Sample collection and analysis

Glaciers 2–20 were all sampled over 5 d between 1 and 7 August 2013. One sample per glacier was obtained by submerging a 250 mL Nalgene bottle in the proglacial stream within 50 m of the glacier terminus. The effect of stream sampling location is discussed below. Dilution gauging was carried out at each site with a slug injection of salt following the methods of Moore (Reference Moore2004). The conductivity response of the salt injection was measured 50–100 m downstream, and the discharge calculated from the dispersal characteristics of the conductivity plume, as more thoroughly described in Crompton and others (Reference Crompton, Flowers, Kirste, Hagedorn and Sharp2015). Suspended sediment concentrations were measured separately on the filtrate of vacuum pumped samples.

All samples were analyzed by laser diffraction through a Malvern Mastersizer 2000 particle size analyzer, yielding measurements of sediment volume in each size class. Grain sizes greater than fine sand were excluded from the analysis by wet-sieving the samples through a 90 µm mesh. Composite grains that may have flocculated in the glacial environment (Woodward and others, Reference Woodward, Porter, Lowe, Walling and Evans2002; Chanudet and Fillela, Reference Chanudet and Fillela2006) were dispersed using a 0.05% sodium hexametaphosphate solution, and after 24 h of soaking were placed in a sonic bath leading into the loading cell. Error in the size distribution arises from the assumption that all particles are spherical. Furthermore, the distribution is likely finer than measured given the presence of inorganic colloids that may not have completely deflocculated (Chanudet and Fillela, Reference Chanudet and Fillela2006) and the presence of platy particles that align perpendicular to the Mastersizer laser (e.g. Konert and Vandenberghe, Reference Konert and Vandenberghe1997).

To quantify the temporal variation in SSSD in relation to discharge and suspended sediment concentration, 28 samples were collected throughout the 2013 melt season at Glacier 1. Multiple dilution gauging experiments were performed to construct a rating curve, from which we estimated discharge at the time of sample collection (methods described in Crompton and others (Reference Crompton, Flowers, Kirste, Hagedorn and Sharp2015)). In addition to sampling by submerging a bottle in the proglacial stream, samples were also collected with an automatic water sampler. For a 5 min sampling period on 23 July 2013, during which the discharge can be assumed constant, we tested a variety of sampling procedures to characterize the uncertainty associated with sampling methodology. Results indicate that there is negligible difference between the samples collected by submerging the bottle in the middle of the stream (as done for Glaciers 2–20), submerging the bottle in the middle of the stream but 50 m upstream from the usual sampling site, and using the automatic water sampler. An integrated depth sampling technique resulted in a higher mean grain size, while submerging the bottle in an eddy resulted in a lower mean grain size. We therefore avoided using these techniques at Glaciers 2–20.

Distribution statistics and hypothesis testing

Mastersizer measurements are output as a cumulative sediment size distribution for each sample, from which we construct a probability density function (the SSSD) by numerical differentiation using a two-point centred difference stencil. We then interpolate the SSSD using the Matlab^® piecewise cubic interpolation pchip function, which preserves the location and magnitude of all maxima and minima within the data. For each distribution, we compute a mean, standard deviation, skew and kurtosis, hereafter referred to as the ‘distribution statistics’. The skew and kurtosis are computed as normalized moments, and the kurtosis is normalized by a value of 3 (e.g. Joanes and Gill, Reference Joanes and Gill1998). We compute the median grain size, but do not include it in the analysis as it furnishes information similar to that captured by the mean. We also analyze the distribution quantiles, but find these less effective than the distribution statistics in characterizing the samples. We perform all calculations using arithmetic rather than geometric quantities, as the latter lead to a poor representation of the distribution at the fine end of the spectrum where we observe significant structure.

For each group (MS-S, MS-NS, MX-S, MX-NS), we compute the mean and std dev. of each distribution statistic (i.e. the mean of the means, the std dev. of the kurtoses, etc.). In an effort to address the question of whether the groups are statistically distinguishable, we test the null hypothesis that the distribution statistics have means that are equivalent across groups by carrying out an analysis of variance (ANOVA). Should the ANOVA F-test obtain a decidedly small p-value (e.g. p < 0.05), we conclude that at least one group is unlike the others in terms of the statistic in question. In order to further determine which groups are different from one another, we employ a Tukey honest significant difference (HSD) test (with α = 0.1). This multiple-comparison procedure determines the pairwise subsets that are significantly different in terms of the chosen statistic. The Tukey HSD test is a more conservative form of the t-test, having the advantage of accounting for the error rate, or probability that two groups are different by chance variability (Type I error) (e.g Dowdy and others, Reference Dowdy, Wearden and Chilko2011). Before significance testing is carried out, we first ensure that the sample statistics are normally distributed within groups using the χ ² test at the 95% significance level following the methods of Davis and Sampson (Reference Davis and Sampson2002).

Principal component analysis

We compare the shapes of the SSSDs using PCA, a commonly used multivariate technique in the natural sciences with applications ranging from meteorology (e.g. Hardy and Walton, Reference Hardy and Walton1978) to geochemistry (e.g. Mitchell and others, Reference Mitchell, Brown and Fuge2006). PCA identifies linear combinations of variables that explain the greatest variance within a dataset (e.g. Jolliffe, Reference Jolliffe2002). In this application, we take the variables to be the grain sizes as binned according to the standard $\mathop {\log} \nolimits_2 $ or phi (ϕ) scale, with the value of the kth bin taking on the average grain size within that bin (e.g. Davis and Sampson, Reference Davis and Sampson2002). Binning the grain sizes in this way allows for a more dense sampling of the finer grain sizes, where we observe significant structure in the measured distributions. To find the principal components (PCs), we construct a matrix X of dimensions m × n, where there are n discrete grain sizes ranging from ϕ = 3 to 12, and m samples. We then compute the eigenvectors (ν) and eigenvalues (λ) of the variance-covariance matrix of X. The normalized eigenvalues give the percent variance explained by each eigenvector (latency), while the eigenvectors (loads) provide the directions along which the greatest variance occurs. Projecting the data matrix X onto the eigenvectors yields a matrix of scores (s) as ${\bf X}\nu = {\bf s}$ , creating a transformation that allows the data to be visualized in PC space.