ecocbo is an R package that helps scientists determine the optimal sampling effort for community ecology studies. It can be used to calculate the minimum number of samples needed to achieve a desired level of precision, or to fit within a set economic budget as proposed by Underwood (1997, ISBN 0 521 55696 1). ecocbo is based on the principles of ecological simulation as done in the SSP package. A pilot study can be used to estimate the natural variability of the system, which in turn is used to calculate the optimal sampling effort. ecocbo is a valuable tool for scientists who need to design efficient sampling plans. It can save time and money by ensuring that scientists collect the minimum amount of data necessary to achieve their research goals.
ecocbo is composed of four main functions:
As it was stated in the introduction, ecocbo uses
simulated ecological communities as produced by
SSP:simdata()
to take advantage of the considerations of
natural variability that it produces. As such, it is necessary to
prepare the data using the tools provided by SSP.
To get a feeling of the functionality of ecocbo, you can follow the next basic example.
The provided data epiDat
is a subset of the original
epibionts
(Guerra-Castro, et al., 2021). It was prepared by
looking for communities that were as different as possible within the
dataset. The first step or preparing the data is to save it in two
different objects: epiH0
in which the data is treated as if
it came from the same site thus accepting the null hypothesis, and
epiHa
in which the opposite is true, so that the samples
come from different sites and portray different characteristics. The
defining variable for doing so is site
which will be set to
a single label for epiH0
, and left as-is for
epiHa
.
The workflow fir SSP requires the computation of
simulation parameters, this is done with SSP::assempar()
and using the same arguments for both datasets. Both datasets are then
used for the simulation of ecological communities, which is done by
SSP::simdata()
, and that results in the data that we will
use to work with ecocbo.
To ensure that the resulting datasets are the same size, the
parameters sites
and N
for
SSP::simdata(parH0, ...)
must be set to 1 and the product
of sites
and N
in
SSP::simdata(parHa, ...)
, respectively. For this example,
the values used to calculate simH0 are
sites=1
and N=1000
, and then
sites=10
and N=100
for simHa,
which results in 3 matrices (cases=3
) of 1000 rows and 95
columns (the number of columns depends on the simulation parameters from
SSP::assempar()
) for both of the resulting datasets.
# Load data and adjust it.
data(epiDat)
epiH0 <- epiDat
epiH0[,"site"] <- as.factor("T0")
epiHa <- epiDat
epiHa[,"site"] <- as.factor(epiHa[,"site"])
# Calculate simulation parameters.
parH0 <- SSP::assempar(data = epiH0, type = "counts", Sest.method = "average")
parHa <- SSP::assempar(data = epiHa, type = "counts", Sest.method = "average")
# Simulation.
simH0Dat <- SSP::simdata(parH0, cases = 3, N = 1000, sites = 1)
simHaDat <- SSP::simdata(parHa, cases = 3, N = 100, sites = 10)
sim_beta() computes the statistical power for a
combination of up to m
sites and n
samples per
site. Its arguments are:
Argument | Description |
---|---|
simH0 | Simulated community from SSP::simdata() in
which there is only one site. |
simHa | Simulated community from SSP::simdata() in
which there are more than one site. |
n | Maximum number of samples to consider. |
m | Maximum number of sites. |
k | Number of resamples the process will take. Defaults to 50. |
alpha | Level of significance for Type I error. Defaults to 0.05. |
transformation | Mathematical function to reduce the weight of very dominant species. Options are: ‘square root’, ‘fourth root’, ‘Log (X+1)’, ‘P/A’, ‘none’ |
method | The appropriate distance/dissimilarity metric that will
be used by vegan::vegdist() (e.g. Gower, Bray–Curtis,
Jaccard, etc). |
dummy | Logical. It is recommended to use TRUE in cases where there are observations that are empty. |
useParallel | Logical. Should R call to several cores to work on parallel computing? This is done to speed up the processing time. |
The value of k
defines the number of times that the
combination of sites and samples will be considered to form a
statistical distribution that will establish, along with
alpha
, the probability of type I error from the simulated
data. Higher values of k
will increase the computational
intensity of the process, which may result in slower execution
times.
The function returns an object of class ecocbo_beta which
prints to a table showing the statistical power at different sampling
efforts. The object, however, is a list that contains two data frames,
one comprising the information about power and beta, and a second one
that lists the results of the resampling of values indicated by
k
.
betaResult <- sim_beta(simH0Dat, simHaDat, n = 5, m = 4, k = 30, alpha = 0.05,
transformation = "square root", method = "bray", dummy = FALSE,
useParallel = FALSE)
betaResult
#> Power at different sampling efforts (m x n):
#> n = 2 n = 3 n = 4 n = 5
#> m = 2 0.27 0.71 0.72 0.75
#> m = 3 0.23 0.73 0.88 0.95
#> m = 4 0.50 0.84 0.99 1.00
plot_power() makes plots for either a power curve, a density plot, or both. Its parameters are:
Argument | Description |
---|---|
data | Object of class “ecocbo_beta” that results from sim_beta(). |
n | Defaults to NULL, and then the function computes the number of samples (n) that results in a sampling effort close to 95% in power. If provided, said number of samples will be used. |
m | Site label to be used as basis for the plot. |
method | The desired plot. Options are “power”, “density” or “both”. |
The power curve plot shows that the power of the study increases as the sample size increases, and the density plot shows the overlapping areas where alpha and beta are significant.
The argument n
is set to NULL by default, if it is left
like that, the the function looks for a number of samples that allows
for a power that is close to \((1-alpha)\), otherwise it uses the value
stated by the user. In either case, the computed or provided value is
marked in red in the plot.
scompvar() calculates the components of variation within sites and among replicates. Its arguments are:
Argument | Description |
---|---|
data | Object of class “ecocbo_beta” that results from sim_beta(). |
n | Site label to be used as basis for the computation. Defaults to NULL. |
m | Number of samples to be considered. Defaults to NULL. |
If m
or n
are left as NULL, the function
will calculate the components of variation using the largest available
values as set in the experimental design in
sim_beta().
sim_cbo() estimates the optimal number of sites and replicates per site to perform based on either available budget or desired precision.
Argument | Description |
---|---|
comp.var | Data frame as obtained from scompvar(). |
multSE | Optional. Required multivariate standard error for the sampling experiment. |
ct | Optional. Total cost for the sampling experiment. |
ck | Cost per replicate. |
cj | Cost per unit. |
It is necessary to indicate one of the two optional arguments, as that parameter dictates if the function will work either based on budget or precision.
cboCost <- sim_cbo(comp.var = compVar, ct = 20000, ck = 100, cj = 2500)
cboCost
#> nOpt mOpt
#> 1 10 5
cboPrecision <- sim_cbo(comp.var = compVar, multSE = 0.10, ck = 100, cj = 2500)
cboPrecision
#> nOpt mOpt
#> 1 10 10
Underwood, A. J. (1997). Experiments in ecology: their logical design and interpretation using analysis of variance. Cambridge university press.
Underwood, A. J., & Chapman, M. G. (2003). Power, precaution, Type II error and sampling design in assessment of environmental impacts. Journal of Experimental Marine Biology and Ecology, 296(1), 49-70.
Anderson, M. J. (2017). Permutational Multivariate Analysis of Variance (PERMANOVA). Wiley StatsRef: Statistics Reference Online. John Wiley & Sons, Ltd.
Guerra-Castro, E. J., J. C. Cajas, F. N. Dias Marques Simoes, J. J. Cruz-Motta, and M. Mascaro. (2020). SSP: An R package to estimate sampling effort in studies of ecological communities. bioRxiv:2020.2003.2019.996991.