Glacier reconstructions

In this study, three methods of estimating steady-state ELAs of former glaciers are compared to see whether they yield statistically similar results. All three methods require some form of glacier reconstruction.

Thirty-four late Foxe glacier outlines were reconstructed on air photographs using morphostratigraphic data. The method used was similar to that employed by Reference Sissons and SutherlandSissons and Sutherland (1976) for former glaciers in Scotland. Terminal and lateral moraines, areas of glacial scour, vegetation trimlines, and present ice extent in cirques were used to define former glacier margins on air photographs. For glaciers that formerly extended beyond the modern shoreline, the ice terminus was inferred using the outlines of outwash deltas, which can be delineated on air photographs where these deltas exist. Glacier plans were compiled photogrammetrically on a 1 : 62 500 enlargement of the Cape Dyer 1 : 250 000 topographic base map, and ice-surface contours were inferred. Figure 1b shows reconstructed glacier outlines.

Median elevation

Since the late nineteenth century in Europe, the median elevations of former glaciers have been used to estimate ELAs (Reference ManleyManley, 1959; Reference ØstremØstrem, 1966). The same technique has been employed by Reference Richmond, Wright and FreyRichmond (1965) and Reference MeierdingMeierding (1982) in the United States. There is no apparent indication in the English-language literature why this value should approximate the ELA. Indeed, empirical evidence from modern glaciers suggests that it should be too high (Reference Meier and PostMeier and Post, 1962). Furthermore, the technique fails to take into account variations in valley morphology, which would affect the area–elevation distribution of a glacier. To this end, Reference ManleyManley (1959) suggested that, for glaciers whose valleys narrow markedly in their lower reaches, the ELA is three-fifths of the vertical distance up the glacier from the terminal moraine. Finally, the term “backwall elevation”, which can have a variety of meanings from the outset, becomes difficult to define for valley glaciers that head in compound cirques. For this reason, the method was applied in this study only to glaciers of simple geometry. For these ice masses it was deemed unnecessary to apply Manley’s three-fifths method.

Constraints on the accuracy of median-elevation estimates are imposed by reliability of the base map, which in this case has a contour interval of 500 ft [approximately 150 m], lacks geodetic control, and was unchecked in the field. Elevations of terminal moraines and cirque backwalls that lie between contours were estimated by linear interpolation. Backwall elevations were taken as the base of the wall or, in the case of glacierized cirques, the elevation of the bergschrund (Reference ManleyManley, 1959; Reference AndrewsAndrews, 1965).

Maximum elevation of lateral moraines

Because of the nature of glacier flow, lateral moraines theoretically should be deposited solely in the ablation zone, that is, at or below the ELA (Reference AndrewsAndrews, [^c1975]). Therefore, the maximum elevation of the lateral moraines would approximate the ELA. However, it is often difficult to determine, even with extensive field work, whether or not the landform is preserved entirely in its upper reaches. Lack of physical preservation becomes more problematical as age of the landform increases. ELA estimates derived from eroded lateral moraines would be too low. Similarly, non-deposition would cause low estimates. Conversely, the assumption that the maximum height of a lateral moraine is reached during steady-state conditions can lead to estimates of the steady-state ELA that are too high. If the initial phase of glacier retreat is slow, then additional morainal material could be added to the lateral moraine above the position of the former steady-state ELA. The same effect could be achieved if influx of debris from the valley wall in the accumulation zone were very rapid (i.e. more rapid than the glacier’s rate of flow).

It was originally intended that late Foxe lateral-moraine elevations would be measured by altimeter survey in the field; however, several test traverses showed that barometric fluctuations in the field area in the course of a day were great enough to cancel any advantage in accuracy that might have been gained through use of this method. This was especially true when the time required for each traverse was considered. The alternative was to estimate lateral-moraine elevations from the morphostratigraphic map. Elevations thus determined, as with the previous method, are probably accurate to within ±35 m. However, there is no reason why errors introduced in this way should be biased toward one method or another, and they should average zero.

Accumulation-area ratio

A method of determining ELAs that is supported by a large amount of observational evidence involves calculation of the “accumulation-area ratio” (AAR) (Reference Meier and PostMeier and Post, 1962). This is defined as the ratio of the accumulation area (area above the ELA) to the total glacier area. The AAR of a glacier varies as a function of its mass balance, with ratios below 0.50 indicating negative mass balances, AARs from 0.50 to 0.80 corresponding to steady-state conditions, and values greater than 0.80 occurring under strongly positive regimes. An AAR of 0.65 ± 0.05 is generally considered to be a characteristic value for steady-state conditions of valley glaciers (Reference PorterPorter, 1968, Reference Porter1970, Reference Porter1975; Reference Andrews and MillerAndrews and Miller, 1972; Reference AndrewsAndrews, [^c1975]). Values for ice caps and piedmont glaciers may differ significantly (Reference Meier and PostMeier and Post, 1962; Reference PiercePierce, 1979).

Calculation of late Foxe AARs was effected using reconstructed glacier outlines. Increments of area between ice-surface contours were measured to the nearest hectare using a digitizing electronic planimeter. The total area was also measured. Increments of area were summed, expressed as percentages of total area, and plotted on cumulative curves (Fig. 2). The steady-state ELA was read directly from a cumulative curve, as the elevation above which 65% of the glacier’s area lies. There are several possible sources of error in computing ELAs in this way. The error associated with lack of an accurate large-scale base map is not unique to this method but is inherent in each technique.

There is some uncertainty in the correctness of assuming an AAR of 0.65, as this figure is dependent upon the skewness of glacier-area distribution about the median elevation and upon the nature of the change in net budget with altitude (Reference Meier and PostMeier and Post, 1962). For reconstructed glaciers, it is a simple matter to estimate ELAs from the cumulative curves using different AARs and to analyze the magnitude of variation. The curves are steep enough in the affected part that for AARs of 0.60 and 0.70 the mean departure (from ELAs determined with an AAR of 0.65) is ±35 m, about ±7%. Choosing an AAR of 0.65 does not yield significantly different ELAs than those derived using AARs within the range of 0.60–0.70.

Fig. 2. Graphs of glacier area as a function of elevation.

• a. Area–elevation histogram of a reconstructed late Foxe glacier (glacier No. 25; Fig. 1b).

• b. Cumulative curve for the same glacier showing the graphical method used to determine steady-slate ELAs.

The introduction of measurement errors was minimized through a series of checks on planimetry. For each glacier measured, the sum of incremental areas was compared with the total glacier area obtained by tracing the full glacier outline. A precision standard was arbitrarily set at 2% of total area; in most cases the difference was less than 1%. Another test of precision involved ten replicate measurements of a single glacier of moderately complex shape. This yielded a mean of 9.80 km², a standard deviation of ±0.02 km², and a coefficient of variation of 0.20%. Precision of glacier-area measurements is clearly adequate.

The largest single source of inaccuracy related to the AAR method of determining paleo-ELAs is the reconstruction of ice-surface contours. Even when the glacier outline can be inferred with considerable confidence, it is sometimes difficult to locate contours. This is because glacier margins often intersect valley-side topographic contours at small angles or coincide with them for some distance. The effect on inferred area–elevation curves can be significant and considerably different ELA values can result. Unfortunately, little more can be done than to note the existence of the problem. However, there is no reason why these errors should be biased toward any one part of the study area; spatially, the errors can be considered to be randomly distributed.

Statistical comparison of the results of these three methods was made using the F statistic for analysis of variance, and a paired t test for evaluating equality of means of ELAs. All tests were conducted at the 95% confidence level.

Trend-surface analysis

ELAs of present and late Foxe glaciers were mapped using trend-surface analysis. This method has seen widespread application in geologic research; general discussions of trend mapping can be found in Reference Krumbein and GraybillKrumbein and Graybill (1965) and Reference DavisDavis (1973). In glaciological studies, the technique has been used by Reference Peterson and RobinsonPeterson and Robinson (1969), Reference Andrews, Andrews, Barry and DrapierAndrews and others (1970), Reference Andrews and MillerAndrews and Miller (1972), Reference Sissons and SutherlandSissons and Sutherland (1976), Reference MeierdingMeierding (1982), and Reference WilliamsWilliams (unpublished). L.D. Williams supplied the FORTRAN program used in this study. The advantage of trend-surface analysis is that it separates changes in a dependent variable (ELA), with respect to two independent variables (horizontal coordinates), into a regional component (regression) and a local component (residuals). Thus, comparison of maps of two or more data sets is simplified greatly as compared with manually produced contour maps. Another attractive feature of trend mapping is that regression equations of successively higher order can be fitted to the data, thereby allowing more or less of the local deviation to be included in the regional trend. Finally, trend surfaces can be analyzed by statistical methods.

For past and present Merchants Bay ELAs, first-, second-, and third-order equations were fitted to the data. The F distribution was used to test the significance of the surfaces, that is, to answer the question “Is there a regional trend, or do ELAs vary randomly across the study area?” The F test was also used to determine whether the addition of quadratic and cubic terms to the linear-trend equations significantly improved the amount of variance explained by the regression. If the explanation of variance was not substantially improved, it was deemed inappropriate to increase the order of the equation. All statistical hypotheses were tested at the 95% confidence level. Strength of trends (i.e. goodness-of-fit) is indicated by the per cent of total variance explained by the regression (R ² × 100) and by the coefficient of multiple correlation (R).

Variation through time in the regional trend of Merchants Bay ELAs was analyzed by comparison of trend surfaces, as well as by comparison of present and paleo-ELAs of individual glaciers. Regional ELA depression was determined by using 95 grid points predicted by the regression equations. The differences were plotted on a map and contoured. ELA lowering was also computed by using raw data from 23 existing and late Foxe glaciers whose locations coincide.

Comparison of paleo-ELA estimates

Original paleo-ELA data used to perform the comparisons are given in Table I. The outcome of statistical comparisons of three methods of paleo-ELA calculation is summarized in Table II.

Table I.

Table II. Statistical Comparison of Three Methods of Paleo-Ela Reconstruction

For AAR versus lateral-moraine elevation, the null hypothesis, H ₀: μ ₁ = μ ₂ , can be rejected at the 99% confidence level. The mean difference (z) is positive, with individual ELA differences as great as 300 m. This suggests that paleo-ELA estimates based upon maximum elevations of lateral moraines are generally too low, which points to the importance of non-deposition or post-glacial erosion of lateral moraines.

Comparison of lateral-moraine elevations and median elevations also shows that the two means are unequal at the 99% confidence level. Lateral moraines are mostly lower than median elevations by as much as 200 m.

For 15 late Foxe glaciers of simple geometry, the mean of ELAs determined using the AAR method is equal to the mean of median elevations at the 95% confidence level. If large, complex valley glaciers had been included in the sample, the results no doubt would have been quite different, due to the effect of changes in the symmetry of areal distribution about the median elevation (Reference Meier and PostMeier and Post, 1962). Furthermore, the median elevations used in the test were derived by the method of Reference ManleyManley (1959), who considered the “backwall elevation” to be the elevation at the base of the crags. In contrast, American workers (Reference Richmond, Wright and FreyRichmond, 1965; Reference FlintFlint, 1971; Reference MeierdingMeierding, 1982) have taken the top of the cirque wall as the “backwall elevation”, which would yield higher ELA estimates.

In conclusion, while lateral moraines are valuable as geomorphic evidence for fixing reasonable limits for former ice extent, they are unreliable indicators of former ELAs and their use could result in an overestimate of the magnitude of climatic change, as reflected by ELA lowering. Although this study shows that it is possible to have broad regional correlation between ELAs determined by the AAR and median-elevation methods, the use of the latter method is probably worthwhile only in a limited number of situations, because it does not take into account the variability of mass balance or areal distribution with respect to elevation. Its use is not recommended, therefore, and those who find it necessary to employ the method should be aware of its limitations. Finally, this study shows that direct comparison of ELAs that have been computed by various methods in different regions can lead to erroneous conclusions, and must be attempted with caution.

Analysis of trend surfaces

Linear-trend surfaces of present and paleo-ELAs are shown in Figures 3 and 4, respectively. Statistical data pertaining to the trends are given in Table III.

Fig. 3. First-order trend surface of present Merchants Bay ELAs showing the distribution of data points, residuals in excess of ±100 m, and general orientations of ice masses (in parentheses). B–B′ is the line of cross-section shown in Figure 5. The contour interval is 50 m.

Fig. 4. First-order trend surface of late Foxe ELAs showing the distribution of data points and residuals in excess of ±100 m. A–A′ is the line of cross-section shown in Figure 5. The contour interval is 50 m.

Table III. Statistical Data Pertaining to Trends of Merchants Bay ELAs

Fig. 5. Topographic profiles and maximum ELA gradients from linear trend surfaces. Locations of sections are shown in Figures 3 and 4. a. Late Foxe ELAs; b. Present ELAs. The vertical exaggeration is x8.

Strengths of all trends, indicated by the correlation coefficient (R), are quite high, suggesting that trends correspond well to the data. Analysis of variance shows that all trends differ significantly from the random effect, which means that ELAs do, in fact, vary systematically with respect to geographic location. However, the decrease in unexplained variance obtained by fitting higher-degree regressions to the data is only significant in the case of the former (late Foxe) quadratic surface. Therefore, no further analysis was made of quadratic or cubic trends.

Correlation coefficients for trends of former ELAs are in all cases higher than those of corresponding present trends. This contrast is also reflected by the greater number and magnitude of residuals in excess of 100 m from the present linear trend than from the former linear trend (Figs 3 and 4); data relating to residuals from first-order trends are presented in Table IV. Residuals from the former trend are evenly distributed with respect to sign. However, positive deviations from the present trend are fewer, but of greater magnitude than negative deviations. The largest positive residuals from the present trend are located on high mountain massifs, in south-facing valleys. One conclusion that may be drawn is that ELAs, at present, are more affected by local factors (e.g. aspect and topography), whereas paleo-ELAs varied more in a purely regional sense due to orographic and atmospheric effects. This conclusion is supported by the fact that a higher-order surface fitted to the present ELA data does not significantly improve the explanation of variance, whereas the late Foxe quadratic trend does provide a substantially better fit.

Table IV. Statistical Data Pertaining to Residuals in Excess of ± 100 m from the First-Order Trend Surfaces

Linear trends of present and paleo-ELAs show contrasts with respect to orientation and elevation. The azimuth of the present surface is 147° with a north-easterly dip; the azimuth of the former trend is 105° and the dip is north-north-east. The trend of ELAs in the area has shifted 42 since the late Foxe maximum, from a north-north-easterly to an east-north-easterly aspect. The maximum inclinations of the surfaces differ somewhat (Fig. 5), with the present surface having 14% higher gradient than the former trend.

ELA lowering, as computed from raw data, varies between 55 and 335 m ( x = 180 m, s = 83 m, n = 23). Determinations made using predicted present and former trend values show a similar range – from 67 to 338 m ( x = 205 m, s = 65 m, n = 95). Figure 6 is a map of ELA depression constructed using trend-lowering data, contoured at a 50 m interval. It shows greatest amounts of ELA lowering in the north-west corner of the study area, and least amounts in the south-east corner of the study area. However, ELA differences computed from actual data show no such systematic variation across the area. This lack of systematic change may be a result of the increased dominance of local climatic, geographic, and topographic influences at present, or of variation in glacier morphology.

Fig. 6. Map of ELA depression in the Merchants Bay area. Contours are lines of equal difference between first-order trend surfaces of present and late Foxe ELAs. Numbers in the north-east and south-east corners are maximum and minimum differences, respectively. The contour interval is 50 m.

Paleoenvironment

There are several paleoenvironmental implications of changes in the regional trend of ELAs. Change in the orientation of the trend surface may be attributed to shifting of storm tracks from north to south and south-west over the last 10 ka (Reference BarryBarry, 1981; Reference LockeLocke, unpublished). At present there is a strong precipitation gradient across the region; the precipitation at Cape Dyer is about four times that at Padloping Island. This is a result of cyclogenesis in the Labrador Sea and storms tracking into Davis Strait from the south and south-west, as well as the presence of a persistent polynya off Cape Dyer. The trend of present ELAs shows strong affinity to this source of moisture, both in azimuth and inclination. The slightly greater dip of the present surface may be related to the proximity of moist maritime conditions. Past workers (Reference Meier and PostMeier and Post, 1962; Reference Andrews and MillerAndrews and Miller, 1972) have noted the increased slope of regional ELA trends toward the coast and have attributed this to increasing oceanic influence.

In contrast, the late Foxe trend is oriented more nearly normal to the coastline north of Merchants Bay. This fact and the lower slope of the surface indicate more continental conditions and lower temperatures over the region (Reference LockeLocke, unpublished). The greater effective distance from a source of moisture that these conditions imply can be explained by the existence of extensive (possibly perennial) sea ice in Davis Strait adjacent to the Baffin Island coast, and/or by a northerly storm track into Baffin Bay−Davis Strait. Thus, analysis of paleo-ELAs leads to the assertion that the climate in the Merchants Bay area during the late Foxe stade was both colder and dryer than at present. This is consistent with the conclusion of Reference Miller and WilliamsMiller and Williams (1974), who used a computer snow-melt model to determine that summer temperatures in the Merchants Bay area were 2–6 deg lower than at present, and that snowfall was 30% lower.