coffee
Chronological Ordering For Fossils and Environmental Events can be
acronymised to coffee. While individual calibrated radiocarbon
dates can span several centuries, combining multiple dates together with
any chronological constraints can make a chronology much more robust and
precise.
This package uses Bayesian methods to enforce the chronological
ordering of radiocarbon and other dates, for example for trees with
multiple radiocarbon dates spaced at exactly known intervals (e.g., 10
annual rings). Another example is sites where the relative chronological
position of the dates is taken into account - the ages of dates further
down a site or core must be older than those of dates further up.
On first usage of the package, it has to be installed:
install.packages('coffee')
To load the code:
## Loading required package: rintcal
1. tree rings
Let’s simulate the radiocarbon dating of a tree with 400 rings, which
started growing in AD 950 (1000 cal BP), with rings radiocarbon dated at
regularly spaced 20-yr intervals, and then wiggle-match it using a
Bayesian framework (Christen and Litton 1995):
sim.rings(age.start=1000, length=400, gaps=20)
mytree <- rings()
## The run's files will be put in this folder: trees/mytree
## best age: 995 cal BP, 95% range: 999 to 989 cal BP, 10 yr
## Offset (in standard deviations), mean 0.69, from 0 (date 10) to 1.78 (date 15)
## 88.44% of the model ages fit within the 95% hpd ranges of the dates, with worst-fitting date 11 (45.71%) and best-fitting date 21 (100%)
The above plot (Fig. 1) contains two panels: the top one shows the
calibrated (blue) and wiggle-matched (grey) distributions of all
radiocarbon dates, and the bottom one shows how the uncalibrated
radiocarbon dates (steelblue dots with error bars) match the calibration
curve (green), as well as the modelled age distribution of the ring of
interest (by default the oldest, innermost one).
The variable mytree contains both the radiocarbon dating information
and the estimated age distribution of the oldest ring.
The file containing the dates should have the following formatting
(only the first five entries are shown):
| 18881 |
601 |
18 |
400 |
1 |
| 18882 |
583 |
17 |
380 |
1 |
| 18883 |
606 |
19 |
360 |
1 |
| 18884 |
709 |
21 |
340 |
1 |
| 18885 |
733 |
23 |
320 |
1 |
The fourth column should contain the ring number, starting with the
youngest, outermost ring and working down backwards in time toward the
date of the oldest, innermost ring. The above dates are calibrated using
IntCal20 (Reimer et al. 2020) through supplying cc=1; Marine20 (Heaton
et al. 2020, cc=2), SHCal20 (Hogg et al. 2020, cc=3) or
a tailor-made calibration curve (cc=4) can also be used. Dates that are
already on the cal BP scale get cc=0. As with rbacon’s .csv files,
additional columns can be added to deal with reservoir offsets (mean and
error; columns 6 and 7) and to provide parameters for the student-t
distribution (t.a and t.b; columns 8 and 9).
For more information, ask for help:
2. stratigraphy
Now that the coffee is brewing, let’s imagine a tiramisu or
spekkoek. A site’s stratigraphy can be age-modelled
by assuming chronological ordering of the layers and dates according to
their relative position, with levels further down a site assumed to be
older than those above them. This can too be done within a Bayesian
framework (e.g., Buck et al. 1991):
set.seed(123)
sim.strat()
strat(its=2e5) # note that this run will take a few minutes
# The run's files will be put in this folder: strats/mystrat
# |>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>| 100%
# Done running...
# Removed a burn-in of 100
# Thinning the MCMC by storing every 8 iterations
# 79.71% of the model ages fit within the 95% hpd ranges of the dates,
# with worst-fitting date 2 (51.38%) and best-fitting date 4 (93.89%)
# Run took 3.17 minutes
Fig. 2 - output of the strat function, from a
simulated dataset of 5 chronologically ordered dated levels. The
‘islands’ or ‘swimming elephants’ reflect the age-modelled,
chronologically constrained distributions (upward dark grey) and the
individual calibrated distributions (downward light-grey). Black lines
show the 95% modelled age ranges. Note that whereas the modelled
distributions are in chronological order, some of the individually
calibrated distributions show reversals.
Beside the graph itself, the model also reports how well the modelled
ages fit within the highest posterior density (hpd) ranges of the dates
(if all modelled age iterations fit in any of a date’s hpd ranges, its
fit is 100%, and if half of the iterations fall outside of the hpd
ranges, its fit it 50%). The model’s running time is also reported (we
hope to be able to speed up the strats runs in the future).
Strat files are .csv files formatted like so:
| 8881 |
4147 |
83 |
1 |
1 |
| 8882 |
4326 |
87 |
2 |
1 |
| 8883 |
4159 |
83 |
3 |
1 |
| 8884 |
4530 |
91 |
4 |
1 |
| 8885 |
4521 |
90 |
5 |
1 |
The positions of the dates are indicated in the fourth column. See
below for more options such as gaps, undated levels or blocks of dates
in a layer.
Note that the above model uses 200,000 iterations and took around 3
minutes to run on a reasonably fast computer (it is hoped future
versions of coffee will be able to run faster). It is recommendable to
assess the influence of the MCMC settings on the model, and use
sufficiently large sample sizes (at least 3,000 remaining iterations are
recommended, but the actual number will depend on the number of dates).
Note that the thinning size is calculated from the MCMC run by default.
In the following command, on purpose we are providing some bad initial
point age estimates (but still in chronological order; 2 rows of initial
ages are needed), storing every single iteration (both thinning and
internal.thinning are set to 1), not removing the burn-in and performing
a much-too-short run of only 2000 iterations:
set.seed(234)
sim.strat()
strat(burnin=0, thinning=1, internal.thinning=1, its=2000,
init.ages=rbind(seq(3000, 4000, length=5), rbind(seq(3010, 4010, length=5))))
Fig. 3 - output of a strat simulation with an
overly short MCMC run.
As can be seen from the top panel, the burnin of the above example
took around 500 to 1000 iterations, and also clearly visible are long
horizontal stretches that indicate parts of the MCMC where none of the
proposed iterations could be accepted. Hence the need for thinning and
much longer runs.
2.1 stratigraphical features
2.1.1 blocks
Sometimes, layers might contain material which cannot be assumed to
be in chronological order within that layer (a bit like apple pie), even
though the layer itself can safely be assumed to be older than the
layers above it and younger than the layers below. In this case, we can
assign this ‘block’ of dates to the same position (in this example,
layer 4 contains four unordered dates, and we’re using SHCal20):
| 8881 |
3837 |
77 |
1 |
3 |
| 8882 |
4327 |
87 |
2 |
3 |
| 8883 |
4138 |
83 |
3 |
3 |
| 8884 |
4357 |
87 |
4 |
3 |
| 8885 |
3968 |
79 |
4 |
3 |
| 8886 |
4200 |
84 |
4 |
3 |
| 8887 |
4186 |
84 |
4 |
3 |
| 8888 |
4294 |
86 |
5 |
3 |
| 8889 |
4325 |
86 |
6 |
3 |
| 8890 |
4240 |
85 |
7 |
3 |
Such sites can be modelled too (the blue shading indicates the dates
within the block):
strat("block_example", its=2e6, thinning=20, internal.thinning=20) # takes long to run
Fig. 4 - output of a strat simulation containing
a ‘block’ of mixed dates, while the block is in chronological order with
the layers below and above it.
2.1.2 undated levels
If you’re interested in modelling the ages of undated levels,
in-between dated levels, this can be done in two ways. The first option
is to add an undated level, by adding an entry to your .csv file and
providing the number 10 in the fifth (=cc) column, for example:
| 12263 |
10091 |
202 |
1 |
1 |
| 12549 |
10505 |
210 |
2 |
1 |
| 12760 |
10986 |
220 |
3 |
1 |
| 12918 |
11410 |
228 |
4 |
1 |
| undated |
|
|
5 |
10 |
| 13326 |
11363 |
227 |
6 |
1 |
| 13594 |
12042 |
241 |
7 |
1 |
| 13759 |
11824 |
236 |
8 |
1 |
Any name can be given for the lab ID, and the age and error should be
left empty. Make sure that the position of the undated level is such
that the positions are increasing going down the file. Then run as:
strat("undated_example") # will need a longer run for reliable results (the example below used 600,000 iterations)
# The run's files will be put in this folder: strats/undated_example
# |>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>| 100%
# Done running...
# Removed a burn-in of 100
# Thinning the MCMC by storing every 19 iterations
# 83.54% of the model ages fit within the 95% hpd ranges of the dates, with worst-fitting date 8 (55.44%) and best-fitting date 7 (96.42%)
# Run took 8.15 minutes
Fig. 5 - output of a strat simulation containing
an undated level, at position 5. This modelled age has no accompanying
light-grey ‘shadow’ (which is for calibrated distributions only).
Alternatively, just run your site as usual, and after the run model
the ages between two of the dated levels (Fig. 6 below; for each
iteration this will model random years that fit between the ages of the
dates below and above it):
sim.strat(n=5)
strat(its=100, burnin=0, thinning=1, internal.thinning=1, show.progress=FALSE) # much too short
## The run's files will be put in this folder: strats/mystrat
##
## Done running...
## Removed a burn-in of 0
## Thinning the MCMC by storing every 1 iterations
## Fewer than 1000 MCMC iterations remaining, please consider a longer run by increasing 'its'
## 59.6% of the model ages fit within the 95% hpd ranges of the dates, with worst-fitting date 3 (0%) and best-fitting date 5 (100%)
## Run took 1 seconds
layout(1) # new plot
undated_1.5 <- ages.undated(1.5) # ages between positions 1 and 2
## Min. 1st Qu. Median Mean 3rd Qu. Max.
## 4214 4258 4275 4277 4287 4373
2.1.3 gaps
In some instances, there could be information about the time gaps
between dated levels. These gaps could either be known exactly (e.g.,
tree rings), or with a degree of uncertainty (e.g., varves with counting
uncertainty, or the development of soils which could be assumed to take
an approximately-known amount of time). Coffee can model such gaps as
follows:
| 12263 |
10091 |
202 |
1 |
1 |
| exactgap |
200 |
|
1.5 |
11 |
| 12549 |
10505 |
210 |
2 |
1 |
| 12760 |
10986 |
220 |
3 |
1 |
| normalgap |
100 |
20 |
3.5 |
12 |
| 12918 |
11410 |
228 |
4 |
1 |
| 13326 |
11363 |
227 |
5 |
1 |
| gammagap |
100 |
2 |
5.5 |
13 |
| 13594 |
12042 |
241 |
6 |
1 |
| 13759 |
11824 |
236 |
7 |
1 |
Here, an exact gap is indicated with cc=11, and the size of the gap
is placed in the age field (no error to be added). For a normally
distributed gap size, add cc=12, and the mean and standard error go in
the age and error fields respectively. For a gamma distributed gap size,
add cc=13, and enter the mean and shape in the age and error fields
respectively.
strat("gaps_example") # will need a longer run for reliable results (the example below used 1 million iterations, followed by thinning using the thinner() function)
# The run's files will be put in this folder: strats/gaps_example
# |>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>>| 100%
# Done running...
# Removed a burn-in of 100
# Thinning the MCMC by storing every 7 iterations
# 86.3% of the model ages fit within the 95% hpd ranges of the dates, with worst-fitting date 7 (72.34%) and best-fitting date 3 (96.38%)
# Run took 14.52 minutes
Fig. 6 - output of a strat simulation containing
gaps between dated levels; an exact gap between positions 1 and 2
(Ex(200)), a normally distributed one between positions 3 and 4
(N(100,20)), and a gamma distributed one between positions 5 and 6
(Ga(100,2)). Blue diagonal lines indicate the size and nature of the
gaps. Note that the modelled (dark grey) distributions of dates 1 and 2
are the exact same shape, but shifted by exactly 200 years. The shapes
of the modelled distributions surrounding the normal and gamma gaps show
only some similarity.
For more help, type ?strat.