Key features of the data

High elevation samples at Dry Valleys sites are consistent with steady surface erosion and production-decay-erosion equilibrium. At higher elevation sites at both Mount DeWitt (above 1900 m) and East Groin (above 1400 m), apparent exposure ages vary between different nuclides, but apparent erosion rates are indistinguishable (Fig. 8). In other words, concentrations of all three nuclides in these samples are not consistent with the hypothesis that these surfaces have experienced a single period of exposure at zero erosion, but they are consistent with the hypothesis that the surfaces have been eroding steadily for a long enough time that nuclide concentrations have reached an equilibrium between production and loss by radioactive decay and surface erosion. As evident from Figs 9, 10 & 11, this is equivalent to observing that these samples lie on the steady erosion line with respect to all three nuclide pairs. Thus, the simplest explanation for these results is that these surfaces have been experiencing steady erosion at 0.5–1.5 m Ma^-1 for a long time. How long a period of steady erosion is implied? The rate at which surface nuclide concentrations approach equilibrium with steady erosion depends on both the erosion rate and the decay constant of the nuclide in question. An effective half-life for equilibration with steady erosion is given by -1n (1/2)/(λ _i + ε/Λ), where λ _i is the decay constant for nuclide i (a ^-1), ε is the erosion rate (g cm^-2 a ^-1), and Λ is the effective attenuation length for spallogenic production (here taken to be 160 g cm^-2). These effective half-lives are 0.2–1 Ma for this range of erosion rates and nuclides, thus 1–4 Ma would be required to reach 95% of the equilibrium value. Therefore, there is no evidence that any of these sites were covered by ice during the past 1–4 Ma. The strength of this constraint is discussed later.

Low elevation samples at Dry Valleys sites require periods of ice cover. Low elevation sites at Mount DeWitt (one site at 1878 m) and East Groin (four sites between 1314–1382 m) show neither apparent exposure ages nor apparent erosion rates that are concordant between nuclides (Fig. 8). In other words, nuclide concentrations are neither consistent with continuous surface exposure at zero erosion nor with steady erosion. These samples lie outside the continuous exposure field on all three two-nuclide diagrams, in the region of intermittent exposure (Figs 9, 10 & 11). Thus, these sites have experienced at least one period of ice cover during their exposure history.

High elevation samples at the Quartz Hills display production-erosion equilibrium for ²⁶Al and ¹⁰Be, but not for ²¹Ne. At all sites in the Quartz Hills, apparent exposure ages differ significantly between all three nuclides, indicating that these sites have not experienced continuous surface exposure at zero erosion. However, apparent erosion rates derived from ²⁶Al and ¹⁰Be are i) indistinguishable from each other and ii) significantly different from the apparent ²¹Ne erosion rate. This is most simply explained if these surfaces have been continuously exposed and subject to steady erosion for a sufficient length of time that ²⁶Al and ¹⁰Be concentrations have reached equilibrium with steady erosion, but ²¹Ne concentrations have not. This is also evident on the two-nuclide diagrams: nuclide concentrations in these samples lie on the steady erosion line in the ²⁶Al-¹⁰Be diagram, but lie between the simple exposure and steady erosion lines in ²⁶Al-²¹Ne and ¹⁰Be-²¹Ne diagrams. At the erosion rates implied by the ²⁶Al and ¹⁰Be concentrations (c. 0.1 m Ma ^-1) the effective half-lives for ²⁶Al and ¹⁰Be equilibration with steady erosion are 0.6 Ma and 1 Ma, respectively. Therefore, 3–4 Ma is required for ²⁶Al and ¹⁰Be concentrations to become indistinguishable from erosional steady state. However, erosion rates of these surfaces are low enough that a significant fraction of loss of ²⁶Al and ¹⁰Be from the surface is the result of radioactive decay, not erosion. Since ²¹Ne is stable, it can only be lost by erosion, thus the effective half-life for ²¹Ne equilibration with steady erosion at the erosion rate implied by the ²⁶Al and ¹⁰Be concentrations is 4 Ma, much longer than for ²⁶Al or ¹⁰Be. Thus, c. 15–20 Ma would be required before ²¹Ne concentrations were indistinguishable from production-erosion equilibrium. In other words, the ²¹Ne concentrations retain a memory of the time these sites were first exposed, but ²⁶Al and ¹⁰Be concentrations do not. If we assume a single period of continuous surface exposure at a steady erosion rate, with negligible production by muons, we can estimate both the exposure age and erosion rate of these samples by solving the (overdetermined) system of equations:

(1) $$N_{{26}} ={{P_{{26}} } \over {\lambda _{{26}} {\plus}{{\varepsilon} \over \Lambda }}}\left( {1{\minus}\exp \left[ {{\minus}\left( {\lambda _{{26}} {\plus}{{\varepsilon} \over \Lambda }} \right)t} \right]} \right)$$

(2) $$N_{{10}} ={{P_{{10}} } \over {\lambda _{{10}} {\plus}{{\varepsilon} \over \Lambda }}}\left( {1{\minus}\exp \left[ {{\minus}\left( {\lambda _{{10}} {\plus}{{\varepsilon} \over \Lambda }} \right)t} \right]} \right)$$

(3) $$N_{{21}} ={{P_{{26}} \Lambda } \over {\varepsilon}}\left( {1{\minus}\exp \left[ {{\minus}\left( {{{\varepsilon} \over \Lambda }} \right)t} \right]} \right)$$

for the erosion rate ε (g cm^-2 a ^-1) and the exposure time t (a), where N _i is the concentration (atoms g ^-1) and P _i is the surface production rate (atoms g ^-1 a ^-1) of nuclide i. Because, as described above, stratigraphic and geomorphic evidence shows that these sites were covered by ice at least once, these assumptions imply that the duration of ice cover was short relative to the total duration of exposure.

The system of equations was solved for each sample using the non-linear least squares algorithm in MATLAB, and uncertainties estimated via a 200-iteration Monte Carlo simulation (Fig. 12). The results indicate that nuclide concentrations at all sites can be explained if these surfaces were originally exposed between 4–6 Ma (with nominal 68% confidence bounds on each age estimate of±0.25–0.4 Ma; see Fig. 12), and have been eroding at 3–12 cm Ma ^-1 since that time (given rock density of 2.7 g cm^-3). Surface exposure ages computed in this way are consistent with apparent exposure ages>4 Ma on boulders from Reedy E drift (Bromley et al. Reference Bromley, Hall, Stone, Conway and Todd2010), and thus with a scenario in which initial exposure of bedrock surfaces at this site was coincident with emplacement of the Reedy E drift.

Fig. 12 Upper panel, exposure ages and erosion rates calculated by solving the system of Eqs (1)–(3) for samples at the Quartz Hills. The dots are the result of a 200-point Monte Carlo simulation including measurement uncertainty only. The middle and lower panels show sections of ²⁶Al-²¹Ne and ¹⁰Be-²¹Ne two-nuclide diagrams from Figs 10 & 11, respectively, with isolines for 4 and 6 Ma exposure duration (at a range of erosion rates) added to the continuous exposure region. This provides similar information as the upper panel by showing that all the data are consistent within measurement uncertainty with this range of exposure ages.

The Monte Carlo uncertainty analysis shows that exposure ages estimated in this way scatter more than expected from measurement uncertainty alone (χ²=48 for 6 degrees of freedom). This is probably due to two factors: first, the assumption of continuous exposure at a steady erosion rate is an oversimplification; a time-varying erosion rate or periods of cover by till could cause this assumption to fail. Second, we have disregarded stratigraphic evidence showing that these sites were, in fact, covered by ice for at least a short time. As noted by Mukhopadhyay et al. (Reference Mukhopadhyay, Ackert, Pope, Pollard and DeConto2012) and others, one can easily construct exposure histories that include short periods of ice cover but yield nuclide concentrations that could be the result of continuous surface exposure. However, the fact that ice cover is not required to explain the observed nuclide concentrations shows that the duration of ice cover at these sites was short relative to their total exposure history. ‘Short’ in this context means thousands to tens of thousands of years; order 1–2% of the total exposure history. Furthermore, because of the geometric requirement that if higher elevation sites are covered by ice then lower elevation sites must also be covered, the fact that there is no relationship between site elevation and exposure age or erosion rate computed in this way is not consistent with a significant duration of ice cover as a source for the scatter in inferred exposure ages. To summarize, despite geomorphic evidence that all sites were covered by ice at least once in the past, the simplest explanation for the observed nuclide concentrations is that these surfaces were first exposed 4–6 Ma and have been eroding at 3–10 cm Ma ^-1 since that time, with periods of ice cover restricted to a total duration of thousands to tens of thousands of years.

Finally, it is worth noting that these are extraordinarily low erosion rates by global standards. In fact, disregarding ice cover in estimating exposure ages and erosion rates from Eqs (1)–(3) leads to overestimation of erosion rates, thus these are maximum limiting erosion rates under any assumptions.

Constraints on ice cover history

Samples that display nuclide concentrations that are not in equilibrium with continuous surface exposure at any erosion rate must have been covered by ice for a significant fraction of their history. On the other hand, nuclide concentrations that are consistent with simple exposure do not completely exclude any ice cover of the site in the past. If episodes of ice cover were short relative to the total exposure history or if ice cover took place long enough ago that the majority of the present nuclide inventory was produced after ice cover ended, then nuclide concentrations would not be perturbed enough to be detectable. Our dataset must reflect one or both of these situations, because many samples are from sites where geological evidence requires ice cover at some time in the past, but have nuclide concentrations consistent with continuous surface exposure. This includes samples from between 1920 and 2040 m elevation at Mount DeWitt, all samples from the Quartz Hills, and samples from above 1400 m at East Groin. For one thing, this is important because it highlights the fact that nuclide concentrations that show consistency with continuous surface exposure cannot be used to prove that sample sites were never covered by ice. A few thousand years of ice cover at the LGM, for example, would not detectably perturb ²⁶Al and ¹⁰Be concentrations in bedrock surfaces that already had a long exposure history. To explore this issue further we have to address two questions: first, for the samples that have ²⁶Al, ¹⁰Be and ²¹Ne concentrations consistent with simple exposure but geological evidence for ice cover, what limits can be placed on the timing and duration of past ice cover? Second, for the samples that have nuclide concentrations requiring significant ice cover, what sort of ice cover histories are consistent with the nuclide concentrations? As discussed by Bierman et al. (Reference Bierman, Marsella, Patterson, Davis and Caffee1999) and many others subsequently, these questions do not have unique answers. As the nuclide concentrations reflect the total integrated exposure and burial of the surfaces, many ice cover histories that differ in the number, duration and time of burial and exposure periods can yield the same nuclide concentrations. Thus, we will use the approach of proposing simple scenarios of ice sheet change and exploring under what conditions they are compatible with the observed nuclide concentrations.

Samples from between 1920 and 2040 m elevation at Mount DeWitt, all samples from the Quartz Hills and samples from above 1400 m at East Groin have nuclide concentrations that can be explained by continuous surface exposure. However, geological evidence shows that these sites were covered by ice at some point. Therefore, how long could these sites have been covered by ice without causing nuclide concentrations to be detectably out of equilibrium with continuous surface exposure? Because radioactive decay and surface erosion tend to efface evidence of past ice cover, the longer ago the period of burial, the longer the duration of burial can be and still satisfy this condition.

To explore this question, we will assume the following. First, the rock surface at a sample site has been steadily eroding at an erosion rate ε (g cm^-2 a ^-1) for a sufficient time for the nuclide concentrations to reach production-decay-erosion equilibrium. At this point, nuclide concentrations are as follows:

(4) $$N_{{26,eq}} ={{P_{{26}} } \over {\lambda _{{26}} {\plus}{{\varepsilon} \over \Lambda }}}$$

(5) $$N_{{10,eq}} ={{P_{{10}} } \over {\lambda _{{10}} {\plus}{{\varepsilon} \over \Lambda }}}$$

(6) $$N_{{21,eq}} ={{P_{{21,sp}} \Lambda } \over {\varepsilon}}{\plus}{{P_{{21,{\rm \mu }{\minus}}} \Lambda _{{{\rm \mu }{\minus}}} } \over {\varepsilon}}{\plus}{{P_{{21,{\rm \mu }fast}} \Lambda _{{{\rm \mu }fast}} } \over {\varepsilon}}.$$

Although we consider only spallogenic production for ²⁶Al and ¹⁰Be, we separately consider production by muons for ²¹Ne. This is because at low erosion rates, muon-produced ¹⁰Be and ²⁶Al produced at depth is mostly lost to radioactive decay by the time it gets to the surface, thus ²⁶Al and ¹⁰Be produced by muons is negligible by comparison with that due to spallation. This is not necessarily the case for a stable nuclide (see Balco & Shuster Reference Balco and Shuster2009a). Thus, P _21,sp , P _{21,μ -} , and P _{21,μ fast} are surface production rates (atoms g ^-1 yr ^-1) of ²¹Ne by spallation, negative muon capture and fast muon interactions, respectively. For this purpose we approximate the depth dependence of muon production by a simple exponential relationship and define Λ _μ- (1510 g cm^-2) and Λ _μfast (4360 g cm^-2) to be effective attenuation lengths for negative muon capture and fast muon interactions (Heisinger et al. Reference Heisinger, Lal, Jull, Kubik, Ivy-Ochs, Knie and Nolte2002a, Reference Heisinger, Lal, Jull, Kubik, Ivy-Ochs, Neumaier, Knie, Lazarev and Nolte2002b). The sample is covered by ice at a time t ₀ (years before present) and remains covered for a duration t _b (years) (see Fig. 13). It is then exposed again and continues to erode at a rate ε until the present time. With these conditions the nuclide concentrations observed at the present time are:

(7) $$\eqalignno{N_{{26}} =N_{{26,eq}} {\rm exp} \left[{{{\minus}\lambda _{{26}} t_{{0_ }} }}\plus {{{{{\minus}{\varepsilon}(t_{0} {\minus}t_{b} )} \over \Lambda }}}\right] \cr\quad{\plus}{{P_{{26}} } \over {\lambda _{{26}} {\plus}{{\varepsilon} \over \Lambda }}}\left[ {{{1{\minus} \rm exp}} \left({\minus}\left[ {\lambda _{{26}} {\plus}{{\varepsilon} \over \Lambda }} \right][t_{0} {\minus}t_{b} ] \right)} \right]$$

(8) $$\eqalignno{N_{{10}} =N_{{10,eq}} {\rm exp} \left[{{{\minus}\lambda _{{10}} t_{{0_}} }}\plus {{{{{\minus}{\varepsilon}(t_{0} {\minus}t_{b} )} \over \Lambda }}}\right] \cr\quad{\plus}{{P_{{10}} } \over {\lambda _{{10}} {\plus}{{\varepsilon} \over \Lambda }}}\left[ {{{1{\minus} \rm exp}} \left({\minus}\left[ {\lambda _{{10}} {\plus}{{\varepsilon} \over \Lambda }} \right][t_{0} {\minus}t_{b} ] \right)} \right]$$

(9) $$N_{{21}} =N_{{21,eq}}$$

Given typical measurement precision for these nuclides of 3%, we now assume that disequilibrium with continuous surface exposure would be detectable if the observed ratio of two nuclides was 3% lower than the equilibrium ratio. For a particular value of ε, we ask what combinations of t ₀ and t _b would satisfy this condition, i.e. be detectable at the present time? For the ¹⁰Be-²¹Ne nuclide pair, for example, this is the same as specifying a value of ε and finding the set of (t ₀,t _b ) pairs that satisfy N ₁₀ N _21,eq /N _10,eq N ₂₁=0.97. This nuclide pair is the slowest to return to its production-decay-erosion equilibrium after a period of burial; therefore, it gives the strongest constraints on the duration of past periods of ice cover.

The results of this exercise are shown in Fig. 13. It is important to note that a minimum of 60 000 years of continuous ice cover is required for the ¹⁰Be/²¹Ne ratio to decrease by 3% from the initial equilibrium ratio (the corresponding figures for ²⁶Al/¹⁰Be and ²⁶Al/²¹Ne are 60 000 and 30 000 years, respectively). Thus, a single period of ice cover shorter than this value would not be detectable under this criterion. Again, this highlights that nuclide concentrations that are not measurably out of equilibrium with continuous exposure may not be used to prove that a rock surface has never been covered by ice. Further, these results show that when the erosion rate is relatively high, e.g. 1 m Ma ^-1, the observation of two-nuclide equilibrium is not very restrictive; only a relatively short time is required for nuclide concentrations to return to near-equilibrium values. For example, samples at higher elevations at Mount DeWitt and East Groin, where concentrations of all three nuclides are in equilibrium with steady erosion, indicate surface erosion rates of 0.5–1.5 m Ma ^-1. At these erosion rates, the observation of equilibrium nuclide concentrations can exclude long periods of ice cover only in the past 1–2 Ma (Fig. 13). Even very long episodes of glacier thickening prior to that time would not be detectable. At the Quartz Hills, as discussed in the previous section, higher nuclide concentrations probably imply lower erosion rates of 5–10 cm Ma ^-1. Because erosion rates are lower, these sites can potentially record disequilibrium induced by long periods of ice cover for a much longer time; an episode of ice cover sustained for c. 0.1 Ma could potentially be detectable after c. 1 Ma. Thus, the Quartz Hills sites provide strong evidence that, despite clear geological evidence for occasional thickening of Reedy Glacier, these episodes were rare and short-lived during the Pleistocene.

Fig. 13 An attempt to answer the question, ‘if a nuclide pair displays equilibrium with steady erosion at present, what constraint does that observation place on the timing and duration of past periods of ice cover?’ The upper panel shows the scenario envisioned in Eqs (4)–(9): the ratio of two nuclides (shown as the ratio of the shorter- to longer-lived nuclide) begins at a value in equilibrium with steady erosion. When the sample is buried and erosion ceases, the ratio diverges from the equilibrium ratio due to radioactive decay. When it is uncovered again and erosion resumes, the ratio recovers to the equilibrium ratio at a rate that depends on the erosion rate and the half-lives of the nuclides. The length of time (t _0.97) is how long it takes to return to 97% of the equilibrium ratio, assumed to be indistinguishable from the equilibrium ratio given typical measurement uncertainties. Thus, at time t _0.97, the period of burial would cease to be detectable. The lower panel shows the constraints implied by this scenario on the timing and duration of burial of a sample that is observed to have a ¹⁰Be/²¹Ne ratio indistinguishable from the equilibrium ratio for a given erosion rate. For example, a sample exhibiting ¹⁰Be-²¹Ne concentrations in equilibrium with 0.5 m Ma ^-1 erosion means that a period of ice cover ending 2 Ma can have been no longer than 1 Ma. When erosion rates are relatively high (1.5 m Ma ^-1) constraints on past ice cover are relatively weak: for example, it only takes c. 1 Ma for the ¹⁰Be-²¹Ne system to forget about any duration of past burial. Sites with lower erosion rates provide stronger constraints.

Low elevation samples at East Groin and Mount DeWitt have nuclide concentrations that cannot be explained by continuous surface exposure and thus require episodes of ice cover. These samples have probably experienced numerous periods of alternating surface exposure and burial beneath cold-based ice, such that the total duration of ice cover makes up a significant fraction of their total exposure history. For the East Groin sample sites, this is implied by moraines and glacial drift at many nearby sites adjacent to the Taylor Glacier that record glacier thickening and thinning, probably on a 100 000-year glacial-interglacial cycle (e.g. Brook & Kurz Reference Brook and Kurz1993, Higgins et al. Reference Higgins, Hendy and Denton2000). Presumably, such cyclical glacier changes occurred during much of the Pleistocene and perhaps Pliocene. A straightforward way to evaluate whether a scenario of periodic, glacial-interglacial ice sheet change is consistent with our measurements is to hypothesize that surface nuclide concentrations have reached a dynamic steady state such that nuclide production during ice-free periods is balanced by nuclide loss by radioactive decay and surface erosion during ice-free periods; i.e. surface nuclide concentrations vary cyclically, but always return to the same value at the same point in a glacial-interglacial cycle. Given this hypothesis, as well as the assumptions that: i) each glacial-interglacial cycle can be characterized by a constant cycle duration (t _c, here assumed to be 100 000 years) and a fraction of that period (f _b , dimensionless) during which the surface is ice-covered and ii) there is no subglacial erosion, nuclide concentrations at the beginning of a glacial period are given by:

(10) $$N_{{26}} ={{P_{{26}} } \over {\lambda _{{26}} {\plus}{{\varepsilon} \over \Lambda }}}{{\left( {1{\minus}\exp \left[ {{\minus}t_{c} (1{\minus}f_{b} )\left( {\lambda _{{26}} {\plus}{{\varepsilon} \over \Lambda }} \right)} \right]} \right)} \over {\left( {1{\minus}\exp \left[ {{\minus}t_{c} \lambda _{{26}} } \right]\exp \left[ {{\minus}{{{\varepsilon}t_{c} (1{\minus}f_{b} )} \over \Lambda }} \right]} \right)}}$$

(11) $$N_{{10}} ={{P_{{10}} } \over {\lambda _{{10}} {\plus}{{\varepsilon} \over \Lambda }}}{{\left( {1{\minus}\exp \left[ {{\minus}t_{c} (1{\minus}f_{b} )\left( {\lambda _{{10}} {\plus}{{\varepsilon} \over \Lambda }} \right)} \right]} \right)} \over {\left( {1{\minus}\exp \left[ {{\minus}t_{c} \lambda _{{10}} } \right]\exp \left[ {{\minus}{{{\varepsilon}t_{c} (1{\minus}f_{b} )} \over \Lambda }} \right]} \right)}}$$

(12) $$N_{{21}} ={{P_{{21,sp}} \Lambda } \over {\varepsilon}}{\plus}{{P_{{21,{\rm \mu }{\minus}}} \Lambda _{{{\rm \mu }{\minus}}} } \over {\varepsilon}}{\plus}{{P_{{21,{\rm \mu }fast}} \Lambda _{{{\rm \mu }fast}} } \over {\varepsilon}}.$$

It is necessary to consider, at least approximately, production by muons for ²¹Ne but not for the radionuclides. Note that we compute the equilibrium nuclide concentration for the beginning of a glacial period, to be consistent with the idea that Taylor Glacier thickens during interglacials (Higgins et al. Reference Higgins, Hendy and Denton2000). For each pair of nuclides, the corresponding pairs of equations can be solved for values of the surface erosion rate during ice-free periods ε (g cm² a ^-1) and the fraction of each glacial cycle spent covered by ice f _b . Of course, it would also be possible to search for values of these two parameters that best fit all three nuclide concentrations simultaneously. However, that would discard information regarding changes in the extent of glaciation over time that can potentially be gained by considering the nuclide pairs separately.

Equations (10)–(12) were solved for samples at Mount DeWitt and East Groin using the non-linear least squares algorithm in MATLAB, and used a linear error propagation approximation with numerical partial differentiation to estimate the uncertainties in inferred values of f _b attributable to measurement uncertainty in nuclide concentrations. The results are shown in Fig. 14. For samples whose nuclide concentrations are in equilibrium with continuous surface exposure (i.e. they plot in the region of continuous exposure on Figs 9, 10 & 11) solving these equations must yield f _b =0 within measurement uncertainty for all nuclide pairs. As discussed above, this is the case for all but the lowest sample at Mount DeWitt and for samples from above 1400 m at East Groin. If the scenario implied by Eqs (10)–(12) is correct, f _b must be greater for samples at lower elevations because the ice sheet cannot advance over higher sites without also covering the lower sites. This is the case at both Mount DeWitt and East Groin. At Mount DeWitt this calculation implies that the lowest site was ice-covered for c. 20–40% of each glacial-interglacial cycle, but the adjacent site 50 m higher was almost never covered by ice. At East Groin, f _b values computed from each nuclide pair are similar among closely spaced samples and, as expected, higher at lower elevations. The lowest two sites (near 1320 m) at East Groin were covered by ice for c. 50% of each cycle, and the two next highest sites (near 1390 m) were covered by ice 5–40% of the time. Thus, our observations at Mount DeWitt and East Groin are consistent with the hypothesis that the observed nuclide concentrations in low elevation samples reflect an equilibrium between production during ice-free periods and loss by radioactive decay and surface erosion during interglaciations under a scenario of repeated, periodic glacial-interglacial cycles spanning the Pleistocene.

Fig. 14 Variation with elevation of the fraction f _b of each glacial cycle during which each sample site is covered by ice inferred by solving the relevant pairs of Eqs (4)–(6), for sites at Mount DeWitt and East Groin. The results from different nuclide pairs from the same sample have been slightly displaced vertically to improve readability. The error bars reflect 68% confidence intervals given measurement uncertainty only and are estimated by numerical partial differentiation and adding in quadrature. Where ice cover is never permitted by a particular nuclide pair for a particular sample no error bar is shown.

For the lowest four samples at East Groin and the lowest sample at Mount DeWitt, values of f _b obtained by solving Eqs (10)–(12) vary systematically among nuclide pairs: ²⁶Al-¹⁰Be pairs imply higher values of f _b than ²⁶Al-²¹Ne and ¹⁰Be-²¹Ne pairs. A possible explanation for this relies on the fact that nuclides with shorter half-lives reach equilibrium with a periodic exposure-burial history more rapidly. Therefore, the systematic offset among values of f _b inferred from the various nuclide pairs would be due to the fact that sites were, on average, less commonly covered by ice during the longer time period ‘remembered’ by the ²⁶Al-²¹Ne and ¹⁰Be-²¹Ne pairs than during the shorter time period recorded by the ²⁶Al-¹⁰Be pair. In other words, this explanation would imply an overall increase in the frequency and/or duration of periods of ice cover in the past several million years. For example, the sample at 1314 m at East Groin has values of f _b of 0.67, 0.6 and 0.5 inferred from the ²⁶Al-¹⁰Be, ²⁶Al-²¹Ne and ¹⁰Be-²¹Ne pairs, respectively. One can reproduce this result by assuming that: i) the bedrock surface eroded at 0.5 m Ma^-1 when it was ice free, and did not erode when it was ice-covered, ii) at 2.5 Ma, nuclide concentrations had reached equilibrium (as defined by Eqs (10)–(12)) with repeated glacial-interglacial cycles consisting of 10 000 years of ice cover and 90 000 years of exposure, and iii) between 2.5 Ma and the present, the relative duration of ice cover gradually increased so that the most recent cycle consisted of 80 000 years of ice cover and 20 000 years of exposure. Although this is only one of many possible ice cover scenarios that would explain these observations, the idea that we infer lower values of f _b from nuclide pairs that take longer to equilibrate is in general agreement with the idea that ice volume changes had higher amplitude in the late Pleistocene than in the early Pleistocene or Pliocene.