Introduction

Information about net accumulation in polar regions may be preserved in layers found in ice sheets. Sources of (information include ¹⁰Be (Reference Raisbeck. and Yiou.Raisbeck and Yiou, 1985), dated volcanic-debris and bomb-fallout layers and the thickness of annual ice layers (Reference Paterson and WaddingtonPaterson and Waddington, 1984; Reference Reeh, Bleil and ThiedeReeh, 1990). Dust and other atmospheric constituents are mixed with the precipitation that falls on the ice-sheet surface. When firn compacts to ice, annual variations in these quantities are preserved in the ice, allowing annual layers to be identified. A detailed, continuous record of annual layer thicknesses near the Greenland summit has been obtained from the GISP2 ice core to 50 000 BP (Reference MeeseMeese and others. 1994). Long-term average layer thicknesses for ice older than 50 000 BP can be determined from a depth-age scale based on the Vostok ice-core time scale and sea-sediment records (Reference BenderBender and others, 1994). From this combined layer-thickness record, it is possible to obtain the most detailed, long-term history of accumulation over central Greenland to date.

The thickness of a given annual layer in an ice sheet is determined by the net annual accumulation at the lime of deposition and the amount of strain the layer has experienced from ice flow. The strain-rate pattern in an ice sheet at a given time is in turn determined by the geometry and rheological properties of the ice sheet. Models that have been used to infer accumulation rates from layer thicknesses (e.g. Reference Reeh., Oeschger and LangwayReeh. 1989; Reference AlleyAlley and others, 1993; Reference Dahl-Jensen, Johnsen, Hammer, Clausen, Jouzel. and PeltierDahl-Jensen and others, 1993) assume that the ice sheet maintains a constant thickness over time because the non-linear nature of ice flow makes the ice-sheet thickness rather insensitive to changes in the mass balance (Reference PatersonPaterson, 1981. p. 157). Reference AlleyAlley and others (1993) used this method to analyze the GISP2 layer-thickness record back to 17 000 BP. In this paper, we examine the effect of ice-sheet thickness changes on ice flow and the layer-thickness pattern.

We have developed a non-linear, one-dimensional model to investigate the evolution of ice-sheet thickness, the vertical strain rate and the annual layer thicknesses in response to changing accumulation rates. The model has three key assumptions:

• (i) The rate of change in ice-sheet thickness can he determined from the accumulation rate and vertical velocity.

• (ii) As it responds to changes in accumulation, the ice sheet evolves through a series of profiles that correspond to steady-state shapes.

• (iii) The shape of the depth variation in vertical strain rate is constant over time.

We infer an accumulation history for GISP2 from layer-thickness data using this variable-thickness model.

Theory

Consider the behavior of a large ice sheet at some time. t, with center thickness H at x = 0 and h at x ≠ 0, with an accumulation rate, b, and with ice moving vertically downward and horizontally with velocity components v and u (Fig. 1). We assume that the surface and bed slope near the summit are essentially flat so that Assumption (i) above can be stated as:

(1)

According to this expression of mass conservation, if the accumulation rate increases/decreases with respect to a steady-state value, then the ice sheet gets thicker/thinner.

Fig. 1. Profile of a simple ice sheet. Horizontal and vertical velocity components are represented by u and v, respectively. In steady state, the accumulation rate. b, is independent of position, x, and equal to the surface vertical velocity, v(h).

To relate the geometry of the ice sheet to the surface vertical velocity, we consider the configuration of a two-dimensional ice sheet. Based on the standard assumptions (a) that the ice sheet is frozen to its bed. (b) that shear stress τ_xy increases linearly with depth from 0 at the surface to τ_b at the bed, (c) that the surface slope is small, and (d) that there are no horizontal stress gradients, then

(2)

In addition, we assume that ice deforms according to Glen’s flow law so that that n = 3, and that the temperature and structure of the ice are such that the flow-law parameter. A, is independent of depth, y. With these assumptions, the depth-averaged horizontal velocity ū is given by

(3)

If we further assume that local variations in the shape of the ice-sheet surface profile caused by transient flow effects diffuse away quickly so that the shape of the ice sheet is smooth and the surface vertical velocity, v(h) = v(H), is independent of position, x, then at any given instant, continuity of ice mass requires that

(4)

where h is the thickness at x, and ū is the depth-averaged horizontal velocity.

Combining Equations (3) and (4), and integrating from the edge where h = 0 to the divide where h = H, yields an ice-sheet shape. If the ice sheet were in steady state with v(h) = b then this shape would correspond to the steady-state profile derived by Vialov and described in Reference PatersonPaterson 1981, p. 154-157). Our more general approach allows the ice sheet to change its thickness while maintaining a shape at any given instant that corresponds to a Vialov steady-state profile associated with v(h) rather than b (assumption (ii) above).

At the divide (x = 0), this shape gives the following relationship between H the ice-sheet thickness at the divide, L, the half-width, and v(H), the surface vertical velocity:

(5)

where f depends on n and A. for n = 3, the 1/8 power in Equations (5) shows that the thickness is relatively insensitive to changes in mass balance. If the thickness changes, the velocity also changes so as lo oppose the thickness change.

Since the thickness of the Greenland ice sheet at the GISP2 site is essentially the same its the thickness at the divide, we only need to calculate H(t), and the problem is reduced in one dimension. If we further assume that the margins are fixed (L = constant), that the flow law parameter, A, does not change over time, and that the present geometry at GISP2 represents a steady-state geometry, then f is a constant which can be determined by parameterizing Equations (5) for the present conditions at GISP2. The ice thickness there is about 3025 m (ice equivalent), and the surface vertical velocity can be taken to be equal to the present accumulation rate of 0.24 m a⁻¹ ice equivalent (Reference Bolzan and Strobel.Bolzan and Strobel, 1994).

Equations (5) describes how the surface vertical velocity is related to the ice-sheet thickness. To describe the Strain rate at depth, we apply assumption (iii) above: the non-dimensional shape of a given vertical velocity profile that is characteristic of off-divide ice (flank flow) is time-independent. This assumption is based on theoretical and experimental arguments showing that the shapes of velocity profiles in ice sheets with uniform rheological properties are insensitive to small changes in surface geometry (Reference RaymondRaymond, 1983: Reference HindmarshHindmarsh. 1990). The velocity at depth is then scaled to the vertical velocity at the surface according to a non-dimensional shape, so that

(6)

Equations (1), (5) and (6) together describe the effect of accumulation-rate changes on the ice-sheet thickness and the vertical strain-rate distribution.

However, since the flow law in real ice sheets is not uniform or time-independent, the vertical velocity profile does not actually maintain a given shape over time. To estimate the error from assumption (iii), we compare the model results using three distinct, non-dimensionalized vertical velocity profiles: one generated by a finite-element model of the GRIP-GISP2 flowline Reference Schott., Waddington and RaymondSchott and others, 1992); one calculated analytically for a flow enhancement (ice “softness” caused by impurities and/or development of a c-axis fabric and temperature distribution characteristic of interglacial conditions; and one calculated for an enhancement and temperature distribution characteristic of glacial conditions (Fig. 2). Details of these calculations are provided in a later section.

Fig. 2. Vertical velocity profile shapes used to test sensitivity of model results to possible changes in the strain-rate pattern from temperature and flow enhancement from chemistry and fabric. Corresponding temperature and enhancement distributions used to calculate the velocity profiles are also shown. The dashed-dot line represents the finite-element calculation. The solid and dashed lines represent the velocity calculations for characteristic glacial and interglacial.

Numerical Methods

To run the model forward in time, we take a prescribed accumulation history and calculate a thickness change and a vertical velocity distribution at each (50 a) time step. Horizons are tracked as they move deeper into the ice sheet. This Forward model produces a layer-thickness pattern and an ice-sheet thickness history. The characteristic response time of a glacier or ice sheet to mass-balance changes should be on the order of H/b (Reference Jóhannesson, Raymond and Waddington.Jóhannesson and others, 1989), or about 1Oka for GISP2. Our model, when tested with sinusoidally varying accumulation-rate histories, gives a response time with the correct magnitude, about 6ka.

The inverse problem requires calculation of net-accumulation-rate and thickness histories given a layer-thickness pattern such as the one from the G1SP2 ice core. Simply running the forward model backward and unstraining the layers at each time step is unstable. In the forward model, the thickness response to a mass-balance impulse decays exponentially with time. When the model is run backward, this response to mass balance is expressed as a growing exponential that leads to an unstable thickness prediction. To avoid this instability, we couple the forward and backward calculations and use an iterative method. We start with a constant-thickness history and calculate a corresponding accumulation history by unstraining the layers from the GISP2 core (moving backward in time). This accumulation history is used to calculate a new thickness history by running the model forward in time. This new thickness history ts then used to calculate a new accumulation history from the GISP2 layers by running the model backward in time, and so on. We iterate until a consistent accumulation and thickness history is obtained (about five iterations). Figure 3 illustrates this coupled process. To summarize, model inputs and outputs are the following:

Model inputs

• 1. Annual layer thickness profile from GISP2.

• 2. Non-dimensional vertical velocity profile.

• 3. Reference conditions for thickness, half-width, and surface vertical velocity (to define the parameter f in Equations (5) ).

• 4. Initial thickness history.

Fig. 3. Illustration of the iterative method used in the model. Each rectangular box represents the ice column. Representative interfaces are indicated by horizontal lines. Bold arrows indicate the direction of calculations, and n indicates the time step. A prescribed thickness history, H(t), with an assumed vertical velocity distribution, v(y), is applied to the GISP2 layer-thickness data to calculate an accumulation-rate history, b(t). This accumulation-rate history is then used to calculate a new thickness history. A consistent accumulation-rate and ice-thickness history is achieved after about five iterations.

Results and Discussion

We applied this model to layer-thickness data from the GISP2 ice core, from 105 000 to 50 000 BP, the data are based on a 12 point time-scale obtained from the Vostok time-scale and sea-sediment records (Reference BenderBender and others. 1994). More recently than 50 000 BP, the data are based on the identification and counting of annual layers in the core (Reference MeeseMeese and others, 1994). To reduce noise, these annual layer-thickness data were averaged over 2 m.

The solid curve in Figure 4a shows the inferred accumulation rates after five iterations of the model. For this calculation we used the vertical velocity profile from a finite-element calculation along the (GRIP-GISP2 (flow-line (Reference Schott., Waddington and RaymondSchott and others, 1992). The half-width L was fixed at its present value of about 400 km. The dotted curve in the figure is the accumulation-rate history inferred assuming no thickness change. To see the long- time-scale differences between the accumulation histories predicted by the constant-thickness model and the variable-thickness model, both curves shown in Figure 4a have been smoothed with a 500 a running average. Consequently, the amplitude of very high-frequency variations in accumulation rate are somewhat reduced. The sharp peaks In both curves at about 55 000, 81 000 and 86 000 BP are caused by discontinuities in slope of the coarse depth-age curve prior to 50 000 BP. The variable-thickness model predicts accumulation rates about 20-25% lower than the constant-thickness prediction for the pre-Holocene record. The variable-thickness model also preserves the high-frequency variations in accumulation rates. The corresponding ice-sheet thickness histories are shown in Figure 4b.

Fig. 4. (a) Accumulation-rate history in m ice a⁻¹ for GISP2 using this model (solid line) compared to the inferred accumulation history inferred assuming constant thickness (dashed line). These calculations assume the vertical velocity shape given by a finite-element model (Reference Schott., Waddington and RaymondSchott and others, 1992) and a fixed half-width, L. To show long-time scale differences, both curves have been smoothed with a 500 a running average. The sharp peaks in accumulation rates at about 55 000, 81 000 and 86 000 BP are caused by discontinuities in the slope of the coarse depth-age curve prior to 50000 BP. These accumulation-rate histories define the envelope of most plausible accumulation histories at GISP2. (b) Corresponding ice-sheet thickness histories. Maximum thickness reduction for the variable-thickness calculation is about 450 m.

The effect of a non-steady vertical velocity profile

The calculation shown in Figure 4a assumes that the shape of the vertical velocity profile is not altered by evolving temperature and ice-softness (enhancement) distributions in the ice column. We attempted to determine the sensitivity of the inferred accumulation rates to changes in the vertical velocity profile shape by running the model with various distinct velocity profiles. One profile (used in Figure 4a) was generated by a finite-element calculation of ice flow near the Greenland summit (Reference Schott., Waddington and RaymondSchott and others. 1992). Two additional profiles were calculated analytically from simple models of a two-dimensional ice slab. An enhancement factor, E(y), was used to include the effect of flow-law variations caused by the development of a crystal fabric or changes in impurity concentrations. This factor was taken to be 3 for softer glacial ice and 1 for interglacial ice (Reference Paterson.Paterson, 1991), One of the two additional velocity profiles was calculated for a temperature and enhancement-factor distribution, T(y) and E(y), characteristic of interglacial conditions, and the other for a temperature and fabric distribution characteristic of glacial conditions (Fig. 3). The horizontal velocity profile. u(y), can be obtained by integrating the flow-law equation

(7)

where y = 0 at the surface and y = H at the bed. The flow-law parameter , where Q is the activation energy, R is the gas constant, n = 3, and α is the surface slope (Reference PatersonPaterson, 1981). The horizontal velocity, u(x,y), can be approximated as:

(8)

Vertical velocity, v(y), can in turn be obtained by continuity:

(9)

The two parameters, dβ/dx and the constant of integration, are determined by the boundary conditions: v(0) = 0 and v(H) = b. Figure 2 shows the calculated vertical velocity profile shapes and the corresponding temperature and enhancement distributions.

Predicted mass-balance histories calculated using these various vertical velocity profile shapes vary by about 10%. All calculations are within the envelope shown in Figure 4a.

Conclusions

A model that accounts for the effect of ice-sheet thickness change on the vertical straining of ice layers predicts an accumulation history from GISP2 layer-thickness data that is different from that predicted assuming constant ice-sheet thickness. Various tests show that the accumulation history is sensitive to other factors including: (1) the shape of the vertical velocity profile which is affected by the temperature and structure of the ice, (2) the change in margin position over time, and (3) the description of ice flow (e.g. Vialov vs Nye models). These tests are summarized in Table 1. Hence, it is not possible to identify a “true” accumulation history for GISP2 with this model, but an envelope of plausible accumulation histories can be defined (Fig. 4a). The upper bound for this envelope is given by the inferred accumulation rates assuming constant ice-sheet thickness. The lower bound is given by the variable-thickness model assuming (a) that ice flows by internal deformation rather than basal sliding, (b) that the ice-sheet margins remain fixed, and (c) that a vertical velocity shape is given by a finite-element calculation (Reference Schott., Waddington and RaymondSchott and others, 1992). Since the most realistic scenario for the Greenland ice sheet involves an increased half-width during glacial periods, and since the inferred accumulation history considering this change in margin position lies near the upper extreme of the envelope, the envelope of most plausible accumulation histories for the Greenland GISP2 site is probably narrower than the envelope shown in Figure 4a by about 10%.

Table 1. Summary of sensitivity tests (all values are approximate)

The inferred accumulation history for the oldest and deepest ice is uncertain for a variety of reasons. Specifically, the accumulation-rate history inferred from deep ice layers is especially sensitive to changes in the vertical strain-rate pattern. This simple theory may not adequately describe the vertical strain rate for deep ice. Also, decreased accuracy of the data for older ice contributes to errors in the inferred accumulation rate. To further constrain the accumulation history near the Greenland summit) the next step would be to compare these results to the accumulation history inferred from the GRIP core, located about 30 km east of GISP2 (Reference Dahl-Jensen, Johnsen, Hammer, Clausen, Jouzel. and PeltierDahl-Jensen and others. 1993). Perhaps such a comparison would yield information about accumulation variability near the Summit region over time and provide clues about past changes in global circulation patterns.