4 DISCUSSION

When the bed is perfectly plastic, the Weertman-type sliding law (Eqn (1)), which is predicated on the assumption of a rough, rigid bed (Weertman, Reference Weertman1957; Kamb, Reference Kamb1970; Nye, Reference Nye1970), does not provide insight into the coupling between basal shear traction and ice flow because the exponent 1/m ≈ 0 (Iverson and others, Reference Iverson, Hooyer and Baker1998). In deriving an alternative basal slip model, we consider an idealized case in which basal slip along a smooth, horizontal bed arises solely from an imbalance between basal shear traction and gravitational driving stress (Figs 7g–i). In areas where basal slip is a significant fraction of the total surface velocity, slip along or within the glacier margins is negligible, and speed varies gradually along flowlines, we can consider ice flow to be controlled primarily by basal shear traction and lateral shearing in the glacier side walls. Sidewall shearing tends to concentrate near glacier margins, because ice is a non-Newtonian viscous fluid, so we further simplify the model by considering only the central trunk of a symmetric glacier, of width 2w, where lateral shearing is locally negligible (e.g. Joughin and others, Reference Joughin, MacAyeal and Tulaczyk2004). Under these assumptions, the normalized basal slip rate ${u'_{\rm b}} = {u_{\rm b}}/{u_{{{\rm b}_{{\rm max}}}}} = {\left[ {1 - {\tau _{\rm b}}/{\tau _{\rm d}}} \right]^n}$ where n is the stress exponent in the constitutive relation for ice and the maximum basal slip rate, ${u_{{{\rm b}_{{\rm max}}}}} = 2A\tau _{\rm d}^n {(w/h)^n}w/(n + 1)$ , corresponds to τ _b = 0 (Raymond, Reference Raymond1996). Maximum basal slip rate is a function of glacier geometry and ice viscosity, parameters that vary over annual or longer timescales, meaning that u′_b captures all of the sub-annual-timescale variability in the idealized model. The dependence of basal slip rate on the stress ratio τ _b/τ _d is consistent with the inferred basal properties discussed above where the stress ratio decreases with increasing basal slip rate, reaching a minimum in the early melt season of τ _b/τ _d ≈ 0.75 (Figs 7g–i). After applying the Mohr-Coulomb criteria (Eqn (2)) by imposing τ _b = τ _y, we can write a single equation for normalized basal slip rate as a function of normalized basal water pressure, p′_w = p _w/(ρgh) (Fig. 8a):

(4) $${u^{\prime}_{\rm b}} = {\left[ {H(\Theta )\Theta} \right]^n};\quad \Theta = 1 - \mu (1 - {\,p^{\prime}_{\rm w}})$$

where μ = f _c /α is the stress factor that represents the ratio of dry (p _w = 0) basal shear traction to gravitational driving stress. Over the timescales of interest, it is reasonable to think of μ as the static stress component and (1 − p′_w) as the dynamic component. That basal slip arises from unbalanced basal shear traction and driving stress requires the basal slip parameter, Θ, to be positive for basal slip to occur. Because basal shear traction can be less than the bed yield stress, we apply H(Θ), the Heavyside step function (H(Θ) = 1 for Θ >0 and H(Θ) = 0 otherwise), in Eqn (4) to ensure u′_b is everywhere non-negative and real for any n. This condition provides some insight as to when certain glaciers accelerate in response to variations in basal water pressure. Setting Θ = 0 (i.e. τ _d = τ _y) yields the critical water pressure;

(5) $$p_{\rm w}^{\ast} = \rho gh\,(1 - {\mu ^{ - 1}}),$$

above which basal slip is non-zero. Only basal water pressure variations above the critical water pressure will lead to glacier flow variability.

Fig. 8. (a) Modeled normalized slip rate as a function of normalized basal water pressure (Eqn (4)) for different values of μ. (b) Inferred wintertime basal water pressure from Figure 6i versus critical water pressure in areas where u _b > 4 cm d⁻¹.

Basal water pressure is equal to critical water pressure whenever gravitational driving stress is equal to the yield stress of the bed. During winter on Hofsjökull, inferred basal shear traction and driving stress are roughly balanced in areas with high basal slip rates (Fig. 7g). Consequently, inferred wintertime basal water pressure (Fig. 6i) and critical water pressure (Eqn (5)) should be approximately equal as well. Indeed we find good agreement between $p_{\rm w}^* $ and wintertime p _w in areas with basal slip rates above 4 cm d⁻¹ (Fig. 8b). This agreement suggests that estimates of annually averaged, effective water pressures for broad spatial areas (several ice thicknesses) can be gleaned from surface slope and thickness measurements on glaciers that are at or near steady state.

For sub-annual water pressure variations, our basal slip model (Eqn (4)) shows that the sensitivity of basal slip rate to changes in mean basal water pressure is given as:

(6) $$\psi = \displaystyle{{\partial {u^{\prime}_{{{\rm b}}}}} \over {\partial {\,p^{\prime}_{{\rm w}}}}} = \mu n{\left[ {H(\Theta )\Theta} \right]^{n - 1}}$$

and scales as the inverse of the ice surface slope. Published values give 0.3 ≤ f _c ≤ 0.5, with  f _c being approximately constant in time (Iverson, Reference Iverson2010), while observed surface slopes vary by up to two orders of magnitude, with minimum values ~ 10⁻³, and may change on multi-annual timescales. Therefore, ice surface slope is the dominant factor in μ at seasonal and shorter timescales. Consequently, for a given f _c, glaciers with gentler surface slopes require higher mean basal water pressures to initiate slip but, once slip has commenced, these glaciers are highly sensitive to subsequent changes in water pressure. This behavior is due to the dependence of basal slip rate on the ratio τ _b/τ _d: for a given ice thickness, glaciers with gentle surface slopes have relatively low gravitational driving stress, τ _d, requiring basal water pressure to approach ice overburden pressure (i.e. for the glacier to approach floatation) for basal slip to commence. Once basal slip is underway, basal slip rates become increasingly sensitive to changes in water pressure as basal slip rates increase (Fig. 8a) because shearing in the glacier sidewalls is a fundamental control on ice flow in our model. A consequence of nonlinearity in ψ is that for a given change in the absolute value of mean basal water pressure (|δp _w|) the amplitude of increases in basal slip rate (|δu _b(δp_w >0)|) will exceed the amplitude of decreases in basal slip rate (i.e. |δu _b(δp_w <0)| <|δu _b(δp_w >0)|). Furthermore, that ψ scales as the inverse of ice surface slope helps explain some of the variable response to meltwater flux on Hofsjökull, where typical surface slopes are <0.2, with a median of 0.06, making 2 ≤ μ ≤ 12 for f _c = 0.4 (Fig. 9).

Fig. 9. Stress factor μ for Hofsjökull calculated assuming f _c  = 0.4 and with surface slopes averaged over ~10 ice thicknesses. Blue contours delineate the bright regions in Figures 6i–p, indicating that basal slip occurs in these areas.

The sensitivity of basal slip rate to changes in basal water pressure can be understood in a Mohr's circle framework (Fig. 10), which considers the relationship between shear stress and effective normal stress (Malvern, Reference Malvern1969). In the idealized model, effective normal stress is equal to effective pressure N, where N = p _i − p _w and p _i = ρgh. For basal slip, we consider the gravitational driving stress and the basal shear tractions, which form the radii of the concentric half-circles labeled D, for driving stress (green), and B, for basal shear traction (red). We delineate the Mohr-Coulomb criteria (Eqn (2)) using the line labeled ‘yield criteria’, which slopes at an angle $\phi = \mathop {\tan} \nolimits^{ - 1} ({f_{\rm c}})$ . The value of τ _d dictates the maximum size of the half-circles because the Mohr-Coulomb criteria, along with the existence of non-zero stresses within the ice, requires B to be smaller than D at all times. Over the timescales of interest, τ _d is constant and τ _b is bounded by the bed yield stress. Thus half-circle D can enter the gray-shaded region but half-circle B cannot and B intersects the yield line at ${p_{\rm w}}\, = \,p_{\rm w}^{\ast} $ .

Fig. 10. Mohr's circle representation of basal shear traction and driving stress, where $\phi = \mathop {\tan} \nolimits^{ - 1} ({f_{\rm c}})$ is the internal friction angle, N = p _i  − p _w is the effective pressure at the bed, assumed equal to the effective normal stress; p _i  = ρgh, the ice overburden pressure; and c ₀ is the till cohesion, assumed negligible in Eqn (2).

The disparity between driving stress and basal shear traction in their response to yielding informs the sensitivity of basal slip rate to changes in basal water pressure. When τ _b < τ _y, both circles have approximately the same radius. Decreasing α reduces τ _d, shrinking half-circle D. If we hold f _c constant, then glaciers with smaller α will have greater freedom to traverse along the x-axis (effective normal stress) without their stress circles intersecting the yield line, meaning that $p_{\rm w}^* $ is large, as expected from Eqn (5). Once the bed beneath a shallow-sloping glacier begins to yield, there is less space between N at yielding and the origin where ${u_{\rm b}}\, = \,{u_{{{\rm b}_{{\rm max}}}}}$ , meaning that ψ must be large. Conversely, increasing α enlarges half-circle D causing the Mohr circles to intersect the yielding criteria at higher values of N (lower $p_{\rm w}^* $ ) than for shallower-sloping glaciers, requiring relatively large subsequent increases in p _w to achieve ${u_{\rm b}}\, = \,{u_{{{\rm b}_{{\rm max}}}}}$ (i.e. ψ is small). We can achieve the same effect by increasing (decreasing) f _c instead of decreasing (increasing) α. Hence the sensitivity of basal slip rate to changes in basal water pressure scales as μ.

Together, spatial variability in μ (Fig. 9) and inferred basal water pressure (Figs 6i–p) more closely represent patterns in seasonal velocity (Figs 2a–c) than either individually. Outlet glaciers on Hofsjökull that show the greatest decrease in speed during the early melt season have the lowest μ values due to steep ice surface slopes. Outlet glaciers that experience nearly complete cessation of the observed acceleration within 10 d have μ<5 (Fig. 9) and show sharp reductions in basal water pressure (Figs 6j–k and n–o). Conversely, outlet glaciers that maintained elevated ice flow between early and mid-June 2012 have relatively high μ values due to gradual surface slopes, except for Illviðrajökull, whose basal hydrological system likely did not become channelized. Glaciers in the southeast quadrant, which have relatively high μ values, sustain increased speeds during the period of observation despite modestly elevated basal water pressures.

These observations indicate that the stress factor, μ, is a useful parameter in establishing a glacier's dynamic response to basal water flux. Glaciers accelerate in response to rapid changes in melting or precipitation so long as basal water pressure exceeds the critical water pressure (Eqn (5)), a function of ice overburden pressure and μ. Initial melt-season accelerations may be ephemeral owing to evolving hydrological systems but diurnal melt cycles and periodic rain events can continue to episodically overwhelm and pressurize the system throughout the melt season. Ice flow responds readily to these continual, short-term water pressure fluctuations (Shepherd and others, Reference Shepherd2009; Schoof, Reference Schoof2010) and this response will be amplified on glaciers with gentle surface slopes. Longer melt seasons, increasing diurnal temperature variations and more frequent rain events (e.g. Schuenemann and Cassano, Reference Schuenemann and Cassano2010) brought on by a warming climate will potentially bolster total melt-season mass flux in gently sloping glaciers, while glaciers with steep surface slopes will be less susceptible to these prolonged cyclical basal water pressure variations. Given the prevalence of till-covered glacier beds, these findings should help reconcile observations of the influence of basal hydrology and surface meltwater flux on glacier flow (Zwally and others, Reference Zwally2002; Joughin and others, Reference Joughin2008; Shepherd and others, Reference Shepherd2009; Bartholomew and others, Reference Bartholomew2010; Moon and others, Reference Moon2014; Tedstone and others, Reference Tedstone2013, Reference Tedstone2015). In particular, it may be useful to classify glaciers by μ to facilitate mechanistically consistent comparisons of the response of different glaciers with surface meltwater flux and enhance our understanding of basal processes.

Our model has some limitations in its immediate applicability to understanding the response of soft-bedded glaciers to surface meltwater flux. The primary limitation is that not all glaciers closely adhere to the idealized assumptions employed in the model derivation. More robust testing with numerical models and further observations on other glacier systems are needed to support the model and lend credence to μ as a viable mechanistic parameter. Another limitation is the need to decouple the dependence of ψ and the evolution of the basal hydrological system on the ice surface slope in observations (e.g. Schoof, Reference Schoof2010). These mechanical and hydrological dependencies work together, with gentler surface slopes potentially resisting channelization of the hydrological system by increasing the critical meltwater flux needed to facilitate the switch from an inefficient distributed system to an efficient channelized system. This resistance to channelization increases the likelihood that an inefficient distributed hydrological system will persist later in the melt season on shallower-sloping glaciers, resulting in higher basal water pressure variability (Schoof, Reference Schoof2010) in a system with higher dynamical sensitivity to such variability (Eqn (6)). Because it may not be possible to know the state of the basal hydrological system during the early melt season, collecting observations aimed at understanding ψ is challenging. In this work, we avoid the complexities of evolving basal hydrological systems by estimating the effective basal water pressure directly from observations of surface velocity and the inferred basal shear traction fields. Our approach isolates the mechanical basal properties from the hydrological properties, providing insight into the mechanics of deformable glacier beds.

Improved understanding of basal mechanics is a key component of the physical foundation on which we can build predictive models to explore a range of plausible future glacier states in a warming climate. One outstanding problem currently prohibiting reliable predictive models is an incomplete understanding of how changes in water flux at the bed of glaciers, arising from surface meltwater flux, transmission of tidal loads (e.g. Thompson and others, Reference Thompson, Simons and Tsai2014) or subglacial lake drainage (e.g. Magnússon and others, Reference Magnússon, Rott, Björnsson and Pálsson2007, Reference Magnússon, Björnsson, Rott and Pálsson2010; Fricker and Scambos, Reference Fricker and Scambos2009), influences multi-annual-timescale ice flow. Solving this problem requires defining the sensitivity of basal slip rate to changes in q _w, the water flux through the basal hydrological system, given as:

(7) $$\displaystyle{{\partial {u_{\rm b}}} \over {\partial {q_{\rm w}}}} = \displaystyle{{\partial {u_{\rm b}}} \over {\partial {\,p_{\rm w}}}}\displaystyle{{\partial {\,p_{\rm w}}} \over {\partial {q_{\rm w}}}}.$$

The second term on the right hand side of Eqn (7) (∂p _w/∂q _w) is a function of the time-varying state of the basal hydrological system and is the subject of numerous studies (e.g. Lliboutry, Reference Lliboutry1968; Röthlisberger, Reference Röthlisberger1972; Nye, Reference Nye1976; Kamb, Reference Kamb1987; Schoof, Reference Schoof2010). With this study, we define the first term on the right hand side of Eqn (7), simply the dimensional form of Eqn (6) in which both sides are multiplied by ${u_{{{\rm b}_{{\rm max}}}}}/(\rho gh)$ , in an idealized framework for glaciers with deformable beds.