The energy balance of the Antarctic ice sheet/atmosphere system appears to be the net result of interactions between the ice active layer and the atmosphere over a certain time period. This energy balance characterizes different amounts of heat and moisture participating in a complex process of glaciation. Recent fragmentary data on the marginal heat exchange are used to derive quantitative estimates of energy processes in the ice/atmosphere system by traditional geographical methods. All balance components were calculated for a closed balance, assuming that:

• (i) The mass of the ice sheet is stable, i.e. iceberg calving is balanced by accumulation Reference Shumskiy and Tolstikov(Shumskiy, 1969);

• (ii) The ice/atmosphere system is in thermal equilibrium, that is the algebraic sum of the heat input and losses should be equal to zero;

• (iii) The mean annual heat exchange through the ice surface should be zero; during cold months the active ice layer loses the same amount of heat as it receives during warm months Reference Rusin(Rusin, 1961; Reference Rubin, Wexler, Wexler, Rubin and CaskeyRubin, 1962).

The moisture balance of the ice surface (mass exchange through the surface), of the atmosphere, and of the ice/atmosphere system can be described by the following expressions (UNESCO, 1978):

where r is the atmospheric precipitation made up of advective precipitation r _a and precipitation due to evaporation/condensation, or local precipitation, r _E (r = r _a + r _E), A the solid precipitation accumulated at the ice surface, it balances the iceberg calving, E the evaporation from the surface, q the wind-induced snow-drift from ice onto the ocean, f the melt run-off from the ice surface into the ocean, a the moisture advection to the atmosphere, and c the total atmospheric moisture flux over the ice surface comprised of the transient advective moisture c′ and local moisture discharge c″ (c = c′ + c″), where

Mean annual accumulation over the whole Antarctic ice sheet was calculated from the map constructed by Reference KotlyakovKotlyakov and others (1977), the melt water run-off from the surface of the marginal glaciers was calculated by Reference KlokovKlokov (1979), the value of the wind-driven snow-drift to the ocean was calculated from the results of a few direct measurements of snow-drift made in Antarctica during various expeditions Reference Aver’yanov(Aver’yanov, 1980). The first estimates of the surface evaporation from the whole continental ice sheet were made. The minimum values of direct measurements and calculations for various glaciomorphological zones such as ice shelves, coastal areas, slopes of glaciers with absolute height of 1 000–2 500 m as well as high plateaux were used for these estimations Reference Aver’yanov(Aver’yanov, 1980).

The total moisture advection in the atmosphere was calculated by Drozdov and Grigor’yeva (1963) using the formula

where w is the atmospheric moisture content equal to 2.52 mm (Reference VoskresenskiyVoskresenskiy, 1976), ū the mean speed of effective moisture transfer equal to 8.9 m s⁻¹ (Reference VoskresenskiyVoskresenskiy, 1976), l the linear dimensions of the area equal to √S where S = 13.94 × 10⁶ km², and N the number of seconds in the period of calculation. The total atmospheric moisture discharge is determined from Equations (2) and (3). The author in his earlier work presented numerical values of the balance components and the scheme of Antarctic moisture turn-over (Reference Aver’yanovAver’yanov, 1979[a]). Mean annual specific values of mass exchange components of the ice surface and of atmospheric moisture exchange together with their thermal equivalents are shown in Table I.

The mean annual heat balance of the ice-sheet surface, the atmosphere, and the ice/atmosphere system is expressed by the following expressions. They apply to the whole area of Antarctic glacierization.

where R is the radiation balance of the ice surface, R _a the radiation balance of the atmosphere, R _s the radiation balance of the ice-atmosphere system, (LE) the latent heat of evaporation, (Lr) the latent heat of precipitation, (La) the latent heat of phase transformations of advective moisture, (Lc) the latent heat of phase transformation of the atmospheric moisture discharge, P the turbulent heat exchange between the ice surface and atmosphere, and (Ad) the heat advection in the atmosphere.

To reduce the heat-balance calculations on the basis of the available solar radiation data the following radiation balance equations are used

where R _k is the short-wave radiation absorbed by the surface, I _a the short-wave radiation absorbed by the atmosphere, E ₀ the effective surface radiation, (E _∞ − E ₀) the atmospheric radiation into space, and E _∞ the long-wave radiation into space. It follows that

The absorbed short-wave radiation is calculated from the formula:

where Q is the total radiation coming to the surface, α is the surface albedo, and

where (R _k + I _a) is the short-wave radiation absorbed by the ice/atmosphere system.

Solar radiation coming to the atmosphere Q _s is given by

where α _s is the albedo of the ice/atmosphere system.

New maps of the distribution of annual fluxes of total radiation Q and the ice-surface radiation balance R in Antarctica (Reference MarshunovaMarshunova, 1980) together with the long-term surface radiation data from Antarctic stations (Reference Dolgin, Dolgin, Marshunova and PetrovDolgin and others, 1976) were used as initial data for the calculations of the radiation-balance components.

Another important source of information on the heat exchange between the Antarctic ice sheet and the atmosphere is the Nimbus-3 results and the calculations of the solar radiation fluxes and long-wave radiation based on the satellite data (Reference RaschkeRaschke and others, 1973). The results of the calculations are presented on maps of the South Polar region as mean annual albedo α _s, absorbed short-wave (R _k + I _a) and outgoing long-wave radiation E _∞, and radiation balance R _s of the ice/atmosphere system. The numerical values of the radiation balance components for Antarctica have been published by the author (Reference Aver’yanovAver’yanov, 1979[b]).

The usual difficulties due to the lack of the necessary amount of data of instrumental measurements arise when attempts are made to determine long-wave radiation fluxes described by the following equations.

The surface long-wave radiation balance is given by

where E ₀ is the effective radiation of the surface calculated by Equation (8) in which R and R _k are measured variables (Reference Dolgin, Dolgin, Marshunova and PetrovDolgin and others, 1976; Reference MarshunovaMarshunova, 1980), E _z is the surface radiation calculated by the Stefan–Boltzmann formula E _z = δσT ⁴ for T = 237.7 K which is equal to the mean annual temperature of the ice surface (Reference Shumskiy and TolstikovShumskiy, 1969), and E _a is the atmospheric counter-radiation defined as E ₀ + E _z.

The long-wave radiation balance of the atmosphere is given by

where (E _∞ − E ₀) is the atmospheric radiation into space, E _∞ being a measured variable (Reference RaschkeRaschke and others, 1973), and E _k is the absorption by the atmosphere equal to E _z − E _w where E _w is that part of the ice surface radiation outgoing into space.

It is known that most of the ice surface radiation is absorbed by atmospheric water vapour, CO₂, and ozone, but mainly by the water vapour which is transparent to infra-red radiation only in a narrow spectral band known as the atmospheric window. We do not know yet the amount of heat E _w outgoing through that window in Antarctica. To close the long-wave radiation balance we can assume this part of the radiation outgoing into space to be approximately numerically equal to the effective ice surface radiation E ₀ (in fact it can be a little lower), i.e. E _w = E ₀. Then the long-wave radiation absorbed by the atmosphere E _k would be equal to the atmospheric counter-radiation E _a, through the nature of this coincidence is considered to be irregular.

The balance of long-wave radiation in the ice surface/atmosphere system can be then given by

where E _∞ is the instrumentally measured value (Reference RaschkeRaschke and others, 1973), (E _∞ − E ₀) is calculated as shown above, and E _w is taken from the consideration that E _w = E ₀.

Advective heat (Ad) and turbulent exchange P are determined as residuals of Equations (5), (6), and (7). Table II shows the components of radiation and heat balance, obtained as described above.

The accuracy of absolute values in Tables I and II seems not to be very high due to errors caused by different measuring methods and paucity of observational data, because of this the data taken for averaging were not homogeneous in quality and time. This is primarily true for moisture parameters, while the radiation balance components in a number of cases were calculated with an accuracy comparable with the probable measuring error. These data, however, allow us to assess the order of magnitude of major heat and moisture fluxes participating in the Antarctic glacierization. They are also indicative of the structure of the moisture and heat balances.