Introduction

The West Antarctic ice streams originate as a network of moderately fast-flowing (up to about 100 ma– ^₁ ) tributaries (Reference JoughinJoughin and others, 1999). The tributaries follow subglacial valleys, but in most locations their speed is faster than can be explained by internal deformation alone. The enhanced flow may be due to ice sliding over a meltwater-lubricated bed (Reference Hulbe, Joughin, Morse and BindschadlerHulbe and others, 2000; Reference Price, Bindschadler, Hulbe and BlankenshipPrice and others, 2002) or may be due to properties of the ice itself. The second possibility is explored here. It is reasonable to assume that evolution of ice within the tributary system affects the transition from tributary to streaming flow, and thus the behaviour of ice streams as well.

We use an ice-sheet flowline model to simulate flow along two particle paths leading from the slow-flowing interior of the ice sheet to the fast-flowing Ice Stream D (Fig. 1). The model simulates ice-flow regimes and depth variation in the ice-crystal fabric. One trajectory follows the thalweg of Ice Stream D’s main tributary The second trajectory was chosen because it passes by the Byrd Station borehole (about 80° S, 120° W), for which temperature, shear strain rate and ice fabric data are available. Those data are required to constrain our model, which considers the effect of ice fabric anisotropy on the flow of ice. Instead of establishing a new theoretical expression for the constitutive relation (flow law) which includes anisotropy (e.g. Reference LileLile, 1978; Reference Lliboutry and DuvalLliboutry and Duval, 1985; Reference Azuma and Goto-AzumaAzuma and Goto-Azuma, 1996; Reference Gagliardini and MeyssonnierGagliardini and Meyssonnier, 2000), we adopt a simple procedure accounting for anisotropic effect here by modifying Glen’s flow law (Reference GlenGlen, 1955, Reference Glen1958) via an enhancement factor which can be derived directly from the measured shear strain rate and temperature at the borehole (e.g. Reference Russell-Head and BuddRussell-Head and Reference Budd and JackaBudd, 1979; Reference Dahl-JensenDahl-Jensen, 1985; Reference Wang and WarnerWang and others, 2002a).

Fig. 1. The Ross ice stream region of West Antarctica (modified from Reference Hulbe, Wang, Joughin and SiegertHulbe and others, 2003). D1 and D2 trajectories are shown by solid lines. Dashed lines show location of SPRI/TUD/NSF RES surveys. The site of Byrd Station borehole is marked with an asterisk.

Internal layers derived from the Scott Polar Research Institute (SPRI)/Technical University of Denmark (TUD)/U.S. National Science Foundation (NSF) radio-echo sounding (RES) surveys conducted in the interior of West Antarctica (Reference RoseRose, 1978, Reference Rose1979; Reference Siegert, Payne and JoughinSiegert and others, 2003) are used for model verification. RES-detected internal layers, which are primarily caused by the variations of ice density, acidic fallout from volcanic eruptions, impurity concentration associated with climatic transitions and ice crystal orientation, are considered to represent isochrones (Reference HarrisonHarrison, 1973; Reference Fujita and MaeFujita and Mae, 1994; Reference FujitaFujita and others, 1999). Comparison of modelled isochrones with the observed internal layers also allows us to appraise the steadiness of the ice sheet’s flow over time (Reference Wang, Warner and BuddWhillans, 1976;Reference Wang and WarnerWang and others, 2002a).

Ice-Flow Properties At Byrd Station Borehole

The Byrd Station borehole-drilling project reached the bottom of the West Antarctic ice sheet at a vertical depth of 2164m in 1968 (Reference Ueda and GarfieldUeda and Garfield, 1970). Reference Gow and WilliamsonGow and Williamson (1976) review the ensuing borehole and ice-core studies. In a complementary project, Reference Wang, Warner and BuddWhillans (1976, Reference Wang, Zwally, Abdalati and Luo1977, Reference Whillans1979) studied ice flow along the Byrd Station Strain Network (BSSN). Ice flowing through the Byrd Station area eventually enters Ice Stream D. Here, we use the measurements from the borehole and the ice cores to investigate the ice-flow properties at the site and then incorporate that information into a flowline model to simulate the ice flow along two trajectories leading toward Ice Stream D.

The flow law for ice (Glen, 1955,1958) used in this study is expressed in the relation between strain rates (ἑij) and stresses (Ƭij) (Reference WangWang and Warner, 1999),

which is deduced from the relations for shear and compression components,

where the subscripts xz and zz denote horizontal shear and vertical compression, respectively. Ƭ_o represents the octahedral shear stress and is taken as on the assumption of the ice flow corresponding to a confined vertical compression stress combined with a horizontal shear stress. Ƭ' _zz denotes the appropriate component of the deviatoric-stress tensor. The temperature-dependent parameter A_o represents the minimum octahedral creep rate per unit octahedral shear stress for ice with an isotropic crystal fabric. Its value is determined using the results of Reference Budd and JackaBudd and Jacka’s (1989) laboratory experiments and a measured temperature profile from the borehole (Fig. 2a). The shear stress Ƭ_xz is calculated as

Fig. 2. Vertical profiles at Byrd Station borehole. The depth at which the enhancement factor and the shear strain rate start to reduce, 1800 m, is noted with a smaller-font axis label. (a) Temperature: solid line represents the borehole measurements, and dashed line the interpolation over lowest 350 m of the borehole; the basal temperature is –1.6? C, calculated from the overburden pressure and the observed presence of water at the base of the ice (from Reference Robin and RobinRobin, 1983). (b) Horizontal shear strain rate derived from the borehole inclination measurements (from Reference Gundestrup, Dahl-Jensen, Hansen and KeltyGundestrup and others, 1993) (solid line) and the model estimation (dashedline). (c) Calculated enhancement factor using Equation (1) (solid thin line), Equation (5) (thick line) and estimation (dashedline). (d) Schematic drawing representing the major trends in measured crystal sizes and crystal-orientationfabric diagrams (from Reference Herron and LangwayHerron and Langway, 1982).

in which p is ice density, g is the acceleration due to gravity, α is the mean surface slope (taken to be 0.003), and the depth z is measured from the ice-sheet surface positive downwards. The compressive strain rate e_zz is assumed to be constant down to a specified depth (1482 m; Whillans, 1979) and then to decrease linearly to zero at the bedrock (Reference Dansgaard and JohnsenDansgaard and Johnsen, 1969). Using this formulation, the measured strain rate is then used to calculate an enhancement factor E that accounts for the ice anisotropy (Fig. 2b and c, solid lines).

From Equations (2) and (3) it is clear that the single enhancement factor E represents an enhancement of the flow law relating octahedral strain rate to octahedral shear stress, relative to the isotropic case, and it can be compared with a similar quantity extracted from laboratory experiments involving combined shear and compression loads by Li and others (1996),

where A_c is a compression factor defined as

and E_s and E_c are enhancement factors for shear and compression, respectively. E(λ_c) (Fig. 2c, thick line) has been shown to be suitable for enhancement factor calculation. This relation was used in the previous model (Reference WangWang and Warner, 1999).

Shear strain rates were only measured to 1600 m depth in the Byrd borehole and must be estimated below that depth. An analysis of measurements in the Dome Summit South borehole in Law Dome, East Antarctica (Reference Wang and WarnerWang and others, 2002a), shows that the shear strain rates reduce along with the enhancement factor and shear stress near the bottom of the ice sheet. Those changes are accompanied by changes in the ice fabric, from single-maximum to multi-maximum, associated with the increasing crystal size due to ice recrystallization and possible shear stress relaxation near the bedrock. Such changes have been observed in several other Antarctic boreholes (Reference Russell-Head and BuddRussell-Head and Reference Budd and JackaBudd, 1979; Reference D. M.Etheridge, 1989). Considering a similar depth evolution of ice crystal orientation and size at Byrd (Fig. 2d), we expect that at 1800 m depth the enhancement factor and in turn the shear strain rate will start to reduce, as estimated in Figure 2b and c (dashed lines). The relationship between this resulting ice fabric and the stress configuration is discussed below.

Modelling of the Ice Flow Along the Particle Paths

Ice flow along two ice-flow paths leading toward Ice Stream D, the D1 and D2 trajectories in Figure 1, is simulated using a two-dimensional thermomechanical flowline model with the flow law expressed by Equation (1), involving Equations (4– 6). This model incorporated with the ice fabric anisotropy is similar to that described in Reference WangWang and Warner (1999). The two model domains begin in the slow-flowing ice near the ice-sheet flow divide and extend downstream toward the onset of fast ice-stream flow. At the onset, the ice-flow dynamics change, so we terminate the domains just upstream of that transition. A contour-following vertical coordinate system is used and each domain is divided into 100 evenly spaced vertical bands.

Data used to construct the models are discussed by Reference Hulbe, Wang, Joughin and SiegertHulbe and others (2003). In brief, ice-surface elevation and thickness, surface accumulation rate, mean annual surface temperature, and surface velocity are used as model inputs (Fig. 3). A basal temperature gradient of 0.035°Cm– ^₁ is specified (following Reference Hulbe, Joughin, Morse and BindschadlerHulbe and others, 2000) for the calculation of the temperature distributions. RES internal layers observed along flight-lines near the two flow trajectories (Fig. 3a) are used to validate the model. Both surface and bedrock are smoothed, as is appropriate for the shallow-ice approximation used to derive the model equations. The bedrock smoothing compensates for the neglect of variations in longitudinal stresses.

Fig. 3. Model inputs for flowlines D1 (leftpanels) and D2 (right panels): (a) flowline topographies; (b) surface accumulation rates; (c) surface temperatures; and (d) surface velocities. Also shown in (a) are the topographies and internal layers detected from RES measurements along the airborne flight-lines (see Fig. 1).

The downstream speed-up of ice entering the ice stream may be due to ice-crystal fabric development, basal sliding on a meltwater-lubricated bed, or both. We neglect sliding in order to emphasize the effects of ice rheologic properties on flow speed.

The model iterates on the governing equations (see Reference WangWang and Warner, 1999), with the observed surface velocity as a target. Here, we reduce the shear strain rates linearly down to the bedrock once the enhancement factor reaches its maximum value of 10 (Li and others, 1996), in order to match the observed surface velocity. This reduction in the shear strain rates is considered as the combined reduction of enhancement factors (Fig. 2c, dashed line) and probably shear stress (Reference Wang and WarnerWang and others, 2002a). Theresulting vertical variation in E canbe compared with ice fabrics observed in the Byrd Station ice core. Modelled isochrones are compared with the RES internal layers.

Conclusion

The objectives of the present study were to simulate the vertical evolution of ice fabric in order to correctly account for its influence on the flow of ice toward the onset of Ice Stream D and to use the simulation to assess the steadiness of ice-sheet flow in that region over time.

As other applications of the anisotropic model have shown, the ice-crystal fabrics it predicts, using borehole and surface measurements, agree well with corresponding fabrics observed in ice cores. The resulting flow fields, in which vertical variations in the enhancement factor play an important role, can account for the downstream speedup of ice leading to the onset of Ice Stream D. This result is discussed in detail by Reference Hulbe, Wang, Joughin and SiegertHulbe and others (2003). Here, we use comparison between model-predicted isochrones and observed internal layers to further conclude that this flow pattern has been steady since at least the LGM. This result agrees with other studies and supports the emerging viewpoint that the West Antarctic ice sheet has had a relatively thin, fast-flowing configuration over recent millennia (cf. Reference NeresonNereson, 1998; Reference Steig, Alley and BindschadlerSteig and others, 2001).