Climate variability

First of all, the calculation of fractional equilibrium via Eqn (5) assumes a linear climate trend. However, glaciers also integrate year-to-year climate anomalies (e.g. Oerlemans, Reference Oerlemans2001; Roe and Baker, Reference Roe and Baker2014), adding variability to the overall retreat due to anthropogenic warming (Roe and others, Reference Roe, Baker and Herla2017). The glacier state at any given time reflects both the disequilibrium associated with anthropogenic forcing since ~1880 (hereafter, the forced disequilibrium) as well as with these natural fluctuations, and it is important to understand their relative magnitude.

For mass-balance anomalies b′ consistent with white noise (i.e. equal power at all frequencies and no persistence), RB14 derived the standard deviation of length anomalies σ_L as

(9)$$\sigma_L = \beta\tau \cdot \psi( \tau) \cdot \sigma_{\rm b}$$

where σ_b is the standard deviation of b′; $\psi ( \tau ) = \sqrt {[ ( 1-\kappa ) ( 1 + 4\kappa ^2 + \kappa ^4) ] /( 1 + \kappa ) ^5}$; and κ = 1 − Δt/ετ. Here, Δt = 1 year and β, τ and ɛ are defined as above. ψ(τ) simplifies to a more-manageable $\sqrt {3 \Delta t / ( 16 \varepsilon \tau ) }$ for τ ≫ Δt. The salient aspect of ψ(τ) is that it is a decreasing function of τ, here expressing the damping caused by glacier memory. The factors in Eqn (9) show that length variability (σ_L) depends on glacier sensitivity (βτ), the glacier's damping effect (ψ(τ)) and the magnitude of the imposed climate variability (σ_b).

We illustrate these fluctuations with the idealized glaciers in Figure 4. We apply a noisy trend in mass balance of $\dot {b} = 1$ m a⁻¹ century⁻¹, beginning in 1880 (Fig. 4a). We add white-noise anomalies with σ_b = 1 m a⁻¹, consistent with the 59-year record on South Cascade Glacier (Baker and others, Reference Baker2018). The trend thus has a signal-to-noise ratio (SNR) Δb/σ_b ~ 1 after one century of forcing. Recall that b′ (Fig. 4a) reflects the climate forcing alone, which is the input to the model. The glacier-averaged balance (not shown) would include the effect of changing glacier geometry. This levels off as the glacier retreats, but remains negative as long as the climate trend continues because the glacier remains in disequilibrium.

Fig. 4. (a) Synthetic mass-balance forcing, which is a linear trend starting in 1880 (dashed line) plus white-noise anomalies (thin red line). The trend has an SNR_b of ~1 after one century. Bold red shows the 30-year running mean. (b) Length responses to the anomalies in (a) for glaciers with τ = 12 years (orange) and 48 years (blue). Shading correspond to ± 1σ_L bounds around the response to the trend. Dashed lines show equilibrium response (without variability). (c) The ratio of disequilibrium to σ_L in the limit t ≫ τ. The relationship is shown for different choices of SNR_b (solid vs dashed lines). Stars correspond to the glacier states in (b) in 2020. (d) April–September temperature from Rohde and others (Reference Rohde2013) and October–March precipitation from Matsuura and Willmott (Reference Matsuura and Willmott2018) for the northwest Cascades (~121^° W, 48.5^° N), with 30-year running means (bold). (e) Length responses of the idealized glaciers to a mass-balance trend with a 30-year break (inset). Dashed lines show the equilibrium response.

The glacier responses, simulated with the RB14 model, are shown with bold lines in Figure 4b. The shading shows the ± 1σ_L bounds given by Eqn (9). Climate variability makes the ‘instantaneous’ equilibrium L _eq harder to define, but we illustrate it here based on the forced trend (dashed lines). For real glaciers, it can be conceptualized as the long-term mean terminus position, were the external forcing trend to stop.

It is visually clear that the disequilibrium compared to σ_L is different for the fast and slow glaciers, but we can generalize this using the RB14 model. The forced disequilibrium approaches $3\epsilon \tau ^2 \beta \dot {b}$ for t ≫ τ (Eqn (4)), which is a decent approximation for most response times after ~140 years of anthropogenic forcing. Dividing Eqn (4) by Eqn (9) gives the ratio of the long-term forced disequilibrium to the standard deviation of natural terminus variability. The sensitivity βτ cancels, leaving

(10)$${( L' - L'_{\rm eq}) \vert _{t \gg \tau}\over \sigma_L} = {3\epsilon\tau\over \psi( \tau) } {\dot{b}\over \sigma_{\rm b}}.$$

The first ratio on the right-hand side is an increasing function of τ, and $\dot {b}/\sigma _{\rm b}$ is the ratio of the forced change in b to the natural variability (i.e. the SNR per unit time, 1 century⁻¹ here). Figure 4c shows Eqn (10) for fixed $\dot {b}/\sigma _{\rm b}$. The values vary significantly over the range of typical response times. Using the synthetic glaciers as examples, forced disequilibrium equals ~1σ_L and 9σ_L by 2020 (orange and blue stars, respectively). $\dot {b}/\sigma _{\rm b}$ may vary somewhat by glacier, but mass-balance anomalies are generally quite regionally coherent (Pelto, Reference Pelto2006; Huybers and Roe, Reference Huybers and Roe2009). We show a range from 0.5 to 2 century⁻¹ for reference (dotted lines).

The point is that the range of response times in the Cascades includes glaciers where long-term, forced disequilibrium may be obscured by natural fluctuations, as well as glaciers where disequilibrium stands well beyond the noise. This helps put the differences in fractional equilibration (Fig. 3) in a more practical light. One may ask: if climate change paused today, would we notice the additional committed retreat in the coming decades? The answer is a clear yes for multi-decadal response times, but a careful accounting of climate variability would be needed for short response times.

Our calculation of fractional equilibration also assumes that the external forcing is described by a linear trend, but global-mean temperature records show a slowdown in warming roughly from the 1940s to 1970s, and faster warming thereafter (e.g. IPCC, 2013). Local climate is noisier, but data from the Pacific Northwest show similar changes in the rate of warming, and ample precipitation (Fig. 4c). Regardless of the natural vs anthropogenic contributions, the mid-20th century clearly included a period relatively favorable for glacier mass balance in the Cascades (Rasmussen, Reference Rasmussen2009), and several glaciers briefly advanced (e.g. Hubley, Reference Hubley1956; Harper, Reference Harper1993; Pelto and Hedlund, Reference Pelto and Hedlund2001).

It is important to note that variations in decadal trends occur even in uncorrelated white noise (see the running means in Fig. 4a) which can cause glaciers with short memories to advance (Fig. 4b). However, distinct phases of forcing are often invoked heuristically in the literature, and so we consider what this assumption implies for different glaciers. To illustrate the effects on disequilibrium, we apply a forcing broken into two linear trends separated by a constant climate from 1940 to 1970 (Fig. 4d). A 30-year break in forcing is enough time for the glacier with τ = 12 years to nearly equilibrate, while the glacier with τ = 48 years remains far out of equilibrium, and its retreat rate is essentially unchanged. While we are not proposing that a step-wise trend is the optimal model, Figure 4d simply illustrates that τ limits how much glaciers could have adjusted to multi-decadal changes in the rate of forcing.

Uncertainties in current equilibration

Interannual variability and multidecadal changes in the rate of forcing, both of which are relevant to glaciers in the Cascades, imply potential errors in estimates of equilibration from Eqn (5), which is the solution for a linear trend. Uncertainty in τ itself is obviously another source of uncertainty, but is associated with the glacier rather than the forcing. In Figure 5, we use the idealized glaciers to compare these different sources of uncertainty.

Fig. 5. Errors in estimated fractional equilibration (L′/L′_eq) from three different sources. (a) Climate variability drives natural glacier fluctuations, which temporarily drive a glacier toward or away from its long-term equilibrium length. Shaded bounds correspond to L′ ± 1σ_L/L′_eq for glaciers with τ = 12 years (orange) and 48 years (blue). (b) L′/L′_eq for the case with a forcing break from 1940 to 1970. The difference compared to a linear forcing (dotted lines) is significant during the break, but minimal after a few decades of resumed forcing. (c) The spread in L′/L′_eq for a range of $\pm 50\percnt$ in τ. Uncertainty in the response time means persistent uncertainty in fractional equilibration.

First, if we assume L′_eq is described by a linear trend in the long term but allow for a spread in L′ due to interannual variability, the spread in fractional equilibration is (L′ ± σ_L)/L′_eq. Figure 5a shows this spread (shaded bounds), as well as L′/L′_eq for the particular realization of noise in Figs 4a, b. σ_L swamps L′ ± σ_L/L′_eq early on, when L′ and L′_eq are small. As expected from Figure 4, the uncertainty in current fractional equilibration is greater for short response times, because forced disequilibrium can be overwhelmed by natural terminus variations.

Next, Figure 5b compares L′/L′_eq for the trend with a break in forcing (solid lines) vs a linear trend (dashed lines). Fractional equilibration increases more rapidly during the break (L′_eq stops changing), but tends back toward the linear case after a few decades. While the glacier with τ = 12 years nearly equilibrates during the break, it regains its (small) level of forced disequilibrium quickly. The result for both glaciers is that, provided a break in forcing was several decades ago, the effects on current fractional equilibration are small. L′/L′_eq is simply dominated by the total forcing and response since 1880.

Finally, uncertainty in τ leads to a persistent uncertainty in disequilibrium and fractional equilibration (Christian and others, Reference Christian, Koutnik and Roe2018). Available observations (Tables 1 and 2) suggest that for individual glaciers, a substantial uncertainty in τ should be considered. Even for those with direct observations, the ambiguity in defining a ‘characteristic’ thickness implies a conservative range from $\bar {h}$ to h _max, which is often a factor of 2 or more (Table 1). Errors in b _t may be similar without direct observations (especially for small b _t; Table 2). Thus, Figure 5c shows a very broad spread in τ of $\pm 50\percnt$ (i.e. a factor of 3 between upper and lower bounds). In contrast to errors from neglecting short-term fluctuations, uncertainty in τ is more consequential for long response times.

Figure 5 shows three qualitatively different uncertainties associated with our approach to estimating the current fractional equilibration of glaciers in the Cascades. These synthetic examples suggest that simplifying the external forcing to a linear trend is a reasonable approach for estimating the fractional equilibration to the total anthropogenic forcing thus far. The caveat, of course, is that forced disequilibrium simply never emerges far from the noise for glaciers with very short response times (Fig. 4c). For glaciers with longer response times, the more serious issue for estimating disequilibrium with current climate is uncertainty in individual response times.

Runoff changes

Finally, we consider how fast vs slow glacier responses affect their contributions to downstream hydrology, which are important for some drainages in the Cascades, especially in the late summer (e.g. Riedel and Larrabee, Reference Riedel and Larrabee2016). A common expectation is that climate warming causes glacier runoff to increase initially, and later decline as glacier area diminishes, leading to the concept of ‘peak runoff’ in glacierized watersheds (e.g. Jansson and others, Reference Jansson, Hock and Schneider2003). This phenomenon depends fundamentally on transient glacier dynamics. Carnahan and others (Reference Carnahan, Amundson and Hood2019) showed that, over a wide range of parameters, the peak in simulated glacier-melt runoff occurred ~1τ after the onset of a climate trend, using a metric for τ very similar to Eqn (1) (see Harrison and others, Reference Harrison, Elsberg, Echelmeyer and Krimmel2001).

Mountain hydrology also depends on snowpack, precipitation and other local factors, which can affect the timing of peaks in total streamflow. As a local example, Frans and others (Reference Frans, Istanbulluoglu, Lettenmaier, Fountain and Riedel2018) simulated a complex picture of recent and future changes for several glacierized basins in the Pacific Northwest, with runoff trajectories varying substantially by basin. We do not address all of these factors here, but focus on the glacier-melt contribution to runoff. This ignores trends in precipitation (which are much less robust than changes in temperature), and other processes such as refreezing or evapotranspiration. Direct glacier melt is the runoff component most dependent on glacier dynamics, via transient changes in melt area as the glacier advances or retreats. And, in the Cascades, it can play an important role in late summer, when precipitation and snowmelt make minimal contributions (e.g. Riedel and Larrabee, Reference Riedel and Larrabee2016; Frans and others, Reference Frans, Istanbulluoglu, Lettenmaier, Fountain and Riedel2018).

By simply calculating the total melt associated with the glacier's geometry in the RB14 model, we can illustrate differences between the fast and slow glaciers that would be relevant for assessing hydrological contributions from different glaciers in the Cascades. We take the total glacier melt flux M _g (m³ a⁻¹) to be equivalent to the local melt rate m (m a⁻¹), integrated over the glacier's surface area. If we assume a constant width w, this is:

(11)$$M_{\rm g}( t) = w \int_{0}^{x = L( t) } m( x,\; t) \, {\rm d}x$$

where x is the coordinate from the glacier head (x = 0) to terminus (x = L). We assume a linear melt gradient based on a standard temperature-melt factor, lapse rate and glacier slope (see the Appendix), and we also assume that the melt anomaly driven by warming is spatially uniform across the glacier. These assumptions simplify the integral to the mean value between melt at the glacier head and terminus, at any time t. The melt flux is then

(12)$$M_{\rm g}( t) = w L( t) {1\over 2}\left[m( 0,\; t) + m( L( t) ,\; t) \right].$$

Because long-term mass-balance trends and glacier retreat are dominated by warming rather than precipitation trends (e.g. Medwedeff and Roe, Reference Medwedeff and Roe2017), we assume that specific melt anomalies are equivalent to the mass-balance anomalies (b′) that drive glacier retreat in the model. Note that this ignores changes in the proportion of rain in the precipitation on the glacier.

Figure 6a shows melt-flux changes following a trend in mass balance (and therefore specific melt), with L(t) given by the RB14 model for the idealized glaciers. M _g peaks at t ~ τ for both glaciers (peaks are at 15 and 49 years), consistent with Carnahan and others (Reference Carnahan, Amundson and Hood2019). The role of the response time is conceptually straightforward: for long τ, a slower initial retreat means specific melt anomalies can increase more before much melt area is lost, and the peak in M _g is thus later than for short τ. Note that M _g drops steeply after this peak, as area losses become large.

Fig. 6. Melt changes for idealized glaciers forced by a linear warming trend. (a) Top panel shows local melt anomaly, and bottom shows integrated melt (M _g) as the glacier responds. Solid lines show the actual transient melt, and dotted lines show the melt that would occur over the instantaneous equilibrium geometry. The timing and magnitude of peak melt depends on τ. (b) As for (a), but with a break in forcing from 1940 to 1970. A long response time means that a second peak is still affected by earlier warming.

This basic mechanism causing M _g to peak and decline is straightforward at the onset of an idealized trend, but variability in the rate of climate forcing introduces additional transient changes. Figure 6b shows M _g in response to the two-step trend considered earlier, which, again, is an idealized representation of the multidecadal rates of warming in the Pacific Northwest (Figs 4d, e). In this scenario, there are some additional differences between the fast- and slow-responding glaciers. Because the slow glacier (τ = 48 years) remains far from equilibrium during the 30-year break in warming (Fig. 4e), its melt flux during the second stage of warming is compounded by its continued adjustment to earlier warming. In this case, there is no second peak in M _g, because the loss of melt area is dominant and nearly uninterrupted. In contrast, the fast-responding glacier yields two similar peaks to both phases of warming, since it can keep up with multi-decadal variations in forcing.

Finally, the committed retreat associated with glacier-length disequilibrium (e.g. Fig. 3d) means a committed loss of ablation area and thus of melt contributions to runoff. The dashed lines in Figure 6 show the melt flux that would occur integrated over the equilibrium glacier length, illustrating the total committed change as the forcing evolves.

It should be noted that multiple runoff metrics exist (e.g. O'Neel, Reference O'Neel, Hood, Arendt and Sass2014), and the timing and magnitude of peaks depend on the metric chosen. For instance, total runoff from a fixed basin area peaks later than that from the evolving glacier surface (e.g. Carnahan and others, Reference Carnahan, Amundson and Hood2019; Rounce and others, Reference Rounce, Hock and Shean2020). The most appropriate metric depends on the question at hand, and obviously other variables are important for overall basin hydrology. However, the glacier melt contribution (M _g) is useful to analyze on its own as well, since it directly tracks the evolving area of glacier ice that provides runoff once seasonal snowpack has waned. It is also at these times when the committed retreat of slow-responding glaciers is most consequential for committed hydrological changes.