I. Introduction

Concerning the movement of large ice sheets, two limiting cases have been calculated, pure gliding over the bedrock (Reference NyeNye, 1952) and the behaviour of the ice like a Newtonian liquid (Reference NyePhilberth, 1956). These can both be considered special cases of Glen’s law, with the exponent n = ∞ and n = 1 respectively. As has been shown by Reference HaefeliHaefeli (1961[a],[b]) and by Reference PhilberthPhilberth and Federer (1970), an excellent agreement with the real surface profile of the Greenland ice sheet is obtained if the exponent is taken as n = 3.5.

The temperature profile depends on the horizontal and the vertical velocity profiles (Reference RamseierRobin, 1955). These velocities are functions of the shear strain-rate, which is itself a function of the shear stress and the temperature. An exact calculation of the mutual dependence of temperature and velocity profiles would lead to very complicated expressions. Therefore one has to rely on simplified models. In the following we shall present such a model, which is sufficiently accurate and relatively simple.

Since the fundamental calculation of the temperature profile by Reference RamseierRobin (1955), a number of different refinements have been published (Reference Robin.deWeertman, 1961,1968; Reference Hansen and LangwayLliboutry, 1968). But so far the significance of the vertical velocity for the temperature profile has not been taken into account sufficiently. Generally one still uses the simplified assumption that the vertical velocity decreases in proportion to the distance from the bedrock. This assumption leads to a rather imprecise temperature profile. In a recent paper by Reference Dansgaard and JohnsenDansgaard and Johnsen (1969[b]) the vertical velocity V_h has been calculated from a simplified v_x -profile by use of the continuity equation for incompressible media. The simplification consists in the assumption, that v _x increases linearly up to a certain height from the bedrock and then remains constant up to the surface. If this height is chosen correctly, the derived v_h is a good approximation to the true v_h. It is difficult, however, to determine the value of this height, the v_x -profile is not known from measurement or from the theory. Reference Dansgaard and JohnsenDansgaard and Johnsen (1969[a]) also calculate the temperature profile with their improved function for v_h , and obtain good agreement with measurement. In the vicinity of the bedrock the vertical temperature gradient is approximately given by the sum of geothermal heat and the heat of friction, divided by the thermal conductivity of the ice (Reference LliboutryNye, 1951; Reference Hansen and LangwayLliboutry, 1968). Above this lower region the temperature profile has a monotonie curvature. The curvature lies in the region where the conflict between heat conduction from the lower parts and transport of cold ice from above is most pronounced, i.e. where the product of height h above the bedrock and vertical velocity v_h of the ice has an absolute value of the order of the diffusivity K of the ice (cf. Appendix A). The vertical velocity v_h in this region has a large influence on the temperature profile. Thus the calculations in this paper aim at a more accurate estimate of the vertical velocity in this region.

II. Symbols Used in this Paper

Symbol  Units   Description

_x    km   Horizontal coordinate, distance from ice divide.

h   m   Vertical coordinate, height above bedrock.

A   ma^-1   Long-time average of total accumulation (in ice thickness).

—A   m a^-1   Vertical downward velocity, measured from the surface.

v_x    m a^-1   Horizontal velocity.

v_xm    m a^-1   Mean horizontal velocity.

v _h    m a^-1   Vertical velocity.

—_{VH m}    m a^-1   Vertical downward velocity in the immediate vicinity of the surface for a profile which moves with v_xm-

y = kG(H-h)    Running dimensionless depth parameter.

T = kGH    Full dimensionless depth parameter.

H   m   Total height of ice sheet, H = H{x).

H   m   Standard total height (2 500 m).

h_{c    m}   Critical height, where curvature of temperature profile has its maximum.

o_x— cr_y   bar   Longitudinal stress.

T,T _xh    bar   Shear stresses.

é é₀   a^-1   Shear strain-rates.

e    Base of natural logarithm.

g   m s ²   Acceleration due to gravity.

p   Mg nr³   Density of ice.

G   deg m^_1   Real thermal gradient near the bottom.

G₀   deg m^-1   Standard value of G (1/44 deg m^_I).

G_g    deg m^-1   Geothermal gradient.

G_t    deg m^-1   Thermal gradient due to heat generation in shear layer.

_n     Stress exponent.

K   m² a^-1   Thermal diffusivity of ice (38 m² a"¹).

t   a   Age of the ice.

p_s    bar   Hydrostatic pressure.

Q*   J mo]^-1   Activation energy of creep.

Symbol   Units   Description

R   J mol^-1 deg^-1   Universal gas content.

k   deg^-1   Temperature coefficient, (o. 1—0.25 deg^-1).

T   K   Temperature.

T_B    K   Temperature at the bottom.

ΔT   deg   Real temperature difference between bedrock and a point vertically above.

ΔT₀   deg   Temperature difference as read From Table I,

S   K   Pressure melting point.

θ   deg   Difference between actual temperature and pressure melting point.

α  0   Surface slope relative to horizontal plane.

β  0   Slope of bedrock relative to horizontal plane.

φ(y,γ)    Profile function for horizontal How.

ψ(y,γ)    Profile function for vertical How.

III. Assumptions

1. The surface slope a and its horizontal gradient ∂ α/∂x are small.

2. The bedrock is horizontal (β = o).

3. The ice sheet docs not glide over the bedrock (v_x = o at h = o).

4. The density p is constant throughout the ice sheet.

5. ∂T/∂x and ∂G/∂x are very small.

6. The horizontal gradient of the longitudinal stress is very small.

7. The horizontal gradient of the accumulation ∂A/∂x is small.

8. Only the two-dimensional case is considered.

9. All the values are stationary.

Assumption (2) is made to simplify the calculations, although diese will be approximately valid for small ß and very small ∂ß∂x. If β ≠ o the x-coordinate is parallel and the h-coordinate orthogonal to the bedrock. Tor the case of a circular ice sheet the same values for ∂T/∂h,T and t are obtained if the linear distance x is changed into the radial distance r.

The validity of assumption (6) is a matter of discussion in the vicinity of the ice divide, and also in the outer regions of ice sheets where ice flows (Reference HaefeliHaefeli, 1968) and other types of spatial instabilities (Reference Hansen and LangwayLliboutry, 1968) may occur.

IV. Calculations

We start from the generalized Glen’s law (Reference WeertmanWeertman, 1968):

In the region of interest the temperature interval and the gradient of the pressure melting point are relatively small, so we can use (Reference BuddBudd, 1968; Reference Hansen and LangwayLliboutry, 1968):

Now for T in equation (1) we use the linear expression

The pressure melting point depends on H—h, This dependence being very small, however, we shall neglect it, so that S depends only on x. For the factor G we put numerically the geothermal gradient G_g or, for the case of an additional heat of friction, G_g+G_t. If heat of friction is present the linear form (2) differs slightly from the true temperature profile in the immediate vicinity of the bedrock, because the heat of friction is not formed at the interface between bedrock and ice, but in the lowermost layers; the deviation from the linear profile, however, is small (Reference Hansen and LangwayLliboutry, 1968).

Above a certain height h_e the linear form {2) ceases to be a valid description of the true temperature profile. Nevertheless we can use Equation (2) for a rather precise calculation of v_x and v_h in the whole range of h. This is proved in Appendix A.

Using assumption (6) and Equation (B1) (see Appendix B) one obtains, upon integration

As shown in Appendix B, Equation (3) can be inserted into Equation (1) which becomes

In the following, the movement of the ice will not be calculated from the slope x but by means of the mass budget. The first three factors of Equation (4) are merely a function f (x) which is of no further interest. With n = 3 Equation (4) becomes:

Upon substitution of Y = kGH and y = kG(H-h), integration of Equation (5) gives

where v _xm is the mean value of v_χ and

With

and

Differentiation of Equation (6) with respect to x yields:

or

The third term in Equation (7) is smaller than the second term for all values ofy, Y and x, but in the central region both terms are small compared with the first one. In many cases, especially if H > 2 000 m, the ∂φ/∂H term is only a small (positive) correction to the φ/H term so that we shall neglect it in further calculations.

Equation (7) now reads

We define

or:

where v_xm ∂H/∂x is the change of ice thickness per unit time considered for a profile which moves with the mean horizontal velocity v_xm, and —v is the vertical downward velocity of ice particles in the immediate vicinity of the surface considered for a profile which moves with the mean horizontal velocity v_zm. —v_R is measured from a horizontal plane and in the case of β ≠ o from a plane parallel to the bedrock.

Under normal conditions — v_xm ∂H/∂x increases a little more than linearly with x, while A can be assumed to be almost independent of x. Therefore < iv_H is nearly constant as long as A in Equation (9) is the predominant term, i.e., according to Equation (9a), as long as

Because of assumption (4) the continuity equation can be written

Integration of Equation (8) and using Equation (9) yields:

Where

The equation of stationary heat transport reads:

Under the condition (10) and with assumption (5), and can be neglected. On the E.G.I.G. profile in Greenland, for example, the gradient ∂T_B/∂x is very small (Reference PhilberthPhilberth and Federer, 1970). Equation (12) now reads:

which yields, upon integration

where

From Equation (13) the temperatures at all heights are obtained by integration;

The age t of the ice at any height can be calculated by means of the vertical velocity relative to the surface, i.e. — A ψ (y, Y) (see Equation (11)).

The integrals in Equations (14) and (15) do not have exact solutions (see also Reference RamseierRobin, 1955). The values for T(h) and for the age t were therefore calculated on the digital computer CDC 1604 of the Rechenzentrum der E.T.H., Zürich.

V. Results

The values calculated with Equations (13) and (15) are shown in Tables I and II. In order to obtain the maximum information from Table I the product is given for 7 values of Y = kGH as a function of the relative heights h\H for thin (\vHH\ = 75 m² a-^-1), medium (|v_HH| = 375 and 750 m² a^-1) and thick (|v_HH| =1 500 m² a^-1) ice sheets. ΔT is the difference between the temperatures at the bedrock and the height h/H, G_o is the standard thermal gradient taken as 1/44 deg m^-1 and H_o = 2 500 m. In order to find ΔT" for any thermal gradient G at the bedrock and any total height H of a particular point on an ice sheet, the value of Δo_o, which is read from the appropriate Table, has to be multiplied by 44GH/2 500 deg^-1, so that

Values of |v_HH| which are between those given in Table I, a-d, are best interpolated graphically, where one has to note that, by Equation (13), for |v_HH| =0, ΔT = Gh and for v_HH= ∞: ΔT= o. Column (I) for Y= ∞ gives the temperature profile of Reference RamseierRobin (1955). while column (7) for Y = o represents the temperature profile obtained by Glen’s law e = const, T ³.

Appendix Λ

Above a certain height the linear form of Equation (2) differs considerably from the true temperature profile. As a characteristic height where the deviation becomes important, we lake h_e which is the height of maximum curvature of the temperature profile. h_e can be calculated by use of the Equation (12a)

Differentiating with respect to h, the left-hand side becomes zero at the maximum of the curvature:

Using Equation (A1) in (A2) yields:

or

If we use the approximate expression v_h = -Ah/H we arrive at the relationship described in the Introduction:

and

(The indices c denote the point of maximum curvature.)

Thus, from the bedrock to h_e the linear form (Equation (2)) is a very good approximation for the true temperature profile.

Above h_e the deviation is large. If we want to use Equation (2) in the calculations of the horizontal and vertical velocity profiles, we must prove that, above the temperature does not influence the v_x profile to any appreciable extent. In order to prove this, we will show that at h_e - the shear velocity ∂v_x/∂h has decreased by at least a factor 1/e = 0.368 with respect to its value at the bedrock (in most real situations the factor is essentially smaller than this). If this is the case the increase of Pi between h_e and the surface (h= H) is very small. Therefore we are not committing any important errors by using the linear form (2) which, above h_e , yields a lower temperature and therefore a larger rigidity of the ice than the true values. larger rigidity above h_c, however, further reduces the difference of V_x between A = h_e and h = H..

Suppose now that the shear strain-rate (Equation (5)) has decreased by a factor less than the. Division ot Equation (5) for h = h_c by the value for h = o yields:

From Equation (A₅),

and inserting this into inequality (A6) we obtain:

If condition (Λ7) is fulfilled, the linear form (2) can be used in calculating the velocity and temperature profiles. It can be seen that (Λ7) is fulfilled for every possible value of h_e/H if

The magnitude of the error in Equation (5) cannot very well be estimated by using the foregoing considerations. The error is equal to the difference D between the real value ∂v_x/∂h and the une given by Equation (5). Tin: function D depends on the true temperature profile, which can be calculated by Equation (Λ1). In this way the following approximation is obtained:

The precise calculations show that the neglected terms of higher order (in the temperature function and in the exponential expression) nearly compensate each other, so that Equation (A9) is rather accurate for all real ire sheets.

Comparing Equation (5) with the functionf(x)(H—h)" exp (-kT), where T is the real temperature profile and n is chosen such that the values of this function are equal in the region where D has its maximum, yields the exponents n given in Table III.

Numbers in brackets are n-values for unreal ice sheets. Only Antarctica and Greenland have Y values > 3; but for these ice sheets A is smaller than 0.35 m a^-1 and therefore A/(kGn) ≤ 3. Thus, for all existing ice sheets H-values between 3 and 5 are obtained.

These estimates need the following comment: Robin’s treatment is the zeroth approximation to the velocity profile, because the temperature is not taken into account and n is taken to be ∞. Equation (5) with the linear temperature profile is the first approximation if the exponent in Glen’s law is taken to be 3. On the other hand, Equation (5) is already the second approximation if it is taken to describe the true physical mechanism with the real temperature profile instead of — Gh and an exponent n taken from Table III.

Since laboratory and field experiments yield an exponent n between 3 and 4, we arrive at the following conclusion: Equation (5) gives a very accurate description of the temperature profile for all ice sheets; in many cases (especially if n ≈ 3,5) the description of the temperature profile by Equation (5) is even better than if one had substituted —Gh by the true temperature profile.

Appendix B

In this Appendix it is shown that, because of assumption (6), it is justified to putT_xh for r in Equation (1) and ∞v_x for In recent papers (Reference BuddBudd, 1968; Reference NyeNye, 1969) detailed studies on the stress in ice sheets have been published. Here an intuitive description of the ice flow is given. The ice sheet is considered to consist of a pile of thin horizontal layers. These are subject to the shear stress t_xh and the shear strain-rate ∞v_x between the layers and to the longitudinal stress o_x - o_h and the longitudinal strain-rate within the layers.

At the ice divide and τxh are zero; σ _x –σ _h and are non-zero. Therefore for the ice divide we can state that the longitudinal stress v _xh drives the longitudinal strain-rate and the shear stress T_xh drives the shear strain rate . This statement is approximately valid for the whole central region of the ice sheet. In order to prove (his fact we consider, as a first approximation, not only T but also to be independent of x and consequently the longitudinal stress for the maintenance of to be likewise independent of x This last mentioned longitudinal stress and the longitudinal stress a_x— an. both being independent of. x and both being identical for x = o we can conclude that they are identical also for x≠0.

There could be an objection: for our proof we have neglected some values which have been called small. For large values of.x these could add up to an amount which could be not negligible. In principle this objection is right. It must be realized, however, that a_x— a_h and are nearly independent of while r_xh and increase with x Calculations have shown that under conditions which exist on the E.G.I.G. profile in central Greenland, for. > 10 H the longitudinal force (i.e. a_x— a_h = 2 a_x p_s integrated over a vertical cross-section) is smaller than the total shear force (i.e. the bottom value of T_xh integrated over a horizontal cross-section). In consequence, even if an influence of exists, this influence remains small with respect to that of T_xh- and T in Equation (1) can therefore be understood as and T_xh respectively. In Reference NyeNye’s (1969) equation can be neglected because where P_s is nearly independent of x, so that it reads