4.1.1 Geodetic data and co-registration

We used 22 DEMs and orthoimages, 18 of which we produced for this study (Table 1). These were produced using Structure-from-Motion photogrammetry methods (SfM; Westoby and others, Reference Westoby, Brasington, Glasser, Hambrey and Reynolds2012) on scanned stereo aerial photographs acquired before 1990. Publicly available DEMs and orthoimages in 2000 and 2013 were derived from Synthetic Aperture Radar (SAR). After 2013, DEMs and orthoimages were produced using Digital Globe imagery and the Ames Stereo Pipeline (Neigh and others, Reference Neigh, Masek and Nickeson2013; Shean and others, Reference Shean2016). Low-resolution imagery, poor accumulation zone contrast and/or incomplete glacier coverage prevented DEM production for several orthoimages. These images were only used to quantify glacier area.

Table 1. Geodetic data used to reanalyze Taku (TG) and Lemon Creek (LCG) Glaciers

The reference DEM is marked with an *.

Use of the 1948 USGS National Elevation Dataset (NED; topographic map-derived) was complicated due to the terminus area of Taku Glacier being updated with more recent imagery (Larsen and others, Reference Larsen, Motyka, Arendt, Echelmeyer and Geissler2007). To remedy this, a DEM was produced of Taku Glacier's terminus from the original 1948 aerial stereo images. This DEM was inserted into the reprocessed region in the NED to provide a time-consistent initial DEM.

The C-band SAR used to produce the 11 February 2000 Shuttle Radar Topography Mission (SRTM) DEM contains 4 ± 2 m cold snow penetration over temperate glaciers (Rignot and others, Reference Rignot, Echelmeyer and Krabill2001). Rather than attempt to correct the SRTM DEM for acquisition date bias, we considered the DEM representative of the 1999 end-of-season glacier surface (i.e. assuming 4 ± 2 m of snow had already accumulated on the glacier by midwinter; Fig. S4). Our assumption is supported by recent comparisons of the SRTM DEM, ASTER DEMs and laser altimetry data collected at Taku Glacier between August 1999 and May 2000 (Berthier and others, Reference Berthier, Larsen, Durkin, Willis and Pritchard2018), which resolved similar amounts of snow penetration. We used a 27 August 1999 Landsat 5 image for an orthoimage roughly coincident with the SRTM DEM.

DEMs and orthoimages were co-registered using a universal method (Nuth and Kääb, Reference Nuth and Kääb2011) to minimize systematic misalignment errors. Co-registration was applied to manually selected regions of stable, snow-free ground, covering a broad range of aspect, elevation and area limited to slopes <40° within DEM pairs. Co-registration shifts were also applied to coinciding orthoimages. Each DEM was co-registered to and differenced from the highest quality, or ‘reference’ DEM (Table 1).

4.1.2 Area, hypsometry and geodetic mass balance

Well-defined glacier margins were manually delineated from orthoimages. To minimize the issues arising from seasonal snow cover, we used orthoimages acquired between midsummer and the mass minimum date (Table 1). Tributaries present in 1948 were included throughout the analysis regardless of their connectivity in later years. This prevented step changes in the area and mass balance when tributaries disconnect (Klug and others, Reference Klug2018). Margin identification along Taku Glacier's nine ice divides relied on flow-field divergence (Burgess and others, Reference Burgess, Forster and Larsen2013; Kienholz and others, Reference Kienholz2015), and each divide was assumed to remain stationary throughout the analysis period.

We combined glacier boundaries and co-registered DEMs to produce time-variable glacier hypsometries (Elsberg and others, Reference Elsberg, Harrison, Echelmeyer and Krimmel2001). For years between DEMs, we linearly interpolated changes in the hypsometry to prevent step changes in time (Harrison and others, Reference Harrison, Cox, Hock, March and Pettit2009; Huss and others, Reference Huss, Hock, Bauder and Funk2012).

Each co-registered DEM was bilinearly resampled to the coarsest resolution DEM, then differenced from the reference DEM (Table 1) to calculate the average surface elevation change (Shean and others, Reference Shean2016; Sass and others, Reference Sass, Loso, Geck, Thoms and Mcgrath2017) over the glacier larger area between each DEM pair. DEMs with unresolved glacier areas >5% (due to low snow contrast; Table 1) were interpolated using an empirical relationship between elevation change in respect to the reference DEM's elevation (Fig. S4; Larsen and others, Reference Larsen2015). Glacier-wide average surface elevation changes were converted to mass changes assuming a constant density of 850 kg m^–3 (Huss and others, Reference Huss2013).

4.1.3 Area and geodetic mass balance uncertainties

We used an inverse power-law model (Pfeffer and others, Reference Pfeffer2014) to estimate uncertainty in the glacier area. Uncertainties result from sensor resolution and landscape features (e.g. perennial snow or debris) that impair the exact determination of the glacier margin. These errors scale inversely to the glacier area (Kienholz and others, Reference Kienholz2015). Consequently, the relationship between glacier area and error produces proportionally greater uncertainties as glacier area decreases. Additionally, our assumption that ice divides remain stationary on Taku Glacier may not be strictly true, which could increase systematic errors. Hence for Taku Glacier we used an uncertainty of 2% (14 km²), corresponding to the upper bound of the RGI uncertainty model for that glacier area. Lemon Creek Glacier does not have flow divides, so the best estimate from the RGI area uncertainty model was used, which coincidentally is also 2% (0.21 km²).

We assessed geodetic mass balance uncertainty from DEM accuracy and alignment, data gaps and density assumptions using methods identical to the USGS Benchmark Glacier Project (O'Neel and others, Reference O'Neel2019). Errors from accuracy and alignment were quantified with the normalized median absolute deviation (NMAD) of post co-registration residual differences over stable, snow-free bedrock, between a given DEM and the reference DEM (Shean and others, Reference Shean2016). For DEMs with data gaps exceeding 5% of the glacier area, we used the mean absolute error (MAE) of observed versus predicted values (Table 1). In these cases, we combined those errors as the area-weighted average of the NMAD and MAE. Finally, given a lack of firn density observations, we assumed a density and uncertainty of 850 ± 60 kg m⁻³ (Huss and others, Reference Huss2013). These various uncertainty terms are then summed in quadrature to yield the total uncertainty (σ _G) for any geodetic measurement:

(1)$$\sigma _{\rm G} = \sqrt {\sigma _\rho ^2 \Delta {\overline {{\rm dh}} }^2 + \sigma _{{\rm dh}}^2 \rho ^2} \comma \;$$

where $\sigma _\rho$ represents density uncertainty as a unitless conversion factor of 0.85 (i.e. 850/1000 kg m⁻³), ${\rm \Delta }\overline {{\rm dh\;}}$ is the area-averaged surface elevation change, σ _dh the uncertainty of measured and interpolated area-averaged surface elevation change and ρ the glacier-wide density as a unitless conversion factor of 0.06 (i.e. 60/1000 kg m⁻³; Beedle and others, Reference Beedle, Menounos and Wheate2014; O'Neel and others, Reference O'Neel2019).

Finally, we assessed geodetic mass balance bias at Taku Glacier's main terminus where basal erosion and sediment excavation (unmeasured by DEM differencing) occurred as the glacier advanced into its own sediment shoal during the past 70 years (Motyka and others, Reference Motyka, Truffer, Kuriger and Bucki2006). Ice thickness measurements made in 2003 suggest that the volume of basal erosion since 1948 is less than or equal to the subaerial volume estimate over the region of terminus advance. To estimate an uncertainty bound for this unmeasured volume change, we doubled elevation change values from the 1948–2018 DEM difference map in the terminus advance region (Fig. 2). This change increased the mean mass balance by +0.04 m w.e. a⁻¹, which we included in the upper geodetic uncertainty bounds for Taku Glacier.

Fig. 2. Illustration of sensitivity testing to estimate the sediment excavation bias in the Taku Glacier geodetic assessment. The dashed black line represents sea level and the grey area above sea level is the amount of surface elevation change measured by DEM differencing. The grey area below sea level represents the amount of potentially unmeasured change in the geodetic assessment.

4.2.1 Glaciological measurements

A principal part of this reanalysis involved digitizing midsummer accumulation and ablation observations from JIRP field notebooks and compiling these with other existing glaciological measurements (Section 3; Figs S1, S2). Mid-summer JIRP snowpit data include snowpack thickness and density at fixed locations on the glacier surfaces. Measurements are made between late June and mid-August, with the number of snowpits varying annually. Ablation data consisted of short-term (between several days to weeks) and seasonal duration measurements on both glaciers. Additionally, both short duration and seasonal ice ablation were measured at Taku Glacier during 2004–05 (Kuriger and others, Reference Kuriger, Truffer, Motyka and Bucki2006). Finally, seasonal and sub-seasonal ablation measurements of both snow and ice were made on Taku Glacier (2014–15) and Lemon Creek Glacier (2016–18) for this study.

We addressed the lack of ablation zone observations using TSL observations (Kienholz and others, Reference Kienholz, Hock, Truffer, Bieniek and Lader2017). This involved using available georeferenced imagery (e.g. Landsat, Sentinel, Digital Globe) to extract snowline elevations between April and October each year. Point measurement of 0 m w.e. was assigned at the intersection of the TSL and glacier centerline before the TSL rose above the firn line. TSLs below the firn line were clearly identified at the transition between snow and bare glacier ice. We did not measure TSLs once it approached or passed the firn line to avoid the ambiguity of discerning seasonal snow from firn in low-resolution satellite imagery.

Ablation measurements were exclusively used for mass balance model calibration. Accumulation and TSL measurements were used to initialize the mass balance model each year.

4.2.2 Mass balance model parameter optimization

We used a mass balance model (Van Beusekom and others, Reference Van Beusekom, O'Neel, March, Sass and Cox2010; O'Neel and others, Reference O'Neel2019) to adjust mid-season measurements to a consistent time system. A positive degree-day (PDD) model (e.g. Hock, Reference Hock2003) estimates ablation on a site-by-site basis as:

(2)$$a = kT^ + \comma \;$$

where a is the snow or ice ablation (m w.e.), k is an empirically-derived degree-day factor for snow (k _s) or ice (k _i) and T ⁺ is the sum of PDDs (degrees >0 °C). Accumulation was estimated as:

(3)$$c = P_{\lpar T \lt 1.7\rpar }m\comma \;$$

where c represents snow accumulation (m w.e.), P is measured precipitation when lapse rate-adjusted temperatures from the Juneau Airport were below 1.7 °C (Van Beusekom and others, Reference Van Beusekom, O'Neel, March, Sass and Cox2010) and m is an empirically-calibrated scaling ratio between the weather station and each glacier. Finally, the change in mass balance was calculated between the measurement date and the glacier-wide mass extrema by summing the two model outputs as:

(4)$$\Delta M = a + c\comma \;$$

where ΔM is the mass balance at a specific site, determined from the daily sum of w.e. ablation, a and accumulation, c.

The model was forced with daily total precipitation and average temperature measured at the Juneau Airport at sea level (Fig. 1; Station ID: USW00025309; ftp.ncdc.noaa.gov; Menne and others, Reference Menne, Durre, Vose, Gleason and Houston2012). We optimized model parameters using all available observations from the Juneau Icefield, including short-term and discontinuous stations that are not robust enough to drive the model. First, we used temperature observations from seven sites located on the Juneau Icefield (1100–2100 m a.s.l; Fig. 1) to estimate lapse rates. To determine the optimal lapse rate used in our model, we compared PDDs measured at each weather station and those predicted by scaling the Juneau Airport data, exploring lapse rates from −4.0 to −6.5 °C km⁻¹. The optimal lapse rate was selected using R ², MAE and slope of the linear regression between observed and lapsed PDDs. Next, degree-day factors for snow (k _s), ice (k _i) and precipitation ratios (m) were derived using accumulation and ablation observations (Section 4.2.1) and the inverse of Eqn (2) and (3), with lapsed Juneau Airport data.

4.2.3 Reanalyzed annual mass balance

We used the optimized mass balance model to adjust all midsummer measurements to the mass minimum date in a common floating-date stratigraphic time system (Mayo and others, Reference Mayo, Meier and Tangborn1972; Cogley and others, Reference Cogley2011; O'Neel and others, Reference O'Neel2019). Mass change after each point measurement date was determined using Eqn (4), applying k _s for point measurements >0 m w.e. (snowpits) and k _i for those ≤0 m w.e. (TSLs). The annual point mass balances were resolved by adding model-predicted mass changes to observed point measurements.

To resolve the glacier-wide annual mass balance, piece-wise linear annual mass balance profiles (O'Neel and others, Reference O'Neel2019) were fit to the model-adjusted annual point mass balances and integrated over the glacier hypsometry. The time-variable hypsometry resulted in a conventional, stratigraphic floating-date, glacier-wide annual mass balance for each glacier, henceforth referred to as the reanalyzed time series.

4.2.4 Geodetic calibration and time series assembly

Geodetic calibration refers to the detection and removal of systematic errors in glaciological mass balances that cause a divergence between the cumulative glaciological time series and geodetic time series (Zemp and others, Reference Zemp2013; O'Neel and others, Reference O'Neel2019). The glaciological time series is adjusted to the geodetic time series with a constant calibration coefficient, describing the annualized systematic error removed from the glaciological time series (Zemp and others, Reference Zemp2013).

Two time-windowing approaches for geodetic calibration have been commonly applied in previous glacier mass balance studies (O'Neel and others, Reference O'Neel2019). The first is a ‘global’ approach (Van Beusekom and others, Reference Van Beusekom, O'Neel, March, Sass and Cox2010; O'Neel and others, Reference O'Neel, Hood, Arendt and Sass2014) which resolves a single calibration coefficient for the entire record. This method's strength is that the calibration is weighted by the geodetic uncertainty of each DEM. However, this approach does not allow for calibrations to vary as either the glacier's geometry or measurement program evolves. This can lead to a poor post-calibration agreement between the glaciological and geodetic time series if the systematic errors vary throughout the record. Alternatively, a ‘sequential’ approach (Zemp and others, Reference Zemp2013; Andreassen and others, Reference Andreassen, Elvehøy, Kjøllmoen and Engeset2016) resolves multiple calibrations for discrete geodetic measurement intervals. This allows for time-variable calibration coefficients, as the measurements or glacier geometry changes. However, it does not account for variable geodetic uncertainties, and errors in the geodetic mass balance, which can alias the time series.

Balancing the strengths of those approaches, we used a ‘breakpoint’ geodetic calibration (O'Neel and others, Reference O'Neel2019). Prior to calibration, we use the mass balance model to adjust the glaciological data to match the geodetic acquisition date. This choice results in minimal use of the model and removes any volume difference due to variable measurement timing. Breakpoints are inserted when calibration uncertainties exceed the difference between sequential calibrations. This method allows maximum use of geodetic data without the risk of short calibration periods accentuating or aliasing interannual variability.

Missing field data prevented a full glaciological reanalysis during the early part of the study interval, requiring a careful examination of the JIRP time series before a continuous time series could be constructed. Using the breakpoint approach, we geodetically calibrated the JIRP and reanalyzed estimates separately for both glaciers. We then compared the calibrated records for each glacier during the reanalysis period and determined that both approaches exhibited similar interannual variability. We finally extended the reanalysis time period using the calibrated JIRP time series, to produce continuous annual mass balance time series at Taku and Lemon Creek Glaciers during 1946–2018 and 1953–2018, respectively.

4.2.5 Glaciological uncertainties

We estimated random annual mass balance errors using a Monte Carlo simulation. This simulation mirrored sensitivity analyses for the USGS Benchmark Glaciers (O'Neel and others, Reference O'Neel2019), but further incorporated glaciological measurement, model adjustment and extrapolation errors. We estimated mean uncertainty from the variance of the Monte Carlo results by randomly varying all components simultaneously.

For each component, a normal distribution of perturbation was defined with the component uncertainty (described below) as 1σ of the distribution curve (Machguth and others, Reference Machguth, Purves, Oerlemans, Hoelzle and Paul2008). This simulation was run 1000 times randomly perturbing every component, for each year, in the reanalysis time series. The iterations were geodetically calibrated using each of the approaches described in Section 4.2.4, in addition to our preferred breakpoint approach to produce a range of possible glacier-wide mass balance solutions annually for each glacier. Our final glacier-wide stochastic uncertainty was determined by the average std dev. of glacier-wide annual mass balance solutions resulting from the Monte Carlo simulation during the reanalyzed portion of the time series.

The initial uncertainty source in our reanalyzed time series resulted from annual point mass balance estimation, initially obtained via JIRP snowpits and TSL observations. Previous studies concluded a ±0.08 m w.e. uncertainty for JIRP snowpit measurements (Pelto and Miller, Reference Pelto and Miller1990; Pelto and others, Reference Pelto, Kavanaugh and McNeil2013), due to low spatial variability in both snow depth (McGrath and others, Reference McGrath2015) and mean snow densities throughout the column (LaChapelle, Reference LaChapelle1954; Pelto and others, Reference Pelto, Kavanaugh and McNeil2013). However, potential observer errors (e.g. previous year's summer surface misidentification) were never included and may increase errors in the accumulation zone. Additionally, we lacked ground control for TSL measurements, limiting quantitative uncertainty estimates (Mernild and others, Reference Mernild2013). For these reasons, we applied ±0.2 m w.e. as a nominal glaciological uncertainty (Lliboutry, Reference Lliboutry1974; Beedle and others, Reference Beedle, Menounos and Wheate2014; Sass and others, Reference Sass, Loso, Geck, Thoms and Mcgrath2017). This represented a conservative error bound for all point measurements (both snowpit and TSL) in the Monte Carlo simulation.

Further uncertainty arose from late-summer adjustments of point measurements made using the mass balance model. The majority (96%) of adjustments involved the ablation portion of the model (Eqn 2), and error bounds were therefore represented with the MAE of the PDD calibration. Additionally, the simulation includes a 2% uncertainty in glacier area (Section 4.1.3), distributed randomly across all 100 m elevation bins of the AAD.

Spatial extrapolation of the mass balance profile over the glacier area was the most challenging uncertainty to quantify. Whether the profile captures mass balance (along and across any elevation bin) is generally unknown. The profiles may be only sparsely populated, especially at their tails, and fitting methods may not adequately capture true variability. To explore the sensitivity of extrapolating the mass balance profile over the glacier area, we varied both point balance values and the mass balance profile type. First, to simulate errors in lateral extrapolations, we used the MAE of the point mass balances (±0.38 m w.e. at Taku Glacier; ±0.36 m w.e. at Lemon Creek Glacier) compared to the mass balance profile to perturb the entire mass balance profile. We simulated longitudinal extrapolation errors for the lower and upper portions of the mass balance profile by varying the type of profile used. In addition to our preferred piece-wise mass balance profile (Section 4.2.3), we used two other recently cited mass balance profiles: a linear mass balance profile (Sold and others, Reference Sold2016) and the site-index method (an area-weighting approach long used by USGS; March and Trabant, Reference March and Trabant1996; Van Beusekom and others, Reference Van Beusekom, O'Neel, March, Sass and Cox2010).