ubms
is an R package for fitting models of wildlife occurrence and abundance to with datasets where animals are not individually marked. It provides a nearly identical interface to the popular unmarked
package (Fiske, Chandler, and others 2011). Instead of using maximum likelihood to fit models (as with unmarked
), models are fit in a Bayesian framework using Stan (Carpenter et al. 2017). It is generally expected that you are already familiar with unmarked
when using ubms
. You can download ubms
, report issues, or help with development on Github.
There are several advantages to using ubms
over unmarked
. First, it is possible to include random effects in ubms
models, which is not currently possible in unmarked
. These are specified using the familiar syntax of lme4 (Bates et al. 2015). Second, ubms
generates posterior distributions for model parameters, including latent occupancy and abundance parameters. These can be useful for post-hoc analyses and diagnostics. Finally, fitting models with Stan gives you access to the large ecosystem of Stan-related tools, such as LOO (leave-one-out-cross validation; (Vehtari, Gelman, and Gabry 2017)).
Another alternative to ubms
would be to fit models in an existing modeling language such as BUGS, JAGS, or directly in Stan. ubms
abstracts away the complex process of defining and writing custom models in these languages which need to be updated each time you make changes to your model. It also provides many useful helper functions (e.g. predict
) which would otherwise require custom code. Finally, because of Stan’s efficient sampler (Hoffman and Gelman 2014) and because the underlying likelihoods in ubms
are marginalized, ubms
will often fit models much faster than equivalent models in BUGS or JAGS (Yackulic et al. 2020).
Relative to unmarked
, ubms
has fewer types of models available. For example, models that incorporate temporary emigration (like gdistsamp
) (Chandler, Royle, and King 2011) are currently not available in ubms
. Models should run much faster in unmarked
as well. If you do not need one of the specific benefits of ubms
described above, it makes sense to stick with unmarked
. Even if you do plan to use ubms
, it makes sense to test the models in unmarked
first. The similar interface between the two packages makes this very easy, as you will see in the next section.
Relative to BUGS/JAGS/Stan, ubms
is less flexible because you cannot customize your model structure. You are limited to the provided model types. Furthermore, you cannot currently customize prior distributions (although I plan to add this in the future in some form). Finally, writing your own BUGS/JAGS model can be valuable for gaining a deeper understanding of how a model works; ubms
, like unmarked
, is essentially a black box.
To summarize the advantages and disadvantages: I see ubms
as an intermediate step along the continuum from unmarked
to custom models in BUGS/JAGS. It is not meant to replace either approach but rather to supplement them, for situations when a Bayesian framework is needed and “off-the-shelf” model structures are adequate.
Occupancy models estimate the probability \(\psi\) that a species occupies a site, while accounting for detection probability \(p < 1\) (MacKenzie et al. 2002). In order to estimate both \(p\) and \(\psi\), repeated observations (detection/non-detection data) at each site are required.
First, load the dataset we’ll be using, which comes with unmarked
:
The crossbill
dataset is a data.frame
with many columns. It contains detection/non-detection data for the European crossbill (Loxia curvirostra) in Switzerland (Schmid, Zbinden, and Keller 2004).
## [1] 267 58
## [1] "id" "ele" "forest" "surveys" "det991" "det992" "det993"
## [8] "det001" "det002" "det003" "det011" "det012" "det013" "det021"
## [15] "det022" "det023" "det031" "det032" "det033" "det041" "det042"
## [22] "det043" "det051" "det052" "det053" "det061" "det062" "det063"
## [29] "det071" "det072" "det073" "date991" "date992" "date993" "date001"
## [36] "date002" "date003" "date011" "date012" "date013" "date021" "date022"
## [43] "date023" "date031" "date032" "date033" "date041" "date042" "date043"
## [50] "date051" "date052" "date053" "date061" "date062" "date063" "date071"
## [57] "date072" "date073"
Check ?crossbill
for details about each column. The first three columns id
, ele
, and forest
are site covariates.
The following 27 columns beginning with det
are the binary detection/non-detection data; 9 years with 3 observations per year. For this example we want to fit a single-season occupancy model; thus we will use only the first three columns (year 1) of det
as our response variable y
.
## det991 det992 det993
## 1 0 0 0
## 2 0 0 0
## 3 NA NA NA
## 4 0 0 0
## 5 0 0 0
## 6 NA NA NA
Note that missing values are possible. The final 27 columns beginning with date
are the Julian dates for each observation. As with y
we want only the first three columns corresponding to year 1.
Finally, we build our unmarkedFrame
object holding our detection/non-detection data, site covariates, and observation covariates. Since we will conduct a single-season occupancy analysis, we need to use unmarkedFrameOccu
specifically. The resulting unmarkedFrame
can be used by both unmarked
and ubms
.
## Data frame representation of unmarkedFrame object.
## y.1 y.2 y.3 id ele forest date.1 date.2 date.3
## 1 0 0 0 1 450 3 34 59 65
## 2 0 0 0 2 450 21 17 33 65
## 3 NA NA NA 3 1050 32 NA NA NA
## 4 0 0 0 4 950 9 29 59 65
## 5 0 0 0 5 1150 35 24 45 65
## 6 NA NA NA 6 550 2 NA NA NA
## 7 0 0 0 7 750 6 26 54 74
## 8 0 0 0 8 650 60 23 43 71
## 9 0 0 0 9 550 5 21 36 56
## 10 0 0 0 10 550 13 37 62 75
First, we fit a null model (no covariates) in unmarked
using the occu
function. The occu
function requires as input a double formula (for detection and occupancy, respectively) along with our unmarkedFrame
.
##
## Call:
## occu(formula = ~1 ~ 1, data = umf)
##
## Occupancy:
## Estimate SE z P(>|z|)
## -0.546 0.218 -2.51 0.0121
##
## Detection:
## Estimate SE z P(>|z|)
## -0.594 0.208 -2.86 0.00426
##
## AIC: 511.2538
Next, we fit the same model in ubms
. The equivalent to occu
in ubms
is stan_occu
. Functions in ubms
generally use this stan_
prefix, based on the approach used in package rstanarm for GLMs. We need to provide the same arguments to stan_occu
. In addition, we will specify that we want 3 MCMC chains (chains=3
), with 300 iterations per chain (iter=300
) of which the first half will be warmup iterations. It is beyond the scope of this vignette to discuss the appropriate number or length of chains; see the Stan user’s guide for more details. Generally 4 chains of 2000 iterations each is recommended (of which 1000 per chain are warmups). Thus, 300 iterations per chain is probably not enough, but to keep things running quickly it is sufficient for this vignette. Note that if you are more familiar with BUGS or JAGS, Stan generally requires a smaller number of iterations to reach convergence thanks to its default NUTS sampler (Hoffman and Gelman 2014). If you have a good multi-core CPU, you can run chains in parallel. Tell Stan how many parallel cores you want to use by assigning a value to the cores
argument.
##
## Call:
## stan_occu(formula = ~1 ~ 1, data = umf, chains = 3, iter = 300,
## refresh = 0)
##
## Occupancy (logit-scale):
## Estimate SD 2.5% 97.5% n_eff Rhat
## -0.506 0.231 -0.903 -0.0105 122 1.01
##
## Detection (logit-scale):
## Estimate SD 2.5% 97.5% n_eff Rhat
## -0.603 0.217 -1.05 -0.15 99.4 1
##
## LOOIC: 511.844
## Runtime: 1.077 sec
The structure of the output from unmarked
and ubms
is intentionally similar. Estimates of the occupancy and detection parameters are also similar, but not identical. For a more direct comparison, call the coef
function on both model objects:
## unmarked stan
## psi(Int) -0.5461203 -0.5061865
## p(Int) -0.5939612 -0.6032395
Let’s look at the output from our fit_stan
model again:
##
## Call:
## stan_occu(formula = ~1 ~ 1, data = umf, chains = 3, iter = 300,
## refresh = 0)
##
## Occupancy (logit-scale):
## Estimate SD 2.5% 97.5% n_eff Rhat
## -0.506 0.231 -0.903 -0.0105 122 1.01
##
## Detection (logit-scale):
## Estimate SD 2.5% 97.5% n_eff Rhat
## -0.603 0.217 -1.05 -0.15 99.4 1
##
## LOOIC: 511.844
## Runtime: 1.077 sec
The first part (under Call:
) is the command we used to get this model output. Underneath are two tables, one per submodel, corresponding to the occupancy and detection parts of the model. Within each table there is one row per parameter in the submodel. Since fit_stan
had no covariates, there is only an intercept term for each submodel. Model parameters in this summary table are always shown on the appropriate transformed scale, in this case logit. To get the corresponding probabilities, you can use the predict
function, which we will demonstrate later.
For each parameter, the mean and standard deviation of the posterior distribution are given. Unlike unmarked
output, there is no \(Z\) or \(p\)-value. Instead, there is a 95% uncertainty interval provided.
The final two columns in each summary table n_eff
and Rhat
are MCMC diagnostics. We will discuss their meaning later.
To extract summary values into an R table for easy manipulation, use the summary
method. Note that you have to specify which submodel you want ("state"
for occupancy or "det"
for detection).
## [1] -0.5061865
To extract the entire posterior for a parameter, use the extract
method. To avoid name collisions you need to use the full name of the parameter (which contains both the submodel and the parameter name) when extracting. To see a list of the available full parameter names, use the names
method.
## [1] "beta_state[(Intercept)]" "beta_det[(Intercept)]"
Now we’ll fit two candidate models to the crossbill
data in ubms
and compare them.
Along with our previous null model, we’ll fit a “global” model with both site and observation covariates. This is just an example; perhaps other models should also be considered if we were preparing this analysis for publication. In our model formulas, we have normalized all covariates with scale
so they have a mean of 0 and a standard deviation of 1. This can help improve model convergence and is generally a good idea.
fit_null <- fit_stan
fit_global <- stan_occu(~scale(date)~scale(forest)+scale(ele), data=umf,
chains=3, iter=300)
## Warning: Bulk Effective Samples Size (ESS) is too low, indicating posterior means and medians may be unreliable.
## Running the chains for more iterations may help. See
## http://mc-stan.org/misc/warnings.html#bulk-ess
## Warning: Tail Effective Samples Size (ESS) is too low, indicating posterior variances and tail quantiles may be unreliable.
## Running the chains for more iterations may help. See
## http://mc-stan.org/misc/warnings.html#tail-ess
The fit_global
model gave us some warnings about the effective sample size (n_eff
) along with a suggested solution. We will ignore this warning for now but normally it is a good idea to pay close attention to these warnings.
First we combine the models into a fitList
:
Then we generate a model selection table:
## elpd nparam elpd_diff se_diff weight
## fit_global -236.374 5.439 0.000 0.000 0.966
## fit_null -255.922 2.468 -19.548 6.501 0.034
Instead of AIC, models are compared using leave-one-out cross-validation (LOO) (Vehtari, Gelman, and Gabry 2017) via the loo
package. Based on this cross-validation, the expected predictive accuracy (elpd
) for each model is calculated. The model with the largest elpd
(fit_global
) performed best. The elpd_diff
column shows the difference in elpd
between a model and the top model; if this difference is several times larger than the standard error of the difference (se_diff
), we are confident the model with the larger elpd
performed better. LOO model weights, analogous to AIC weights, are also calculated. We can see that the fit_global
model is clearly the best performing model.
You can obtain LOO information for a single model using the loo
method:
##
## Computed from 450 by 245 log-likelihood matrix
##
## Estimate SE
## elpd_loo -236.4 19.2
## p_loo 5.4 0.6
## looic 472.7 38.5
## ------
## Monte Carlo SE of elpd_loo is 0.1.
##
## All Pareto k estimates are good (k < 0.5).
## See help('pareto-k-diagnostic') for details.
The looic
value is analogous to AIC.
You can also obtain the WAIC (Widely Applicable Information Criterion) if you prefer (Vehtari, Gelman, and Gabry 2017):
##
## Computed from 450 by 245 log-likelihood matrix
##
## Estimate SE
## elpd_waic -236.3 19.2
## p_waic 5.4 0.5
## waic 472.7 38.5
We’ll define the global model as our top model:
##
## Call:
## stan_occu(formula = ~scale(date) ~ scale(forest) + scale(ele),
## data = umf, chains = 3, iter = 300, refresh = 0)
##
## Occupancy (logit-scale):
## Estimate SD 2.5% 97.5% n_eff Rhat
## (Intercept) -0.637 0.305 -1.142 0.0877 139 1
## scale(forest) 1.059 0.290 0.590 1.8050 216 1
## scale(ele) 0.549 0.225 0.103 0.9826 395 1
##
## Detection (logit-scale):
## Estimate SD 2.5% 97.5% n_eff Rhat
## (Intercept) -0.734 0.237 -1.22 -0.327 196 0.998
## scale(date) 0.554 0.176 0.24 0.911 517 0.995
##
## LOOIC: 472.748
## Runtime: 1.473 sec
Again looking at the summary of fit_top
, we conclude MCMC chains have converged if all \(\hat{R} > 1.05\). To visualize convergence, look at the traceplots:
Our effective sample size n_eff
is lacking for some parameters as we were previously warned. The rule of thumb is to have n_eff
> 100 * number of chains (300). The easy solution would be to re-run this model with more iterations.
Calculating residuals is tricky for occupancy models. There isn’t one widely accepted way of doing it. ubms
implements the approach of Wright (Wright, Irvine, and Higgs 2019) in which residuals are calculated separately for the state and observation processes. To quickly plot residuals against fitted values, use the plot
method:
Note that the residuals are automatically binned, which is appropriate for a binomial response (Gelman and Hill 2007). If the model fits the data well, you would expect 95% of the binned residual points to fall within the shaded area. You can also plot residuals against covariate values using the plot_residuals
function:
ubms
also supports goodness-of-fit tests (posterior predictive checks) for some models. In the case of occupancy models, there is support for the MacKenzie-Bailey (M-B) chi-square test (MacKenzie and Bailey 2004) via the gof
function. For each posterior draw, the M-B statistic is calculated for the actual data and for a simulated dataset. The proportion of draws for which the simulated statistic is larger than the actual statistic should be near 0.5 if the model fits well.
## MacKenzie-Bailey Chi-square
## Point estimate = 27.134
## Posterior predictive p = 0.03
Our model does not appear to fit well based on this posterior predictive check. The first step to addressing this would be to run the model for more iterations to make sure that isn’t the reason.
You can use the posterior_predict
function to simulate new datasets, which you can use to calculate your own fit statistic. The following command generates 100 simulated datasets.
## [1] 100 801
The output is a matrix with dimensions draws x observations (in site-major order). As an example, we can calculate the proportion of zeros in each simulated dataset
and compare that to the proportion of zeros in the actual dataset.
Based on the 95% uncertainty intervals, both forest and elevation have a positive effect on occupancy probability (both intervals do not contain 0). Similarly, Julian date has a positive impact on detection probability. We can quickly visualize these marginal covariate effects with the plot_effects
function:
As with unmarked
, we can get the predicted \(psi\) or \(p\) for each site or observation using the predict
function. For example, to get occupancy:
## Predicted SD 2.5% 97.5%
## 1 0.08309212 0.03619703 0.03585110 0.1694736
## 2 0.14952154 0.05343093 0.07280599 0.2801826
## 3 0.30075314 0.06535689 0.20308578 0.4643460
## 4 0.14309649 0.04086686 0.08340271 0.2406871
## 5 0.34358257 0.07031270 0.23695955 0.5189747
## 6 0.08619583 0.03578137 0.03787254 0.1740162
You can also supply newdata as a data.frame
.
## Predicted SD 2.5% 97.5%
## 1 0.1358938 0.06169819 0.05647073 0.2928962
One of the advantages of BUGS/JAGS is that you can directly model latent parameters, such as the true unobserved occupancy state of a site \(z\). Using the posterior_predict
function in ubms
, you can generate an equivalent posterior distribution of \(z\).
## [1] 100 267
The output has one row per posterior draw, and one column per site. The posterior of \(z\) can be useful for post-hoc analyses. For example, suppose you wanted to test for a difference in mean occupancy probability between sites 1-50 and sites 51-100:
group1 <- rowMeans(zpost[,1:50], na.rm=TRUE)
group2 <- rowMeans(zpost[,51:100], na.rm=TRUE)
plot_dat <- rbind(data.frame(group="group1", occ=mean(group1),
lower=quantile(group1, 0.025),
upper=quantile(group1, 0.975)),
data.frame(group="group2", occ=mean(group2),
lower=quantile(group2, 0.025),
upper=quantile(group2, 0.975)))
Now plot the posterior distributions of the two means:
library(ggplot2)
ggplot(plot_dat, aes(x=group, y=occ)) +
geom_errorbar(aes(ymin=lower, ymax=upper), width=0.2) +
geom_point(size=3) +
ylim(0,1) +
labs(x="Group", y="Occupancy + 95% UI") +
theme_bw() +
theme(panel.grid.major=element_blank(), panel.grid.minor=element_blank(),
axis.text=element_text(size=12), axis.title=element_text(size=14))
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Schmid, Hans, Niklaus Zbinden, and Verena Keller. 2004. “Überwachung Der Bestandsentwicklung Häufiger Brutvögel in Der Schweiz.” Swiss Ornithological Institute Sempach Switzerland.
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