Theoretical considerations

Consider a valley glacier (Fig. l). The line = ₀ represents a surface below which there is very little heat conducted from the atmosphere during the study period. The energy content of the volume below this surface is changed slightly by deformation, by friction on the bed, by geothermal heat and by the heal δ required to melt the small volume lost at the snout,

Fig. 1. Longtudinal section of a valley glacier showing zones with thru associated energy content.

We use the following notation:

Q measured heat content of the volume between the surface = ₀ and the glacier surface ;

δ heat content of the volume of the glacier below the surface = ₀ which is lost by melting at the snout;

D energy supplied to the glacier by internal deformation (negligible near the surface) ;

R energy supplied by friction at the bed of the glacier;

G energy supplied as geothermal heat.

At time T ₁ the heat content of the glacier is Q _A+Q _I where Q _A is the heat content of the volume below the surface = ₀ and Q ₁ is measured at time T₁. At time T ₂ the heat content of the glacier is

Q_A+Q₂ + δ+D+R+G

where Q₂ is measured at time T₂.

The change in heat content of the entire glacier is therefore

(4)

Fig. 2. Vertical section near the glacier surface, q is the energy content of the prism bounded by pecked lines. It is calculated from the profiles of p and θ.

Consider a prism extending through the glacier (Fig. 2). The heat required to melt the ice in the prism down to the = ₀ surface is

(5)

The total heat content Q of the volume above the surface = ₀ is the surface integral of q over the glacier.

where A is the area of the glacier.

The change of heat content of the surface layers Q₂ – Q₁ is given by

where

Δq = q₂ – q₁

Similarly the change in mass of the glacier is

I_m = M₂ –M₁ + Γ

where M₁ and M₂ are the masses of ice above the surface = ₀ at times T ₁ and T₂, Γ is the aggregate of mass changes below the surface = ₀ caused by bottom melting, by ablation at the snout, and by freezing of water in crevasses.

where

Δm = m ₂ m ₁

and

Location of the z₀ surface

Measurements are referred to a Z ₀ surface, which must be used again for subsequent measurements. The Z ₀ surface should be chosen below the level at which there is significant heat flow even at the end of the study period. It may be chosen at a shallower depth in the accumulation area than in the ablation area.

Since the Z ₀ surface can be relocated only by reference to stakes drilled into the glacier, it is essential that the stakes remain in place for the entire study period. This may prevent the method being used on glaciers with extensive ablation areas where the stakes cannot be planted deeply enough to remain in place through several ablation seasons. In the accumulation area, the settling of stakes relative to the Z ₀ surface must be taken into account.

Practical considerations

In principle p and θ can be measured at any point in the glacier, It is sufficient to consider the volume above the Z ₀ surface because Q _A is almost constant.

To perform the surface integral for Q we need values of Δ _q over the glacier surface. In practice, we must interpolate between sampled points. The required density of points depends on the complexity of the accumulation pattern. We must determine the temperature and density profiles down to the Z ₀ surface at each point. The integral for Δ _q can then be calculated numerically.

Temperature profiles

The most reliable way to maintain a datum for ice temperatures is to bond sensors to a stake made of an insulating material drilled into the Z ₀ surface. The choice between chromel/constantan thermocouples and platinum resistance thermometers depends on cost, sensitivity, stability, and ease of measurement.

Density profiles

Densities obtained at Spartan Glacier by weighing blocks of snow were not sufficiently precise. The blocks crumbled easily because they contained a large amount of superimposed ice. Even on glaciers where the block method is more accurate, gamma-ray transmission measurements (Reference Smith, Smith, Donald and Owens.Smith and others, 1965) would be preferable in that they can determine the densities of a 1 cm layer to an accuracy of 1%.

Evaluation of heat content at sample points

We can now obtain the value of Δ _q (= q₂ – q₁ ) from Equation (5). Functional forms of p and θ may be obtained by fitting suitable curves to the measured values. The integral may then be calculated by numerical methods.

Evaluation of the surface integral

To evaluate the surface integral of Δ _q we use an array of equally spaced points covering the glacier. At each array point, we derive a value of Δ _q by interpolation between the measured values.

The interpolation can be performed by computer programme (Reference DudnikDudnik, 1971). The surface integral becomes

where A is the surface area of the glacier, Δ _qj is the jth value of Δ _q in the array of J points.

Energy changes at Spartan Glacier

From Equation (4) the change in energy content of the glacier is

ΔE = ΔQ+δ+D+R+G.

We have made estimates of the terms using data from Spartan Glacier. The estimates are expressed as energy input per unit time over the whole glacier divided by the surface area of the glacier.

(i) ΔE ≈ 1.5 W/m² derived from the mass balance, assuming steady temperature conditions in the glacier.

(ii) δ ≈ o.i W/m² derived from estimates of How and thickness near the snout.

(iii) (D + R) ≈ 0.02 W/m². All the potential energy gained by the fall of the glacier appears as these two terms. [Mean velocity 25 mm/d (Reference Jamieson and WagerJamieson and Wager, in press) ; mean bottom slope 4° (Wager, in press) ; total mass 700 × 10⁹ kg (Reference Jamieson and WagerJamieson and Wager, in press).]

(iv) G ≈ 0.04 W/m² (Reference RuncornRuncorn, 1967). Because (D + R + G) must be small for any glacier, the change in energy content of the glacier becomes

ΔE ≈ ΔQ + δ

(v) ΔQ ≈ 1.4 W/m² from the above equation.

Accuracy of determination of ΔQ

The integral for Δq consists of two parts

in which the smallest detectable energy change is about 10⁶J/m². This is the result of a temperature change of o. 1 deg at the surface. We assumed the Z ₀ surface to be 10 m deep.

and the smallest detectable energy change is again about 10⁶ J/m². This is the result of a 1 cm change in the surface level z_s , assuming a density near the surface of 250 kg/m₃.

10⁶ J/m² would be transferred in 8 d at 1.5 W/m², the average energy input at Spartan Glacier. It should therefore be possible to measure the change in energy content per year to within 3% averaged over the glacier. Uncertainties in the surface integral increase this error. However, it is likely that ΔC can be determined to within 10% in one year.

A series of measurements of ΔE (=ΔQ + δ) for, say, 10 years would establish the trend and the variation from year to year. Approximate values of ΔE at Spartan Glacier were calculated from the mass balance by assuming steady-state temperature conditions. The results are shown in Table I.

Table I. Annual change in energy of spartan glacier

Free water

Free water in the layers above the Z ₀ surface produces errors in both integrals in Equation (5). The specific heat capacity of water is twice that of ice and the heat content is, by our definition, zero. Therefore q must be determined at times when there is no free water in the surface layers, preferably at the end of the accumulation season. The heat content of the glacier is then at a minimum.

Crevasses

Water flowing into crevasses which penetrate the Z ₀ surface has zero energy content by our definition and therefore Q _A is not changed. However, the corresponding mass, MA, is changed and an error is introduced into the calculation of change of mass of the glacier.

Temperate glaciers

A simplification of Equation (3) is possible for temperate glaciers. The temperature of the whole ice mass is very close to the melting point at the end of the ablation season.

Is therefore zero and

and

ΔE = LΔM.

Changes in energy are due solely to the latent heat associated with changes in mass of ice.

Other ice masses

Although we have discussed a valley glacier the same considerations may be applied to some other ice masses. The method cannot be applied to ice shelves because of the practical difficulties in determining the energy exchange beneath them.

A simple and probably fruitful extension is to large ice sheets (Fig, 3a). No ice flows into a sector bounded by the ice divide and two flow lines (Fig. 3b). The analysis for this volume exactly corresponds with that for the valley glacier.

Fig. 3. Cross-section of on ice sheet showing zones corresponding to those in a valley glacier.