1). This is 4 Gt a⁻¹ more negative than GRACE data subsampled to the same period as ICESat. GRACE and ICESat also agree to within error bars for individual balance years (B _a) except for 2007 (Table 1; Fig. 6). Our simulations of the ICESat GC offset indicated that the total impact on the GOA mass balance was <1 Gt a⁻¹. Because this was well within our calculated ICESat error estimates, we do not include this correction in our analysis.

Fig. 6. Comparison of area-averaged annual mass balances in the GOA region derived from GRACE (orange) and ICESat (gray). Balance years begin in the fall of the previous calendar year, at the time of minimum mass (GRACE), or in October/November (ICESat).

Comparison to field observations

We compare field observations of B _w, B _s and B _a at Gulkana and Wolverine Glaciers to their closest 1 × 1 mascon (Fig. 7). We convert the GRACE mass changes to specific values by dividing by the total ice area in each mascon. Our scatter plots illustrate both the strength of the correlation between the two datasets (i.e. similarity of patterns from one year to the next) as well as the level of agreement in magnitude between GRACE and ground observations (measured by the departure of points from the diagonal one-to-one line). At Gulkana Glacier, B _a from GRACE and ground observations were poorly correlated (r ² = 0.05, p = 0.1), and the absolute values of GRACE B_s and B_w values were larger than ground observations. For Wolverine Glacier, B _a had a relatively high correlation (r ² = 0.75, p = 0.79) between ground and GRACE observations, and the magnitudes of field-derived B _s and B _w were very close to those observed by GRACE. We note that the higher correlation between GRACE- and field-derived B _a values for Wolverine Glacier may have occurred due to compensating errors in the associated B _s and B _w values, as indicated by their lower correlation to the GRACE data.

Fig. 7. Comparison of area-averaged summer (orange squares), winter (gray circles) and annual (red diamonds) mass balances from GRACE and those derived from USGS field observations at (a) Gulkana Glacier and (b) Wolverine Glacier between 2003 and 2009. GRACE data are converted to specific values by dividing the mass change by the total ice area in mascons containing each glacier.

Comparisons to climate observations

Both the 700 mbar reanalysis air temperatures and the interpolated ground surface temperatures captured a large amount of the variability in GRACE-derived B _s data (r ² = 0.72, p = 0.02 and r ² = 0.59, p = 0.07 respectively; Fig. 8; note the inverted secondary y-axis). In nearly all cases, surface and 700 mbar anomalies were positive during years of negative B _s. A notable exception was 2009, a year of strongly negative B _s during which 700 mbar temperatures were slightly above normal, but surface temperatures were slightly below normal. This was in contrast to 2004, when a similarly large negative B _s value was matched by strongly positive surface and 700 mbar anomalies. We note that during 2004 the magnitude of the 700 mbar temperature anomaly was approximately four times larger than in 2009, even though B _s anomalies were similar between the two years. During 2004, 700 mbar air temperature departures from the 2004–10 mean were distributed across the GOA region, while in 2009 the highest departures occurred over the St Elias, Juneau and Stikine icefield regions (Fig. 9). 2008 had the largest positive summer balance departure that was matched by the most negative surface and 700 mbar air temperature departures. The 2008 temperature departures were distributed relatively uniformly across the region (Fig. 9).

Fig. 8. Departures of GRACE GOA summer glacier mass balances from the 2004-10 mean (orange circles, left axis; note that negative summer balance departures imply greater summer mass loss). GOA summer (June–August) surface (black squares) and 700 mbar lower-troposphere (black circles) air temperature departures from the 2004–09 mean (right axis; note inverted scale).

Fig. 9. Departures in summer (June–August) 700 mbar air temperature (mean of NCEP R-2 and ERA-Interim reanalysis) from 2004–10 mean at each of the eight GRACE mascon mountain ranges.

There was no significant correlation between GRACE-derived B _w and winter (September–May) precipitation determined from PRISM (r ² = 0.16, p = 0.43) and from the reanalysis products (r ² = 0.07, p = 0.57; Fig. 10). The winter balance years 2006 and 2008 had above-normal winter balances together with above-normal surface snow accumulation values, while the opposite occurred for the 2007 and 2009 balance years.

Fig. 10. Departures of GRACE GOA winter mass balances from the 2004–10 mean (gray circles, left axis). GOA winter (September–May) total winter snowfall departure from the 2004–09 mean (right axis). Data are derived from station observations (black squares) and from reanalysis model output (red squares).

Spectral albedo values averaged over May–July for GOA glacier surfaces showed a 50% increase in shortwave absorption during 2009 relative to the average of the remaining years in 2004–10 (Fig. 11). The greatest decrease in albedo occurred in the visible and near-infrared spectrum (0.40–0.9 μm).

Fig. 11. Average May–July MCD43C3 MODIS-derived spectral albedo for all gridcells within a 250 km radius of Mount Redoubt and having a glacier coverage of 95% or greater for the years 2000–10. Areas listed next to sample years indicate the total gridcell area sampled each year.

Snow cover on glacier-free terrain (an annual average of all snow-cover values in the GOA region exclusive of glaciers) had maximum values of 90–96% and minimum values of 7–13% within the 2004–10 time period (Fig. 12). The summer of 2008 had the largest minimum snow cover (13%), corresponding with the least negative B _s discussed above. For most years the average snow cover was <40%, and therefore below the threshold for inclusion in the GLDAS model, during May–July. To assess potential errors in eliminating cells with <40% snow cover, we multiplied the number of cells with <40% snow cover by 0.01 kg m⁻² (Reference Rodell and HouserRodell and Houser, 2004), yielding a value of 2.5 Gt. We lack further information to more accurately assess the water equivalent depth of snow remaining, but we provide this estimate to illustrate the potential order-of-magnitude impact of late-season snowpacks on our mass trend retrievals.

Fig. 12. Average percent snow cover on glacier-free terrain in the mascon solution domain determined from the MODIS Monthly L3 Global snow-cover dataset. Red line is the monthly time series, and gray bars mark the magnitude of the summer minimum value.