MATERIALS AND METHODS

In this study, we will use the novel method developed by Crema and Shoda (Reference Crema and Shoda2021) which is based on growth models with discrete time units that can be fitted through Markov Chain Monte-Carlo (MCMC). The method was originally tested on data regarding the demographic changes related to the period of establishing irrigated rice farming on the island of Kyushu, Japan, during the first millennium BC (Crema and Shoda Reference Crema and Shoda2021). This experimental analysis has demonstrated that the method successfully produces real parameters from simulated data in different conditions, even in cases of small sample sizes or different effects of the calibration curve.

The initial sample consists of 331 radiocarbon dates from 53 Early Neolithic sites (Figure 1), some of which are published for the first time in this paper (Supplementary material file 1, Table 2; these specimens were AMS dated at the University of Bristol, School of Chemistry, Bristol Radiocarbon Accelerated Mass Spectrometry–BRAMS), i.e., all currently available Early Neolithic dates from the Starčevo culture sites in Serbia (excluding the Danube Gorges sites due to the specific Neolithization processes characteristic for this region). This sample represents the updated version of the Grand Early Neolithic dates sample (GEN, in the following text) used in previous studies where SPD analyses were applied in population dynamics reconstructions (Porčić et al. Reference Porčić, Blagojević and Stefanović2016; Blagojević et al. Reference Blagojević, Porčić, Penezic and Stefanovic2017; Porčić, Blagojević, et al. Reference Porčić, Blagojević, Pendić and Stefanović2021; Blagojević Reference Blagojević2022). It consists of 235 dated animal remains (70.9% out of the total sample), 54 dated human remains (16.3%), 15 dated charcoal remains (4.5%), and 22 dated plant remains (grains, seeds, fruit stones, and shells; 6.6%). For five samples, this data was unknown.

Figure 1

Map of the sites used in this study: 1. Anište-Bresnica; 2. Autoput E-70, km 521, site 1; 3. Autoput E-70, P2 sever (3); 4. Bakovača-Ostra; 5. Banja-Aranđelovac; 6. Baštine-Obrež; 7. Bataševo; 8. Bezdan-Bački Monoštor; 9. Biserna obala-Nosa; 10. Blagotin; 11. Crnokalačka bara; 12. Crnoklište; 13. Divostin; 14. Donja Branjevina; 15. Drenovac; 16. Golokut-Vizić; 17. Gospođinci-Futog-Klisa I; 18. Gospođinci-Nove Zemlje; 19. Grabovac-Đurića vinogradi; 20. Grivac; 21. Iđoš; 22. Jaričište 1; 23. Kremenilo-Višesava; 24. Kudoš-Šašinci; 25. Lazarev grad-Crkvena građevina; 26. Ludoš-Budžak; 27. Magareći mlin; 28. Međureč-Dunjički šljivari; 29. Miokovci-Crkvine; 30. Motel Slatina; 31. Novi Sad-Gornja šuma; 32. Ornice-Makrešane; 33. Pavlovac-Gumnište; 34. Perlez-Batka C; 35. Pseće brdo-Bečej; 36. Ribnjak-Bečej; 37. Rudna Glava; 38. Rudnik Kosovski; 39. Sajan-Domboš; 40. Sajlovo, site 5; 41. Šalitrena pećina; 42. Selište-Sinjac; 43. Šljunkara na Dumači; 44. Sremski Karlovci-Sonje Marinković; 45. Starčevo-Grad; 46. Staro selo-Idvor; 47. Svinjarička čuka; 48. Topole-Bač; 49. Vinča-Belo brdo; 50. Vinogradi-Bečej; 51. Vršac-At; 52. Zmajevac; 53. Zmajevo-Livnice. The map was produced by T. Blagojević in QGIS 3.32 (www.qgis.org).

The database of Early Neolithic radiocarbon dates in Serbia has been updated with new radiocarbon dates; therefore, a new SPD analysis was performed, mostly to refine the limits of the intervals included in the growth rate estimation analyses. The most recent calibration curve, IntCal20 (Reimer et al. Reference Reimer, Austin, Bard, Bayliss, Blackwell, Ramsey, Butzin, Cheng, Edwards, Friedrich and Grootes2020), was incorporated into the analysis. As the resulting pattern on the population curve was not significantly different from the previous results (Porčić et al. Reference Porčić, Nikolić, Pendić, Penezić, Blagojević and Stefanović2021), it will not be thoroughly discussed in this study. In this context, the results should be considered a tool for defining intervals and selecting dates to be included in the growth rate estimation analyses (Figure 2).

Figure 2

The results of the SPD analysis on the Grand Early Neolithic sample (N dates: 331, N bins: 108; p<0.001); the dark line represents the empirical curve, the gray area represents 95% confidence intervals based on simulating the SPD curves from the null model (a uniform model that assumes a stationary population, i.e., a constant population size through time), the red areas represent statistically significant growths, and the blue areas represent statistically significant declines on the empirical curve. Intervals used for the growth rate estimation analyses are marked with dark squares for the logistic and with red squares for the exponential growth models for both episodes of growth. The figure was produced by T. Blagojević in the R programming language using the rcarbon package (Bevan and Crema Reference Bevan and Crema2018; Crema and Bevan Reference Crema and Bevan2020).

Since two distinctive episodes of population growth can be observed on the SPD curve, two separate analyses were performed. In all the analyses, the exponential and logistic growth models were fitted. Based on the shape of the SPD curve as well as single SPD values that fall within the observed statistically significant episodes of growth, an interval for the growth rate estimation was determined. The span of this interval was bounded by the calibrated dates that are included in the first and second episodes of growth, respectively. As a final step, all the dates were included based on their median calibrated values to avoid narrowing the interval too much while staying within the 95% CI limits. Therefore, only subsamples of the total number of 331 dates will be used for the growth rate estimation (Figure 3), although it should be kept in mind that the signals of the episodes of growth are based on the entire sample of radiocarbon dates.

Figure 3

The distribution of calibrated radiocarbon dates (95% confidence intervals) and sites included in the study as a subsample of the Grand Early Neolithic sample for both episodes of growth. The figure was produced by M. Porčić and T. Blagojević in Excel.

Two models of population growth were used in the analysis: the exponential and the logistic growth models. The exponential model was fitted only to the radiocarbon dates falling within the first half of the time interval of an episode of growth detected by the SPD analysis, as it is assumed that the first phase of the growth will be exponential. The formula used for the exponential growth model is defined within the nimbleCarbon package (Crema Reference Crema2021):

$${\pi _{a - t}} = {{{{(1 + r)}^t}} \over {\sum\nolimits_{t = 0}^{a - b} {{{(1 + r)}^t}} }}$$

where t is time, and a and b are calendar years in BP that define the start and end of the time window of the analysis. The logistic model was fitted to all the dates falling within the interval of an episode of growth detected by the SPD analysis, as the logistic model reflects both the phase of accelerated and decelerating growth (Chamberlain Reference Chamberlain2006: 21; Porčić Reference Porčić, Blagojević and Stefanović2016: 80). As with the exponential growth model, the formula for the logistic model is also defined within the nimbleCarbon package (Crema Reference Crema2021):

$${\pi _{a - t}} = {{{1 \over {1 + {{1 - k} \over k}{e^{ - rt}}}}} \over {\sum\nolimits_{t = 0}^{a - b} {{1 \over {1 + {{1 - k} \over k}{e^{ - rt}}}}} }}$$

The first episode of growth covered the time span between ∼6250 cal BC and ∼6000 cal BC, in the case of fitting the logistic growth model, and the time span between ∼6250 cal BC and ∼6125 cal BC when fitting the exponential growth model (Figures 2 and 4). The second episode of growth included dates that fall within the range of ∼5800 cal BC and ∼5650 cal BC, for the logistic model, and from ∼5800 cal BC to ∼5700 cal BC, for the exponential growth model (Figures 2 and 5).

Figure 4

The distribution of calibrated radiocarbon dates (68.2% and 95.4% confidence intervals) from the first episode of growth for logistic and exponential growth models (6250–6000 and 6250–6125 cal BC), plotted on the IntCal20 calibration curve. The figure was produced by T. Blagojević in OxCal 4.4 Online (OxCal).

Figure 5

The distribution of calibrated radiocarbon dates (68.2% and 95.4% confidence intervals) from the second episode of growth for logistic and exponential growth models (5800–5650 and 5800–5700 cal BC), plotted on the IntCal20 calibration curve. The figure was produced by T. Blagojević in OxCal 4.4 Online (OxCal).

The method was implemented in the NimbleCarbon v0.1.0. package, designed specifically for the purpose of estimating growth rates by using different population growth models (Crema Reference Crema2021).

To account for the research bias, mostly reflected in a large number of dates from some of the individual sites, the binning of dates was performed first. The procedure of binning, which is integrated into the analysis, involves the grouping of the dates within specified time intervals (Shennan et al. Reference Shennan, Downey, Timpson, Edinborough, Colledge, Kerig, Manning and Thomas2013; Timpson et al. Reference Timpson, Colledge, Crema, Edinborough, Kerig, Manning, Thomas and Shennan2014). Dates are assigned to a bin based on their temporal distance, which is set by a researcher. In this case, it was set at 150 years. In other words, if the distance between two dates is up to 150 years, they would belong to the same bin. One date was randomly chosen from each bin (provided that it is within the temporal limits of the analysis). This step affected the effective sample size within the defined intervals by lowering the number of dates included. All the dates that were used in the analysis are given in Table 2, in Supplementary material file 1, while the number of dates that entered the final sample is given in Table 1. The code for the analysis in R is given in the Supplementary material file 1. This procedure was repeated multiple times (10 times) for both episodes and for both models to check for sampling effects. The results of all iterations are given in Table 1 in Supplementary material file 1. Supplementary material file 2 is an Excel file that contains almost all the dates that were used in the analysis, arranged in a way to be directly loaded in R using the code provided in Supplementary material file 1, and for the analysis to be reproduced. It should be stressed that nine dates from the original analysis were not included in this file since their Uncal BP values have not been published yet. However, given the sample size, it can be assumed, with a high degree of certainty, that their omission won’t affect the overall pattern.

Table 1

The results of the growth rate estimations for different episodes of growth.

The priors for parameters of the models were also defined: r (growth rate)—for both exponential and logistic models; and k (initial population size, which, in this case, represents the proportion of carrying capacity, K), only for the logistic growth model. The parameter values were defined within the Bayesian framework, which implies confronting the empirical data with prior probability distributions of parameter values and generating posterior distributions. The prior for parameter r (growth rate) was modeled as a uniform distribution at the interval between 0.0001 and 0.06, while the prior for parameter k (the ratio of initial population size and carrying capacity in the logistic model) was modeled as a uniform distribution at the interval between 0.0002824891 and 0.01129956. If we assume that the carrying capacity in the Early Neolithic Balkans was one person per square kilometer (Dennell and Webley Reference Dennell, Webley and Higgs1975; Müller Reference Müller2006; Lemmen Reference Lemmen2013), given the area of the Republic of Serbia, which is 88499km², the lower limit value for k corresponds to the assumption that there were 25 people initially, whereas the upper limit value is based on the assumption that the initial population size was 1000 people. These estimates are little more than guesses, but the prior distribution for k should be wide enough to encompass all possibilities.

A goodness-of-fit for the models was evaluated by looking at Pearson’s correlation coefficient, which measures the strength of a linear correlation between modeled and empirical SPD values (Crema Reference Crema2021; Crema and Shoda Reference Crema and Shoda2021).