Critical-state strength of till

Reference BoultonBoulton and Jones (1979) characterized the steady shear strength of till – its ultimate strength – with the Coulomb failure criterion, as modified by Reference TerzaghiTerzaghi (1943) to include the effect of pore pressure on intergranular friction: τ_u = c + p _etan ϕ, where c is till cohesion, ϕ is the till friction angle and p _e is the effective pressure (pore pressure minus overburden pressure of ice and wet sediment). This characterization of till strength is awkward for those seeking to construct models for either the flow of geometrically simple glaciers by bed deformation or the development of subglacial landforms. Till shear-strain rate and hence glacier flow velocity are indeterminate. Moreover, Coulomb deformation implies that quasi-static stress equilibrium could be readily violated during flow of a glacier resisted only by its deforming till bed. In that case, small uniform increases in either driving stress, τ_d, or pore-water pressure could yield τ_D> τ _u and catastrophic glacier acceleration.

This awkwardness helped inspire power-law flow rules for till of the general form, where is strain rate, τ is shear stress in excess of a specified yield stress (assumed to be zero in some cases), and A and n are constants. A is usually taken to depend inversely on effective pressure (e.g. Reference Boulton and HindmarshBoulton and Hindmarsh, 1987; Reference AlleyAlley, 1989). This viscoplastic rheology for till is convenient for modeling both glacier flow on deformable beds and the development of subglacial landforms.

Critical-state soil behavior (e.g. Reference Schofield and WrothSchofield and Wroth, 1968; Reference WoodWood, 1990) provides a rational starting point for assessing till rheology (Reference ClarkeClarke, 1987b; Reference KambKamb, 1991; Reference Tulaczyk, Kamb and EngelhardtTula-czyk and others, 2000a) and the physical relevance of viscoplastic flow rules. If sheared to a sufficient strain (usually ≪1.0 Reference Lambe and WhitmanLambe and Whitman, 1969) under a particular ambient effective pressure, till will attain a critical state in which porosity and shear resistance remain steady with further strain (Fig. 1). For a particular granular material, this shear resistance – the ultimate strength – can be uniquely determined by knowing either effective pressure or water content, a surrogate for porosity or void ratio if till is water-saturated (e.g. Reference Tulaczyk, Kamb and EngelhardtTulaczyk and others, 2000b; Reference ClarkeClarke, 2005).

Fig. 1. Shear stress, porosity and pore pressure during deformation of tills that are normally consolidated (N-C) and overconsolidated (O-C), with different drainage conditions defined by t _p/t _d, where t _p and t _d are characteristic timescales of pore dilation and porepressure diffusion, respectively.

At lower strains, shear resistance is more complicated. Porosity changes associated with grain rearrangement during shear stimulate changes in internal friction and commonly pore-water pressure that lead to stress-strain behavior dependent on initial porosity (Fig. 1). Thus, if basal till is perturbed by smaller strains than those required of the critical state, such as by propagation of microearthquake waves (Reference Anandakrishnan and AlleyAnandakrishnan and Alley, 1997), flow-law interpretations (e.g. Reference Alley, Maltman, Hubbard and HambreyAlley, 2000) are inherently more difficult. Some rheological models can accommodate both transient deformation and deformation in the critical state. For example, the Disturbed-State model of Reference Sane, Desai, Jenson, Contractor, Carlson and ClarkSane and others (2008) describes the transition from a ‘relative-intact’ state to a ‘fully-adjusted’ state, in which material microstructure reaches a dynamic steady state comparable to the critical state. The model uses a disturbance function that describes the fraction of the till mass that evolves from the intact to the adjusted state as strain accrues. Sane and others (2008; see their Figs 9 and 10) demonstrate that their model, which carries the liability of requiring measurement or estimation of 16 material parameters, can accurately predict till stress- strain behavior up to strains of 0.4, sufficient to be near or at the critical state.

Data from laboratory experiments conducted to comparable or larger strains provide the least uncertain assessment of controls on critical-state till shear resistance (Reference ClarkeClarke, 2005), which is most relevant to large strains expected subglacially (Reference KambKamb, 1991). Despite being conducted with diverse soil-deformation devices (triaxial, ring-shear and double-direct shear), these experiments uniformly indicate that till ultimate strength is highly insensitive to strain rate (Fig. 2a). Ultimate strength, normalized by effective pressure, tends to mildly increase or decrease linearly with the logarithm of strain rate or be essentially independent of it. In cases in which till strengthens with strain rate, fitted values of n are very large (n ˜ 75 (Reference KambKamb, 1991), n <60 (Reference Rathbun, Marone, Alley and AnandakrishnanRathbun and others, 2008)), indicating essentially plastic behavior.

Fig. 2. (a) Till ultimate strength normalized by effective pressure, as a function of shear strain rate, from regressions of laboratory data for seven tills. Shear strain rates from ring-shear experiments were calculated by dividing shear rate by a measured (Reference Iverson, Hooyer and BakerIverson and others, 1998) or estimated (Reference Tika, Vaughan and LemosTika and others, 1996) shear-zone thickness. (b) Till ultimate strength as a function of effective pressure for five of the seven tills in (a). Tests on the Cowden till and Lower Cromer till were conducted at an insufficient number of effective pressures to obtain a relationship.

The need to invoke such large n values, as well as the rate-weakening tendency of some tills, indicates that power- law rules predicated on fluid rheological behavior of till poorly characterize steady-state till deformation. It follows that till effective viscosity cannot be measured or estimated meaningfully, despite efforts to simplify conditions in the laboratory. Therefore, models that invoke till viscosity, either to calculate it from field measurements (see reviews by Reference MurrayMurray, 1997; Reference Cuffey and PatersonCuffey and Paterson, 2010) or to use it as a foundation for hypothesis testing, are of a class criticized as ‘floating models’ (Reference Savage, Herrman, Hovi and LudingSavage, 1998; Reference Iverson, Wilcock and IversonIverson, 2003). Such models are moored to parameters that are not measurable outside the context of the model formulation and hence have uncertain physical relevance.

In contrast, Coulomb behavior, as indicated by a linear dependence of till ultimate strength on effective pressure, is well supported by these same experimental studies (Fig. 2b). Internal friction angles in the critical state are 17-28°. Ultimate strength is roughly two orders of magnitude more sensitive to effective pressure than to strain rate.

Thus, laboratory experiments indicate that Coulomb plasticity is a good idealization for tills (Reference ClarkeClarke, 2005; Reference Cuffey and PatersonCuffey and Paterson, 2010). With the exception of the study of Reference Boulton and HindmarshBoulton and Hindmarsh (1987), for which methodological questions have been raised (Reference Hooke, Hanson, Iverson, Jansson and FischerHooke and others, 1997), field measurements generally reinforce this viewpoint (Reference Hooke, Hanson, Iverson, Jansson and FischerHooke and others, 1997; Reference Truffer, Echelmeyer and HarrisonTruffer and others, 2001; Reference Kavanaugh and ClarkeKavanaugh and Clarke, 2006; Reference TulaczykTulaczyk, 2006). An important implication is that driving stress can exceed the ultimate strength of till if it is weakened sufficiently by high pore-water pressure. Thus, sources of viscous deformation resistance must be active for stable flow of soft-bedded glaciers. In the case of ice streams, their margins (Whillans and Van der Veen 1997; Reference Tulaczyk, Kamb and EngelhardtTulaczyk and others, 2000b; Reference Raymond, Echelmeyer, Whillans and DoakeRaymond and others, 2001), sticky spots (Reference AlleyAlley, 1993; Reference MacAyeal, Bindschadler and ScambosMacAyeal and others, 1995; Reference Stokes, Clark, Lian and TulaczykStokes and others, 2007) and ice shelves (e.g. Reference Price, Bindschadler, Hulbe and BlankenshipPrice and others, 2002) help provide the necessary resistance.

Pseudo-viscous creep?

Although the critical state is the appropriate reference state for characterizing the shear resistance of subglacial till, it will not always be at its critical-state porosity and strength. On the one hand, if bed deformation contributes significantly to glacier flow and sediment transport, till should commonly be deformed sufficiently to attain the relatively small strains required of the critical state. On the other hand, effective pressure is not steady subglacially – even beneath some ice streams with no surface water input to the bed (Reference Engelhardt and KambEngelhardt and Kamb, 1997) – and this variability can result in episodic bed deformation (Reference Blake, Fischer and ClarkeBlake and others, 1994; Reference Iverson and SemmensIverson and others, 1995, Reference Iverson, Baker, Hooke, Hanson and Jansson1999, Reference Iverson2007; Reference Fischer and ClarkeFischer and Clarke, 1997; Reference Truffer and HarrisonTruffer and Harrison, 2006). If, for example, effective pressure increases and then decreases on a till initially at its critical state porosity, the till will consolidate and then swell; swelling, however, will typically be only a small fraction (˜0.2) of consolidation because grain rearrangement during consolidation is largely irreversible (e.g. Reference ClarkeClarke, 1987b, Reference Clarke2005). The till will thus be left less porous than in the critical state and potentially subject to strengthening during the early stages of a subsequent deformation event (Fig. 1). Reference Alley, Maltman, Hubbard and HambreyAlley (2000) and Reference FowlerFowler (2003) argued on that basis that many deformation events could yield time-averaged pseudoviscous behavior. The Reference Sane, Desai, Jenson, Contractor, Carlson and ClarkSane and others (2008) model, with parameters specified appropriately, could also likely yield pseudo-viscous behavior.

A particularly potent transient strengthening mechanism that has been long appreciated (Reference ReynoldsReynolds, 1885) and commonly invoked in fault mechanics (e.g. Reference Segall, Rubin, Bradley and RiceSegall and others, 2010) involves pore-pressure reduction caused by dilation during the early stages of till shear (Reference ClarkeClarke, 1987b; Reference Iverson, Hooyer and BakerIverson and others, 1998). Data from a ring-shear experiment on a water-saturated till in communication with an external water reservoir illustrate the process (Fig. 3) (Reference MooreMoore and Iverson, 2002). A constant shear stress was applied to an overconsolidated till, and effective pressure was incrementally reduced until creep was instigated (minute 8323, Fig. 3). The associated rate of dilation outpaced pore- pressure diffusion into the opening void space, causing an abrupt pore-pressure reduction that reduced rates of shear and dilation with continued shear displacement. As these rates decreased, pore pressure slowly recovered until sufficient to instigate another shear event that was again stabilized by dilation and consequent pore-pressure reduction. A total of ten slip episodes occurred before the till reached its critical-state porosity and hence was unable to dilate further. As a result, shear accelerated, and the till failed catastrophically. In similar experiments on dry till, there were no episodic slip events (Reference MooreMoore, 2002).

Fig. 3. Data from a ring-shear experiment on the Storglaciären basal till illustrating dilatants strengthening. A constant shear stress was applied to the till, and total normal stress was reduced in small increments until the till began to shear. Pore-water pressure was measured at three locations along the till-specimen center line and within the shear zone (17mm thick). Shear resistance was measured and also calculated with the average pore pressure, total normal stress, and Coulomb friction rule. Cohesion was assumed to be negligible, based on past experiments with this till (Reference Iverson, Hooyer and BakerIverson and others, 1998), and friction angle was assumed to decrease linearly with porosity (Reference Lambe and WhitmanLambe and Whitman, 1969) as pores dilated progressively during shear (from Reference MooreMoore and Iverson, 2002). Reproduced from Geology with permission of the Geological Society of America.

These experiments illustrate a transitional state – germane to subglacial tills – between the end-member ‘drained’ and ‘undrained’ states of geotechnical engineering, which correspond to unsealed and sealed laboratory test cells (e.g. Reference ClarkeClarke, 2005). Subglacial tills do not reside in sealed containers but can diffuse pore pressure sufficiently slowly as porosity changes to cause non-hydrostatic pore pressures. The characteristic timescale for pore-pressure diffusion is t _d = H²/D, where D is the hydraulic diffusivity and H is the characteristic diffusion length, equal to the shear-zone thickness. The characteristic timescale for porosity change is t _p = HΔ n/ψU, where Δn is the porosity change required to reach the critical-state porosity during the early stages of shear, ψ is the ratio of shear-zone thickness change to shear displacement, which approaches zero as the critical state is approached, and U is the sliding speed, assuming all basal motion is by bed deformation. If the ratio of these two timescales, t _p/t _d = Δ nD/UψH, is much less than unity, significant pore-pressure reduction during dilation is expected (Fig. 1); t _p/t _d → ∞ and t_p/t_d → 0 correspond to the drained and undrained end-members (Reference Iverson, Reid and LaHusenIverson and others, 1997).

For much of the relevant ranges of till hydraulic diffusivity (10^-9-10^-3 m² s^-1; Reference Cuffey and PatersonCuffey and Paterson, 2010) and sliding speed, dilatant strengthening is expected (Fig. 4). However, this conclusion applies only if till is less porous than in the critical state, owing to consolidation. This consolidation also requires pore-pressure diffusion with the characteristic timescale, t_d . Thus, tills that are least diffusive and hence most susceptible to dilatant strengthening (Fig. 4) are also those that reduce their porosities most slowly in response to an increase in effective pressure. These tills will be least likely to develop a porosity that departs widely from the critical-state value. The implication is that for dilatant strengthening to operate subglacially, periods with till under elevated effective pressure may need to be long (e.g. t _d = 29days for D =10^-7m²s^-1 and H = 0.5m) relative to periods of active shear to induce consolidation sufficient for subsequent dilation during shear. This conclusion is reinforced by the observation that tills that are only weakly overconsolidated dilate insignificantly during shear (Reference Tulaczyk, Kamb and EngelhardtTulaczyk and others, 2000a).

Fig. 4. Values of tp/td plotted as a function of hydraulic diffusivity for various sliding speeds, U, assuming all basal motion is by bed deformation, a shear-zone thickness of 0.5 m, and Δn/ψ = 1. Values of t _p/t _d less than unity (shaded) indicate partially undrained conditions and dilatant strengthening.

Thus, pseudo-viscous response to unsteady deformation is probably the exception, rather than the rule, beneath glaciers. Even if the process does commonly operate, the associated strength variability with shear rate is likely subtle relative to till strength set by the ambient state of effective pressure and its temporal and spatial variations (Reference Alley, Maltman, Hubbard and HambreyAlley, 2000). Spatial gradients in pore-water pressure may be large, given that glacial-sediment permeability (till, outwash sand and gravel) can vary through ˜12 orders of magnitude (Reference Freeze and CherryFreeze and Cherry, 1979). Well-drained zones of anomalously high effective pressure and strength, a candidate for sticky spots (Reference Stokes, Clark, Lian and TulaczykStokes and others, 2007), may be common.

Slick—slip motion: Whillans Ice Stream

Definitive inferences regarding till mechanical properties from large-scale observations of glacier flow are inherently difficult. Shear stresses driving bed deformation are always poorly known due to other sources of drag, including sticky spots and ice margins. In addition, the degree of till continuity at the bed is usually uncertain, with usually little or no knowledge of bed-deformation kinematics.

Some of these problems are minimized beneath the mouth of WIS, where till is thought to be thick and sticky spots rare, and where widening of the ice stream leaves drag exerted by its margins very distant from most of the bed (Reference Bindschadler, King, Alley, Anandakrishnan and PadmanBindschadler and others, 2003). There the ice stream exhibits dramatic stick-slip motion: rapid displacements of ˜0.5 m that occur once or twice a day over periods of <30 min, with intervening long periods of much slower flow (6-18 hours; Reference Winberry, Anandakrishnan, Alley, Bindschadler and KingWinberry and others, 2009). Although GPS data are, to date, insufficient to precisely determine ice speeds during rapid-slip episodes, increases in speed of approximately two orders of magnitude are indicated (Reference Sergienko, MacAyeal and BindschadlerSergienko and others, 2009). Rapid-slip episodes cause far-field seismicity and nucleate at a sticky spot associated with Ice Rise A (Reference Wiens, Anandakrishnan, Winberry and KingWiens and others, 2008). They are driven by accumulation of elastic strain in the ice during slow-slip periods and tidal oscillations of only ˜1 m (Reference Bindschadler, King, Alley, Anandakrishnan and PadmanBindschadler and others, 2003; Reference Sergienko, MacAyeal and BindschadlerSergienko and others, 2009). Shear-stress reductions during rapid slip are ˜0.20-0.35 kPa (Reference Winberry, Anandakrishnan, Alley, Bindschadler and KingWinberry and others, 2009).

This stick-slip motion reveals aspects of the mechanical behavior of the basal till there. The observed extreme sensitivity of slip velocity to small changes in stress indicates that the till does not strengthen with increasing strain rate (Reference Bindschadler, King, Alley, Anandakrishnan and PadmanBindschadler, and others, 2003; Reference TulaczykTulaczyk, 2006). This conclusion agrees with results of laboratory experiments on basal tills, including the till collected upstream from beneath WIS (Fig. 2a), and casts doubt on the contention of Reference HindmarshHindmarsh (1997) that small-scale plastic behavior yields a pseudo-viscous till flow rule at large scales (Reference TulaczykTulaczyk, 2006).

However, to enable stick-slip, two other criteria must be met by the till. As the ice stream transitions from slow to fast sliding, purely plastic till behavior is insufficient. Rather, slip resistance must decrease with increasing slip rate, such that there is so-called rate-weakening (Reference Thomason and IversonThomason and Iverson, 2008; Reference Winberry, Anandakrishnan, Alley, Bindschadler and KingWinberry and others, 2009), sometimes idealized as a decrease from static to dynamic friction (Reference Sergienko, MacAyeal and BindschadlerSergienko and others, 2009). As elastic strain in the loading system – in this case in the ice – is released during rapid slip, rate-weakening must be sufficiently large for slip resistance to decrease more rapidly with displacement than the shear stress applied by the ice (Reference ScholzScholz, 2002). The resultant force imbalance causes slip acceleration. Slip is halted only sometime after the force balance is restored by elastic relaxation of ice. The second criterion for stick-slip is that till strength lost during rapid slip must be recovered during intervening periods. This ‘healing’ is well documented in fault rocks and gouge (Reference MaroneMarone, 1998b), a granular material texturally similar to till. Reference Winberry, Anandakrishnan, Alley, Bindschadler and KingWinberry and others (2009) noted that at WIS the rate of healing (strength increase) must decrease with time to explain relationships between durations of slow-slip periods and amplitudes and signs of tidal forcing (Fig. 5).

Fig. 5. Bed healing during the period following a slip event at WIS (Reference Winberry, Anandakrishnan, Alley, Bindschadler and KingWinberry and others, 2009) compared with (a) that expected from healing of a simulated fault gouge (Reference MaroneMarone, 1998b) and (b) fractional healing of till by pore-pressure dissipation at the surfaces of particles with diameters of 5, 10 and 20 mm, after they have ploughed through the WIS till (D=10^–8m² s^–1). Fractional healing was calculated from the theory of Reference Randolph and WrothRandolph and Wroth (1979), which assumes plane strain adjacent to an expanding cylindrical cavity in an ideally elastic, perfectly plastic soil. A key parameter in their model is the ratio of soil shear modulus to undrained shear strength, assumed herein to be 50, appropriate for soft clay-rich sediment (Reference Randolph and WrothRandolph and Wroth, 1979), such as the WIS till.

Till Continuity

How are soft beds sustained? The time-variation in till thickness, h, at a location on the bed depends on the supply of debris from sediment sources and outflow by sediment transport:

where is the rate of till deposition from ice (negative for entrainment by ice), is the rate of erosion from the underlying rigid bed, and q _b is the flux of till conveyed by bed shear (Reference Cuffey and PatersonCuffey and Paterson, 2010). In addition, a sediment flux, q _w, will be transported by subglacial water. Where a till layer is present, will usually be small, owing to the tendency for zero or small slip velocities at the base of a soft bed that exceeds a few decimeters in thickness. The resulting lack of sediment production will tend to deplete the till layer (Reference Cuffey and AlleyCuffey and Alley, 1996; Reference Alley, Maltman, Hubbard and HambreyAlley, 2000). Assuming negligible deposition from ice, and importantly, negligible fluvial transport, a till bed can be sustained, nevertheless, if the bed upstream is not shielded by till and is eroded at a sufficient rate. Reference Cuffey and PatersonCuffey and Paterson (2010) balanced rates of glacial erosion averaged over drainage basins (0.1-10 mm a^-1; Reference Hallet, Hunter and BogenHallet and others, 1996) with the flux of sediment that could be transported by bed deformation. If a thin deforming layer (0.1 m) was assumed, sediment supplied by erosion balanced that transported by bed deformation for a wide range of till velocity (25-2500 ma^-1) averaged over the deforming-layer thickness.

The elephant in the room is fluvial sediment transport. Reference Alley, Cuffey, Evenson, Strasser, Lawson and LarsonAlley and others (1997) argued persuasively that, owing to large head gradients and fluctuating water discharges, subglacial channels fed by glacier surface water are the most effective of glacial sediment-transport mechanisms. Till layers beneath ice streams without surface water input, such as those of the Siple Coast in Antarctica, are protected from this drainage and likely persist partly for this reason. However, soft beds are also common beneath modern glaciers with ample surface water input during vigorous summer surface melting (e.g. Reference Boulton and HindmarshBoulton and Hindmarsh, 1987; Reference Humphrey, Kamb, Fahnestock and EngelhardtHumphrey and others, 1993; Reference Truffer, Motyka, Harrison, Echelmeyer, Fisk and TulaczykTruffer and others, 1999). Some soft beds may be inherently transient and persist largely because glaciers sometimes override thick layers of preexisting unlithified sediment (e.g. Reference Alley, Maltman, Hubbard and HambreyAlley, 2000). In addition, however, soft beds may slow their own depletion by helping to control the character of the subglacial hydraulic system.

Water may flow beneath soft-bedded glaciers in a thin zone of enhanced permeability at the bed surface (e.g. Reference Stone and ClarkeStone and Clarke, 1993), an irregular water layer at the bed surface with ice spanning the largest till particles (e.g. Reference Creyts and SchoofCreyts and Schoof, 2009), shallow channels cut partly into the till bed (Reference Walder and FowlerWalder and Fowler, 1994; Reference Engelhardt and KambEngelhardt and Kamb, 1997; Reference NgNg, 2000), or some combination of these. Regardless of which of these styles of drainage system predominates, bed shear stresses necessary to drive sediment transport by flowing water will be minimized, due to both small flow depths and small hydraulic potential gradients expected for gently sloping glaciers resting on soft beds (e.g. Reference Walder and FowlerWalder and Fowler, 1994). Soft beds, therefore, tend to suppress deep, rapid subglacial water flows that might otherwise erode them.

The tendency for such drainage systems on soft beds to support low effective pressures (e.g. Reference Walder and FowlerWalder and Fowler, 1994; Reference RempelRempel, 2009) may also help sustain soft beds. As noted, measurements at several glaciers indicate that falling or low effective pressures can weaken the ice-till interface preferentially, thereby focusing motion there rather than deeper in the bed. This process will reduce rates of sediment transport by bed deformation. In addition, low effective pressure reduces the tendency for ice to infiltrate the bed by regelation and thereby erode it. Reference RempelRempel (2008) has recently provided a comprehensive theoretical foundation for this process and finds that depths of regelation infiltration into the bed may be several decimeters to meters, even after accounting for heat production by sliding. Both field observations (Reference IversonIverson and others, 2007) and laboratory experiments (Reference Iverson and SemmensIverson and Semmens, 1995) indicate that this process can operate in sediments with till-like grain-size distributions. Resultant fluxes of dense debris in ice, therefore, could be high. However, predicted infiltration depths decrease with decreasing effective pressure, and for tills there is no infiltration below effective pressures of ˜10kPa (Reference RempelRempel, 2008, 2009). Also, in response to sufficiently rapid basal melting, particles in basal ice will be readily pressed into and hence deposited on a soft bed weakened by low effective pressure (Reference Brown, Hallet and BoothBrown and others, 1987). This lodgment process will not generally occur on a hard bed because such particles, rather than be extruded, remain in ice as basal melting forces ice to flow past them (e.g. Reference HalletHallet, 1979). Low effective pressure in channels also reduces hydraulic gradients in adjacent subglacial till layers, which will inhibit erosion of channel banks by seepage- driven sapping or mass failures.