Introduction

Glaciers exert a strong influence on stream-flow because they store and release water by means of irregular variations in their mass balance. This effect can be studied by direct measurement of mass balance in the field but this is laborious and expensive, especially in remote areas like Greenland. Is it possible to replace direct measurements of mass balance by indirect, and cheaper, methods?

Probably the most attractive possibility for indirect assessment of mass balance is to use the equilibrium-line altitude (ELA) as suggested by Reference Meier and RootsMeier and Roots (1982). In principle, the ELA can be determined directly in the field by measurements of a few stakes in the appropriate zone of the glacier while, by contrast, the determination of the total mass balance needs stakes scattered over the whole glacier. Alternatively, the ELA can be estimated from snowline altitudes obtained by aerial reconnaissance (e.g. Reference LaChapelleLaChapelle, 1962, or Reference Meier and PostMeier and Post, 1962), or by satellite remote sensing as discussed by Reference ØstremØstrem (1975).

The success of the above approach depends upon the existence of a definite relationship between glacier mass balance and ELA as suggested for individual glaciers by, for example, Reference LiestølLiestøl (1967), Reference HoinkesHoinkes (1970), and Reference ØstremØstrem (1975). The general validity of such an equation, and the evaluation of its parameters, is the subject of the present paper. Technical problems associated with the determination of the ELA and snowline altitude are outside the scope of this discussion although they may involve considerable practical difficulties, especially in areas like Greenland (Reference Weidick and ThomsenWeidick and Thomsen, 1983).).

Background

A simple linear relation between the mean specific balance b_t and the equilibrium line altitude ELA_t for the same year, denoted by t, can be postulated as fullows:

(1)

where ELA₀ is the balanced-budget ELA, i.e. the ELA when the mean specific balance is zero, and α will be termed the effective balance gradient as it represents a kind of time- and space-average of the balance gradient. The parameters α and ELA₀ are assumed to be constant for any particular glacier for the purposes of the present analysis, and are defined by the equation. However, it is likely that the true balance gradient will fluctuate from year to year, and from place to place on the glacier, while the balanced-budget ELA will show secular variations in connection with advance or retreat of the glacier.

If the specific balance on the glacier surface is a linear function of elevation, i.e. if the balance gradient is constant, the parameter ELA₀ will equal the mean elevation of the glacier E_mn, and α will be identical to the constant balance gradient. This was first pointed out by Reference KurowskiKurowski (1891) and rediscovered by Reference LiestølLiestøl (1967). With the extra assumption of a symmetrical distribution of glacier area with elevation, the term ELA_o will also be equal to the median elevation of the glacier E₅₀. For this latter reason it is often suggested that glaciers should have a balanced budget with an accumulation area ratio (AAR) equal to about 0.5 (Reference Meier and PostMeier and Post, 1962) and, accordingly, the median elevation parameter is recommended for inclusion in national glacier inventories (Reference MüllerMüller and others, 1977). However, balanced-budget AAR values of about 0.67 seem to be more appropriate for alpine glaciers (Reference Gross, von, Gross and KerschnerGross and others, [1977]) so that ELA₀ may be somewhat lower than the mean elevation for many glaciers. On the other hand, in areas of extremely high relief like the Andes or Himalaya, the balanced-budget AAR might be less than 0.5 due to avalanche-accumulation or topographic “concentration” of precipitation (Reference MüllerMüller, 1980).

The ELA concept is not applicable to all glaciers. For example, on glaciers with a small elevation range, local variations in specific balance can mask the altitudinal variations so that there is no simple average elevation for a line separating the ablation area from the accumulation area. In an extreme case where the specific balance values are more or less randomly distributed over the glacier surface, the balanced-budget AAR will be about 0.5 and the ELA concept will be meaningless. In this case the effective balance gradient will be zero.

The above concepts are also difficult to apply to large ice masses like the ice tongues draining the Greenland ice sheet. Because of the problems in mapping such areas and, especially, in delineating the extent of the accumulation area, parameters like the median elevation E₅₀ and accumulation area ratio AAR are difficult to assess. For the same reason, it is difficult to calculate mean specific balance for such ice bodies even when specific balances have been measured at many points. These problems are now under investigation by Grønlands Geologiske Undersøgelse but it is still too early to draw any firm conclusions.

From Equation (1) it seems that the main problem for calculating the mass balance from the ELA lies in the correct choice of the effective balance gradient α and balanced-budget ELA. This will be examined in the following section by analysis of data compiled from the literature.

Method and Results

The parameters in Equation (1) were evaluated by least-squares for a total of 31 glaciers, each of which has at least five years of record. The necessary data (including mass balance, ELA, and the area distribution with elevation) ware mainly compiled from Reference KasserKasser (1967, Reference Kasser1973) and Reference MüllerMüller (1977). The data set is essentially the same as used in an earlier paper by Reference Braithwaite and MüllerBraithwaite and Müller (1980). The reader is referred to that paper for details of periods of records and sponsoring agencies. The sample of 31 glaciers is stratified into five geographical groups as follows;

• Group I - Arctic North America: Baby Glacier (1), White Glacier (2), and Devon Island Ice Cap (3).

• Group II - Western North America:Gulkana Glacier (4), Wolverine Glacier (5), Ram River Glacier (6), Peyto Glacier (7), Woolsey Glacier (8), Place Glacier (9), Sentinel Glacier (10), Blue Glacier (11), and South Cascade Glacier (12).

• Group III - Scandinavia:Storglaciären (13), Troll-bergdalsbreen (14), Engabreen (15), Høgtuvbreen (16), Ȧlfotbreen (17), Nigardsbreen (18), Gråsubreen (19), Hellstugubreen (20), Hardangerjøkulen (21), and Austre Memurubre (22).

• Group IV - The Alps:Limmerngletscher (23), Silvretta-gletscher (24), Hintereisferner (25), Vernagtferner (26), Griesgletscher (27), Kesselwandferner (28), Langtalferner (29), and Caréser (30).

• Group V - Central Asia:Tsentralnyy Tuyuksu (31).

The included glaciers extend from lat. 43 to 79°N. but the sample is biased towards relatively small temperate glaciers. The sample also includes only the types of glacier for which the ELA is a well-defined concept. The geographical grouping is arbitrary and it is not postulated that the groups are homogeneous. Indeed, the second and third groups especially will contain glaciers from both maritime and continental environments.

In all cases, high negative correlations were found between the mean specific balance and the ELA series. The individual correlation coefficients ranged from −0.81 to −0.99, with a mean of −0.95 for the sample of 31 glaciers. Naturally, the correlations are affected by sampling, especially as some of the series are as short as only five years. However, in the present case, the high correlations for the longer series lend credence to the correlations for the short series.

Calculated values of effective balance gradient and balanced-budget ELA are given in Table I for the 31 glaciers divided into five groups. For convenience, the balanced-budget ELA values have been expressed as deviation from various orometric parameters; the mean elevation E_mn, the median elevation E₅₀, and the elevation E₆₇ which corresponds to AAR = 0.67.

Table I. Mean and Standard Deviation (Sd) of the Effective Balance Gradient α in mm Water/m Together with Deviations of Balanced-Budget Ela from Various Orometric Parameters in Metres

With the exception of the first group, the average balance gradients for the different groups are similar although there are large within-group variations, expressed by the standard deviations SD. Reference HaefeliHaefeli (1962) has suggested that “ablation gradient” (by which he clearly meant the balance gradient in the ablation area) should be a function of latitude. Accordingly, the 31 individual values are plotted against latitude in Figure 1 but, except for the low gradients for the three northernmost glaciers, there is no obvious trend with latitude. This is in agreement with Reference SchyttSchytt (1967), who found no clear relation between ablation gradient (correctly defined) and latitude. One suspects that the contrast between maritime and continental environments within each group predominates over any possible latitudinal effect, e.g. glaciers with high mass exchanges often have high gradient values also. At the same time, one might expect a sharp discontinuity between temperate and sub-polar glaciers but the latter are represented by three out of the 31 cases so that it is not possible to examine the question in any detail.

Fig. 1. Effective balance gradient α plotted against latitude for 31 glaciers. The numbering of the points corresponds to the glacier numbers given in the text.

The results in Table I show that mean deviations of the balanced-budget ELA from the various orometric parameters are generally of the order of a few tens of metres (excluding the three northernmost glaciers). The balanced-budget ELA is generally lower than both the mean and median elevations, E_mn and E₅₀, while it is usually higher than E₆₇. Doubtless this reflects the fact that the specific balance on most glaciers has a lower gradient in the accumulation area than in the ablation area so that a proportionately larger accumulation area is required to produce a balanced budget. Once again, this effect may partly reflect contrasts between maritime and continental environments.

For the 31 glaciers the mean elevation range between E₅₀ and E₆₇ is 90 m (standard deviation ±50 m). This figure gives a good idea of the uncertainty in estimating balanced-budget ELA if one does not have any mass-balance data from the glacier.

Calculation of Mass Balance from Equilibrium-Line Data

There are two practical cases that could arise. In the first case one might want to extend an existing mass-balance series by using ELA data for additional years, while in the second case one might want to calculate mass balance for glaciers where no measurements have been made.

The first case is the simpler. The appropriate values of effective balance gradient α and balanced-budget ELA can be calculated according to Equation (1) using the record available from the glacier. The mass balance for additional years can then be calculated from ELA data for as many other years as such data are available. Reference Clark and BruceClark and Bruce (1967) give a formula for calculating the effective length of series which have been extrapolated by correlation methods. Assuming the correlation coefficient between mass balance and ELA to be about −0.95 (the average of the 31 cases studied here), their formula shows that a five-year mass-balance record can be extended to an effective length of 8.6 years by the use of an extra five-year record for the ELA. This might be attractive from the financial point of view if cheap, and reliable, methods of obtaining ELA data are available on an operational basis. On the other hand, if a few years of mass-balance data are available for a particular glacier, there will be other methods by which the series can be extrapolated, e.g. by correlation with a nearby long-term climate station as done by Reference LiestølLiestøl (1967), Reference MartinMartin (1974), Reference Hoinkes and SteinackerHoinkes and Steinacker ([1975]), and Reference BraithwaiteBraithwaite (unpublished) among others. Such methods might be competitive with the presently described method using the ELA.

The second case, when one has no measured mass-balance data to calibrate the model, is more difficult. The problem is to guess the appropriate values of the effective balance gradient α and balanced-budget ELA to be applied to the “unknown” glacier. From Table I a value of about 5 mm water/m (in round figures) appears to be typical for a while the (unknown) balanced-budget ELA will lie somewhere between E₅₀ and E₆₇, i.e. with an uncertainty range of the order of one hundred metres. The parameters E₅₀ and E₆₇ can be evaluated by planimetric measurements on a topographic map of the glacier if one is available. Naturally, maps of glaciers in remote areas can be rather inaccurate, but effects of map errors on the orometric parameters will be somewhat mitigated by the fact that the measured ELA data will be referred to the same map.

In order to illustrate the calculation of long-term mass balance of an unknown glacier, the above assumptions were applied to the 31 glacier series analysed in the previous section. The mean and standard deviation of the resulting errors for the 31 glaciers divided into five groups are shown in Table II for various assumptions represented by Models 0 to 3. Models 1 to 3 all assume an effective balance gradient of 5 mm water/m while Model 1 assumed the balanced-budget ELA to be given by E₅₀, Model 2 assumes it to be given by E₆₇, and Model 3 uses the correct balanced-budget ELA to illustrate the effects of errors in the effective balance gradient. Model 0 assumes that all mass balances are zero and is given as a standard of comparison for the other models, i.e. as an analogy to the persistence forecast in meteorology.

Table II. Mean and Standard Deviation (Sd) Of Errors in Calculating Long-Term Balances for 31 Glaciers using Ela Data. Units are mm Water

Comparing the results of the Models 1 to 3 in Table II with Model 0 shows that some rather large errors can arise. For example, for the three northernmost glaciers none of the models give better results than simply assuming zero mass-balance. For all the other groups, mean errors can be reduced by choosing an orometric parameter intermediate between E₅₀ and E₆₇. The standard deviation of the error involved in neglecting variations of effective balance gradient is of the order of ±60 to ±150 mm water/m (Model 3). By contrast, the error due to the combination of this effect with the uncertainty in balanced-budget ELA has a standard deviation of the order of ±130 to ± 210 mm water (Models 1 and 2). For the “Western N. America” and “Scandinavia” groups, Models 1 and 2 will both reduce random errors compared to Model 0. Little reduction is achieved for glaciers in “The Alps” group because random errors in the models are of similar magnitude to the mass-balance variations between the glaciers within the group.

The above results are not especially encouraging. Random errors of the order of 100 to 200 mm water for the estimation of annual mass balances might be acceptable. However, the above results relate to errors in long-term mean mass balances, i.e. mean values for periods 5 to 29 years for the present data set. The major source of error is apparently due to uncertainty in the correct choice of balanced-budget ELA for the individual glaciers. Some method of improving the estimation in the case of an unknown glacier must be found.

Conclusions

There is generally a high correlation between mean specific balance and equilibrium-line altitude (ELA) which is expressed by a linear equation involving two parameters; the effective balance gradient and the balanced-budget ELA. However, these two parameters vary from glacier to glacier in a way which is difficult to predict accurately. This means that one can estimate accurate mass balances from the ELA after one has collected a few years of record to evaluate the parameters for the glacier in question. Existing mass-balance series can, therefore, be extrapolated by the use of ELA data. In the case of an unknown glacier, where no mass-balance measurements are available, one has to guess the appropriate values of the parameters, and the estimated mass balances are correspondingly less accurate. However, the results might still be useful in areas with large mass-balance variations, i.e. larger than the errors involved in the estimation procedure.

The answer to the question posed in the title of the present paper is therefore rather equivocal. If one is faced with the problem of assessing stream-flow conditions in areas with extensive glacier cover, one must start mass-balance measurements on several glaciers to provide background information. Analysis of the data may allow one to estimate values of the effective balance gradient and balanced-budget ELA parameters which can be applied to other, unmeasured, glaciers in the same area. Estimates of glacier mass balance from ELA data can supplement field measurements of mass balance but cannot replace them at present.