Theoretical Considerations

To meet the prerequisite of our thesis—perform a cluster analysis of ¹⁴C dates—we need to calculate their dissimilarity matrix. As was already mentioned, the distance function of two calibrated dates should be based on the probability that they represent the same event.

We propose a definition of an archaeological event for the purposes of scientific dating as a period of human activity, during which dateable artifacts or ecofacts are deposited at such a frequency that it is impossible to recognize a time gap between them using any available dating method. Therefore, the summed probability distribution of dates originating from one event should be indistinguishable from a summed probability distribution of simulated dates with the same resulting mean and standard deviation generated randomly using the same dating uncertainty and calibration method. The reasoning behind this is that the dated artifacts or ecofacts represent a random sample of those continuously generated over the duration of the event. If the summed probability distribution of the observed dates significantly differs from the randomly generated versions, we must assume that we are dealing with more than one event. An underlying assumption for all considerations in this study is that the examined samples are spatially homogenous, i.e. the events that produced them affected the whole examined area. It is important to keep this in mind when interpreting the results.

Normality Test

As was established before, the non-normal nature of calibrated ¹⁴C dates requires us to use randomization for statistical testing, which means comparing the observed dataset to a null model in which the actual calendar dates of the samples are normally distributed around a specific mean. To achieve this, the randomized summed probability distributions used for statistical testing must be generated using the same number of simulated dates as the observed dataset. The distribution of uncertainties of these dates must also be the same as the observed. Finally, the summed distribution must have the same mean and standard deviation as the observed summed distribution. This is to ensure that we take uncertainties due to measurement and calibration into account. The generator algorithm first produces an initial guess of randomized distributions by simulating ¹⁴C dates of samples with calendar ages normally distributed with the mean and standard deviation of the observed summed distribution, randomly choosing uncertainty values from the observed dataset. This ¹⁴C set is then optimized using the basinhopping function from the scipy.optimize package (Virtanen et al. Reference Virtanen, Gommers, Oliphant, Haberland, Reddy, Cournapeau, Burovski, Peterson, Weckesser and Bright2020) to minimize the distance of the mean and standard deviation of the sum of the randomized distributions from the observed values. For a Python implementation of this algorithm, see function gen_random_dists (Demján Reference Demján2020).

First, we need to test the null hypothesis (H₀) that the observed dates represent a single event, i.e. the optimal number of clusters explaining the evidence is one. We do this by generating a sufficient amount of sets of randomized distributions as described above and calculate the probability of achieving values as extreme as the observed ones for each calendar year. If at least one of these probabilities is lower than the significance level α, then H₀ has been rejected (Demján Reference Demján2020, functions get_randomized, calc_percentiles) and we can assume that the dates form two or more clusters.

Clustering Method

The probability that two calibrated radiocarbon dates i and j, defined by mean radiocarbon ages ${t_i}$ , ${t_j}$ and standard deviations ${\sigma _i}$ , ${\sigma _j}$ , represent the same event can be expressed as the ratio

(1) $${P_{ij}} = {{4\mathop \sum \nolimits_{t \in I} {f_{Calib}}\left( {t,{t_i},{\sigma _i}} \right){f_{Calib}}\left( {t,{t_j},{\sigma _j}} \right)} \over {{{\left( {\mathop \sum \nolimits_{t \in I} {f_{Calib}}\left( {t,{t_i},{\sigma _i}} \right) + \mathop \sum \nolimits_{t \in I} {f_{Calib}}\left( {t,{t_j},{\sigma _j}} \right)} \right)}^2}}}$$

where I is the set of all calendar dates from the IntCal13 (Reimer et al. Reference Reimer, Bard, Bayliss, Beck, Blackwell, Ramsey, Buck, Cheng, Edwards and Friedrich2013) and ${f_{Calib}}$ is the calibration function defined by Bronk Ramsey (Reference Bronk Ramsey2008). It has to be noted that this calculation models the ideal case where the event’s duration is one calendar year, so the resulting percentages will be very low for real-life data. This ideal model is used because we cannot assume a specific time interval of the event and need this value only to calculate the chronological distance of two dates for the purposes of cluster analysis, without the need to directly interpret it. The distance function can then be defined as:

(2) ${D_{ij}} = 1 - {P_{ij}}$

The next step towards cluster analysis is the calculation of a dissimilarity matrix of all calibrated dates using the function ${D_{ij}}$ (2). For a Python implementation, see function calc_distance_matrix in the clustering_14C program (Demján Reference Demján2020).

Further, we calculate Principal Component Analysis (PCA) scores for each row of the dissimilarity matrix and keep only components which explain 99% of the variance (Demján Reference Demján2020, function calc_distances_pca). This step is especially important for larger datasets to reduce the number of dimensions (i.e. “de-noise” the data) and achieve a more stable clustering. Alternative methods of choosing the number of components to keep were suggested by one of the reviewers of this paper, one being to discard just the last component, which can be assumed to be the one capturing noise, the other being Horn’s Parallel Analysis, which selects components based on randomization testing (Horn Reference Horn1965). We tested both approaches on simulated data and while Horn’s method always rejected all but the first component, which led to a substantial reduction of fidelity, the selection of all but the last component produced comparable results with the 99% variance method (see Supplementary Material File 2).

Hierarchical Cluster Analysis (HCA) is then performed on the PCA scores using Ward’s method based on the Euclidean distance metric. Solutions are produced for numbers of clusters ranging from two to number of dates minus two (Demján Reference Demján2020, function calc_clusters_hca).

Statistical Testing of Clustering Solutions

If the normality test rejects H₀ for a one-cluster solution, we can proceed with testing the HCA solutions with two and more clusters. For each solution, we calculate the mean Silhouette Coefficient, which quantifies the consistency of clustering (Rousseeuw Reference Rousseeuw1987). We then test the H₀, that such consistency can be achieved by clustering datasets generated randomly under the previously described conditions (Demján Reference Demján2020, function get_clusters_hca). Out of the solutions for which H₀ was rejected, the optimal is then the one with the highest mean silhouette coefficient, i.e. the most consistent one (Demján Reference Demján2020, function get_opt_clusters).