THE FORENSIC CASES

Case 1 (AAR-26566) involves a bone that was discovered in 2017 in a fisherman’s net in the seas, just off the southwest coast of Iceland. The bone was long and grayish-white with no soft tissue. A forensic pathologist identified it as a humeral bone, probably the left humerus from a relatively large body structure, most likely a male. It was very well preserved and cortical material was sampled at the distal end close to the knee joint as shown in Figure 1A. After submission of our results, the person was later identified by DNA analysis as a male born April 13, 1974, and disappeared December 26, 2015, the most likely time of death.

Figure 1 Photos of the human bones discussed in the paper. Panel A shows the humeral bone discovered in fishermen’s net off the Southwest coast of Iceland (AAR-26566). Panel B shows the scull found in the southwest lowlands, Iceland (AAR-30392).

Case 2 (AAR-30392) involves a human cranium found in 1995 in South Iceland, about 50 km from Reykjavík, the capital of Iceland. It was very well preserved with no soft tissue, and cortical material was sampled at the lower back (Figure 1B). After submission of our results, the cranium was later identified by DNA analysis to belong to a male born in 1940 who disappeared December 24, 1987, the most likely time of death.

MODELING THE ¹⁴C CONTENT OF BONE COLLAGEN AS A FUNCTION OF AGE

The ¹⁴C concentration of collagen in human bones is controlled by the ¹⁴C concentration in the consumed diet and the carbon exchange rate between bone collagen and the consumed diet, i.e., the collagen carbon turnover rate.

Firstly, to model the ¹⁴C concentration of bone collagen over the time span of an individual it is necessary to estimate the bone-collagen carbon turnover rate (f) as a function of age. We use the approach as well as the modeled collagen turnover rates of Hedges et al. (Reference Hedges, Clement, Thomas and O’Connell2007) (Figure 2B). This model is derived from a modeled turnover template defined by four (decreasing) turnover rate values at four time points, two of which are fixed, and two of which can vary: At age 0 (fixed, age of birth), at age between 10 and 20 (adolescence), at age between 19–30 (cessation of growth), and at age of 100 (fixed, age by which all subjects are dead). There are therefore six adjustable parameters (4 turnover rate values and 2 varying time points, i.e., adolescence and cessation of growth), for linear interpolation to evaluate the turnover rate at any given age (for details, see Hedges et al. [Reference Hedges, Clement, Thomas and O’Connell2007] and discussion section below).

Figure 2 Panel A: The Northern Hemisphere bomb calibration curve (Bomb21NH1_2021; Hua et al. Reference Hua, Turnbull, Santos, Rakowski, Ancapichún, De Pol-Holz, Hammer, Lehman, Levin, Miller, J. Palmer and Turney2022). In addition, the calculated terrestrial diet curve is shown together with examples of mixed marine diet curves in shades of blue. The marine curve is constructed using data from the north Icelandic shelf (Wanamaker et al. Reference Wanamaker, Butler, Scourse, Heinemeier, Eiríksson, Knudsen and Richardson2012). Panel B: Bone collagen turnover rates f taken from Table 2 in Hedges et al. (Reference Hedges, Clement, Thomas and O’Connell2007). (Please see online version for color figures.)

Secondly, the ¹⁴C concentration of the diet must be known. In case of a purely terrestrial diet a ¹⁴C diet curve can be constructed from the atmospheric ¹⁴C concentration by assuming a time lag of 1–2 yr between the atmosphere and the consumed diet. We use the Northern Hemisphere ¹⁴C calibration curve (Bomb21NH1; Hua et al. Reference Hua, Turnbull, Santos, Rakowski, Ancapichún, De Pol-Holz, Hammer, Lehman, Levin, Miller, J. Palmer and Turney2022) as the atmospheric input and calculate a ¹⁴C diet curve (F¹⁴C_diet) by a 2-yr backwards moving average and standard deviation:

(1) $${F^{14}}{C_{diet}}\left( {{Y_i}} \right) = mean\langle{F^{14}}{C_{Bomb21NH1}}\left( {Y\; \le {Y_i}\; \&\;Y \gt {Y_{i - 2}}} \right)\rangle$$

(2) $${\sigma _{{F^{14}}{C_{diet}}}}\left( {{Y_i}} \right) = std\langle{F^{14}}{C_{Bomb21NH1}}\left( {Y\; \le {Y_i}\;\& \;Y \gt {Y_{i - 2}}} \right)\rangle$$

where Y_i range between 1940 and 2020.

In case of mixed terrestrial and marine diet the situation is much more complex because the ¹⁴C concentration of the surface ocean is not distributed uniformly geographically (e.g., Wanamaker et al. Reference Wanamaker, Butler, Scourse, Heinemeier, Eiríksson, Knudsen and Richardson2012). We use the surface ocean ¹⁴C datasets from Grimsey and Siglufjordur from the Icelandic shelf as our marine diet curve input (Wanamaker et al. Reference Wanamaker, Butler, Scourse, Heinemeier, Eiríksson, Knudsen and Richardson2012). The ¹⁴C marine surface ocean curve is constructed using a 3-yr moving average and standard deviation of the two datasets. The ¹⁴C marine surface ocean curve is subsequently extrapolated to 2020. A mixed terrestrial and marine ¹⁴C diet curve is then constructed by taking the relative fraction of the terrestrial ¹⁴C diet curve and the ¹⁴C surface ocean curve (see Figure 2A).

Having constructed a ¹⁴C diet curve, F¹⁴C_{diet curve}, the F¹⁴C_bone at birth can be estimated as F¹⁴C_{diet curve}(Y_birth), thus

(3) $${F^{14}}{C_{bone}}\left( {Y_{birth}} \right) = \;{F^{14}}{C_{diet}}\left( {{Y_{birth}}} \right)$$

After birth, the bone F¹⁴C_bone is modeled using two components: the exchangeable and non-exchangeable carbon. The fraction of exchangeable carbon is estimated as the bone collagen carbon turnover rate in percent (f) using the Hedges et al. (Reference Hedges, Clement, Thomas and O’Connell2007) model as f _i , where i range from 1 to 100 yr (Figure 2B). Further, the exchangeable carbon ¹⁴C content is estimated using the F¹⁴C_diet. The non-exchangeable carbon (1–f _i ) is estimated using the F¹⁴C_bone content from the previous year taking into account the ¹⁴C decay. Thus, the F¹⁴C_bone collagen over lifetime of an individual is modeled as:

(4) $$\hskip -4pt{F^{14}}{C_{bone}}\left( {{Y_{birth}} + i} \right) = {f_i}\cdot{F^{14}}{C_{diet}}\left( {{Y_{birth}} + i} \right) + \!\left( {1 - {f_i}} \right)\cdot{F^{14}}{C_{bone}}\left( {{Y_{birth}} + i - 1} \right)\cdot exp\left( { - {1 \over {8267}}} \right)$$

Where i ranges from 1 to 100 yr and the last latter term is taking into account the ¹⁴C decay. Error estimates on the calculated F¹⁴C_bone are calculated by resampling the ¹⁴C diet curve (F¹⁴C_{diet curve}) and bone collagen turnover rate (f) 1000 times, assuming all uncertainties to be normally distributed. As an approximate further constraint, the bone collagen turnover rate (f) is required to be decreasing with age (∂f / ∂age <0) and f to be strictly greater than 0%.

RESULTS—RADIOCARBON ANALYSIS

Results are reported in Table 1 and the calibrated ¹⁴C ages are shown in Figure 3.

Table 1 Radiocarbon and stable isotope data as well as known birth and death years for the two individuals Case 1 and 2.

Figure 3 Shown is the Northern Hemisphere bomb calibration curve (Bomb21NH1_2021; Hua et al. Reference Hua, Turnbull, Santos, Rakowski, Ancapichún, De Pol-Holz, Hammer, Lehman, Levin, Miller, J. Palmer and Turney2022) together with the calibrated probability distributions (white; Bronk Ramsey et al. Reference Bronk Ramsey, Dee, Lee, Nakagawa and Staff2010) for each individual (AAR-26566 and AAR-30392). The provided age ranges are uncorrected for collagen turnover rates. The arrows indicate a 10-yr shift of the probability distribution representing a simple lag-time correction for collagen turnover in human bones (gray). Shown are also the period of death for both individuals.

Case 2

The ¹⁴C analysis was performed in 2019 (AAR-30392). The extracted collagen was of good quality, with a yield of 9.9%. Isotope data showed limited indication of marine diet, with a δ¹³C of –19.2‰, a δ¹⁵N of 12.7‰ and a C/N ratio of 3.4. The F¹⁴C value demonstrated that the individual was modern (1.1622 ± 0.0034), falling within the bomb-pulse period. As shown in Figure 3, the calibrated age using 95% probability gives 17.7% probability of a time of death during the years 1958.5 AD to 1959.0, and 77.8% probability during 1989.2 AD to 1990.6. Again, to provide a quick forensic result to the police, we added a 10-yr time-lag correction for bone collagen turnover (i.e., year 2000) and assumed no marine correction. As the cranium was found in 1995 the latter time was ruled out, and we suggested that the most likely time of death was around 1970.

In hindsight, the application of unqualified lag-time turnover corrections is simply not generally valid in connection with bomb-pulse dating as demonstrated by our modeling results below and Figure 4.

Figure 4 Panel A and B: the Northern Hemisphere bomb calibration curve (Bomb21NH1_2021; Hua et al. Reference Hua, Turnbull, Santos, Rakowski, Ancapichún, De Pol-Holz, Hammer, Lehman, Levin, Miller, J. Palmer and Turney2022). Panel A shows the modeling results for AAR-25566 (Case 1) whereas Panel B shows the modeling results for AAR-30392 (Case 2). Both panel A and B show the modeled F¹⁴C_bone curves from the time of birth using either a terrestrial diet curve or a 30% marine diet curve. The time of death is indicated with the vertical grey bar for each individual (for further details please consult the main text).

RESULTS—¹⁴C BONE COLLAGEN MODELING

The bone collagen models for the individuals of the two cases are presented in Figure 4 and Table 2. Using the known year of birth, a total of 7 models are calculated for each individual: one model representing a purely terrestrial diet and 6 models ranging from 10–60% marine diet. Table 2 provides the calculated F¹⁴C_bone for the year of death which is then compared to the measured F¹⁴C value presented by the difference between the measured F¹⁴C (Table 1) and the F¹⁴C_bone values (ΔF¹⁴C; Table 2). Further, the Z-score, as defined in Table 2, is calculated for the ΔF¹⁴C values.

Table 2 Bone F¹⁴C modeling for the two individuals. F¹⁴C_bone indicates the modeled F¹⁴C value using either a purely terrestrial diet curve or mixed curves with 10–60% marine influence. The ΔF¹⁴C is calculated as difference between the measured F¹⁴C value and the modeled F¹⁴C_bone. The Z-score indicates the ΔF¹⁴C in units of the standard deviation by dividing the ΔF¹⁴C value by the error on the ΔF¹⁴C value.

For Case 1 (AAR-26566), the purely terrestrial model appears to represent the best statistical agreement with the measured F¹⁴C value with a possibility of up to 20% marine diet (Table 2). For Case 2 (AAR-30392), a 30% marine diet appears to represent the best statistical agreement with the measured F¹⁴C value with a possible marine diet range between 20–40% (Table 2). Note, however, that the modeling for this individual, with a birth date in 1940, yields an extremely wide range (1960–2000) of possible death dates, too wide to be of practical value in a forensic case.