Welcome to bayclumpr
!
Before we get started with this tutorial, we would like to remind you
that there is an associated shiny app that accompanies this
R
package. You can access BayClump
directly
from your browser using by clicking here. Now, let’s
go ahead and discuss some of the basic functions in
bayclumpr
.
bayclumpr
First, we will need some data to work with. We can use
bayclumpr
to generate simulated datasets with uncertainty
values described in Roman-Palacios et al. (2022). For this example, we
will simulate 50 observations under a low-eror scenario. Note
that the functions in bayclumpr
expect users to provide
uncertainty in terms of standard deviation. The resulting
dataset will be stored in the ds
object.
ds <- cal.dataset(error = "S1", nobs = 50)
head(ds)
#> x_TRUE Temperature TempError y_TRUE D47error D47 Material
#> 1 10.076133 10.089943 0.013809939 0.6475262 -0.0032283733 0.6442978 1
#> 2 11.414949 11.399569 -0.015379377 0.6841481 0.0065876134 0.6907357 1
#> 3 12.517576 12.522651 0.005074617 0.7430624 0.0012176807 0.7442800 1
#> 4 9.695736 9.662728 -0.033008011 0.6333012 0.0021347308 0.6354360 1
#> 5 12.391566 12.364749 -0.026817078 0.7379670 0.0027211068 0.7406881 1
#> 6 12.060248 12.051630 -0.008617473 0.7206252 0.0005650349 0.7211903 1
Now, let’s start by fitting different models in the simulated
dataset. For instance, let’s fit a Deming regression model using the
cal.deming
function in bayclumpr
:
cal.deming(data = ds, replicates = 10)
#> alpha beta
#> 1 0.2440497 0.03906877
#> 2 0.2614754 0.03670698
#> 3 0.2760968 0.03574009
#> 4 0.2419661 0.03857797
#> 5 0.2752911 0.03585697
#> 6 0.2526154 0.03764163
#> 7 0.2497403 0.03784485
#> 8 0.2505127 0.03785190
#> 9 0.2590315 0.03708834
#> 10 0.2057244 0.04158558
Alternatively, you can fit an unweighted or weighted OLS regression
using cal.ols
and cal.wols
functions,
respectively:
cal.ols(data = ds, replicates = 10)
#> alpha beta
#> 1 0.2839352 0.03554307
#> 2 0.2872762 0.03527608
#> 3 0.2733101 0.03642586
#> 4 0.2640842 0.03709674
#> 5 0.2652946 0.03701428
#> 6 0.2668595 0.03679151
#> 7 0.2660233 0.03687870
#> 8 0.2826984 0.03542715
#> 9 0.2693398 0.03663859
#> 10 0.2850873 0.03507551
cal.wols(data = ds, replicates = 10)
#> alpha beta
#> 1 0.2557905 0.03789321
#> 2 0.2734807 0.03632590
#> 3 0.2716440 0.03643221
#> 4 0.2711929 0.03621119
#> 5 0.2743809 0.03625556
#> 6 0.2716777 0.03629290
#> 7 0.2765445 0.03604140
#> 8 0.2747726 0.03619440
#> 9 0.2710448 0.03650991
#> 10 0.2699076 0.03685035
York regression models are also implemented in
bayclumpr
:
cal.york(data = ds, replicates = 10)
#> alpha beta
#> 1 0.2502012 0.03822585
#> 2 0.2417208 0.03889872
#> 3 0.2430982 0.03835195
#> 4 0.2689329 0.03625636
#> 5 0.2714125 0.03611063
#> 6 0.2638400 0.03685362
#> 7 0.2897728 0.03520313
#> 8 0.2755461 0.03600768
#> 9 0.2630668 0.03715828
#> 10 0.2678943 0.03654801
Finally, bayclumpr
implements three types of Bayesian
linear models that are used for calibrations and temperature
reconstructions. Let’s fit all three models using the
cal.bayesian
function:
BayesCal <- cal.bayesian(calibrationData = ds, numSavedSteps = 3000, priors = "Weak", MC = FALSE)
#>
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The results are here stored in the BayesCal
object and
corresponds to stan
objects summarizing posterior
distributions of the parameters:
bayclumpr
bayclumpr
implements two functions to perform
temperature reconstructions under frequentist (rec.clumped
)
and Bayesian frameworks (rec.bayesian
). Let’s review how
each of these functions work by generating a synthetic dataset for two
samples.
recData <- data.frame(Sample = paste("Sample", 1:9),
D47 = rep(c(0.6, 0.7, 0.8), 3),
D47error = c(rep(0.005,3), rep(0.01,3), rep(0.02,3)),
N = rep(2, 9),
Material = rep(1, 9))
As for the calibration step, bayclumpr
expects
uncertainty (D47error
) to be expressed in terms of standard
deviation. Note that the recData
object generated above
includes the smallest number of columns that are needed to perform
reconstructions in bayclumpr
.
From this point, we will need to either specify the distribution of
parameter estimates from the calibration step. For instance, let’s
assume that we were interested in reconstructing temperatures for our
recData
under an OLS model. First, we would have to run our
calibration analyses:
From this point, we can use the rec.clumped
to
reconstruct temperatures based on the reconstruction dataset
(recData
argument) and the observed calibration object
(obCal
argument):
rec.clumped(recData = recData, obCal = paramdist)
#> Sample D47 D47error meanTemp error
#> 1 Sample 1 0.6 0.005 59.79108 2.509437
#> 2 Sample 2 0.7 0.005 18.30648 1.687880
#> 3 Sample 3 0.8 0.005 -10.74432 1.233827
#> 4 Sample 4 0.6 0.010 59.79108 4.962974
#> 5 Sample 5 0.7 0.010 18.30648 3.346772
#> 6 Sample 6 0.8 0.010 -10.74432 2.450411
#> 7 Sample 7 0.6 0.020 59.79108 9.710425
#> 8 Sample 8 0.7 0.020 18.30648 6.580837
#> 9 Sample 9 0.8 0.020 -10.74432 4.833432
The resulting object includes information from the template
reconstruction dataset but also information on the reconstructed
temperature and associated uncertainty (1 SD
). Let’s now
perform reconstructions but under a Bayesian framework. For this, we
will again need parameter estimates derived from the calibration step
(see the BayesCal
created above). We will perform
reconstructions under only a single of the Bayesian models equivalent to
the OLS but fit under a Bayesian framework
(BayesCal$BLM1_fit_NoErrors
).
PredsBay <- rec.bayesian(calModel = BayesCal$BLM1_fit_NoErrors, recData = recData, iter = 1000, postcalsamples = 100, MC = FALSE)
#>
#> SAMPLING FOR MODEL 'd9c8b77ff79c7cb5c71ff874a6d29fd0' NOW (CHAIN 1).
#> Chain 1:
#> Chain 1: Gradient evaluation took 7.6e-05 seconds
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The associated reconstructions to this Bayesian model are shown below:
PredsBay
#> Sample D47 D47error meanTemp error
#> 1 Sample 1 0.6 0.005 60.21022 0.7226459
#> 2 Sample 2 0.7 0.005 18.70703 0.4668382
#> 3 Sample 3 0.8 0.005 -10.36620 0.3430503
#> 4 Sample 4 0.6 0.010 60.19585 0.6755755
#> 5 Sample 5 0.7 0.010 18.69667 0.5170229
#> 6 Sample 6 0.8 0.010 -10.36899 0.3411882
#> 7 Sample 7 0.6 0.020 60.19985 0.7097546
#> 8 Sample 8 0.7 0.020 18.71255 0.4440080
#> 9 Sample 9 0.8 0.020 -10.37417 0.3605431
We have reviewed the most fundamental aspects of using
bayclumpr
. More advances analyses involving alternative
priors in Bayesian models are an option.