library(pcvr)
library(data.table) # for fread
library(ggplot2)
library(patchwork) # for easy ggplot manipulation/combination
library(brms)
Longitudinal modeling allows users to take full advantage of accurate and non-destructive data collection possible through high throughput image based phenotyping. Using longitudinal data accurately requires some understanding of the statistical challenges associated with it. Statistical complications including changes in variance (heteroskedasticity), non-linearity, and autocorrelation (plant’s day to day self similarity) present potential problems in analyses. To address this kind of data several functions are provided to make fitting appropriate growth models more straightforward.
The brms
package is not automatically imported by pcvr
, so before fitting brms
models we need to load that package. For details on installing brms
and either rstan
or cmdstanr
(with cmdstanr
being recommended), see the linked documentation. Note that if you install pcvr
from github with dependencies=T
then cmdstanr
and brms
will be installed.
Once cmdstanr
is installed we also need to set the cmdstan path and link cmdstan to R, which is all done easily by cmdstanr
. For example, packages can be installed and prepped using this code.
if (!"cmdstanr" %in% installed.packages()) {
install.packages("cmdstanr", repos = c("https://mc-stan.org/r-packages/", getOption("repos")))
}if (!"brms" %in% installed.packages()) {
install.packages("brms")
}library(brms)
library(cmdstanr)
::install_cmdstan() cmdstanr
Based on literature and experience there are six common plant growth models that make up the “main” models in growthSS
, although 13 are supported. Those main six growth models are supported in pcvr
across each of four available backend functions (nls
, nlrq
, nlme
, and brms
). The mgcv
backend can also be used to fit generalized additive models (GAMS) to any of these growth curves as well. In addition to these six main models GAMs, double logistic, and double gompertz models are supported across the four available parameter based backends. The parameterizations of these models are explained below.
The logistic function here is implemented as a 3 parameter sigmoidal growth curve: \(A / (1 + e^{(B-x)/C} )\)
In this model A is the asymptote, B is the inflection point, and C is the growth rate.
The gompertz function here is also a 3 parameter sigmoidal growth curve: \(A * e^{(-B * e^{(-C*x)})}\)
In this model A is the asymptote, B is the inflection point, and C is the growth rate.
The gompertz formula is more complex than the logistic formula, which tends to make the model slightly harder to fit in terms of time and computation. The benefit to that extra effort is that the gompertz curve is more flexible than the logistic curve and does not have to stop growing at the same rate as it initially started growing. In the author’s experience gompertz growth models have provided the best fit to sigmoidal data, but sometimes the speed and familiarity of the logistic function may be compelling.
The monomolecular function here is a 2 parameter asymptotic growth curve: \(A-A * e^{(-B * x)}\)
Once again, A is the asymptote but now B is the growth rate.
This model has often fit well for height or width phenotypes, but you should make model choices based on your data/expectations.
The exponential function here is a 2 parameter non-asymptotic growth curve bearing strong similarity to the monomolecular formula: \(A * e^{(B * x)}\)
Here A is a scale parameter and B is the growth rate.
Most plants do not grow indefinitely, although many may grow exponentially through the course of an experiment (think of the first half of a logistic or gompertz curve). In those cases you may wish to use an exponential model or if you are using the brms
backend then you may wish to rely on some prior information about an asymptote that would eventually be achieved to use a sigmoidal model.
The power law function here is a 2 parameter non-asymptotic growth curve: \(A * x^B\)
Here A is a scale parameter and B is the growth rate. The formula becomes linear when B is 1, shows slowing growth over time when 0 < B < 1 and shows growth speed increasing over time (the exponential) when B > 1.
These models can allow for slowing growth over time but without the expectation that growth ever truly stops.
The linear function here is simply: \(A * x\)
Here A is the growth rate and the intercept is assumed to be 0.
The double logistic function here is just two combined logistic functions: \(A / (1+e^{((B-x)/C)}) + ((A2-A) /(1+e^{((B2-x)/C2)}))\)
Here the parameters have the same interpretation as those in the logistic curve, but for the first and second component separately.
This is intended for use with recover experiments, not for any data with very minor hiccups in the overall trend. Additionally, with the brms
backend the segmented models allow for a more flexible implementation as logistic+logistic
, although in that implementation the values for A and B are not relative.
The double logistic function here is just two combined gompertz functions: \(A * e^{(-B * e^{(-C*x)})} + ((A2-A) * e^{(-B2 * e^{(-C2*(x-B))})})\)
Here the parameters have the same interpretation as those in the gompertz curve, but for the first and second component separately.
All the same points as with the double logistic curve apply here as well.
The weibull growth curve is derived from the generalized extreme value distribution and is comparable to the gompertz growth model option, but may be slightly easier to fit/faster moving in some cases.
The gumbel growth curve is also derived from the generalized EVD and would be used in similar contexts as the weibull or gompertz model options. The choice of which to use is left to individual users and the conventions of your field.
This is the final option derived from the generalized EVD. Note that here a 3 parameter version is used with the location (m) set to 0 by default.
The Bragg model is a dose-response curve that models the minima and maxima using 3 parameters.
The Lorentz model is a dose-response curve that models the minima and maxima using 3 parameters. This parameterization may has a slightly more intuitive formula than Bragg for some people but has worse statistical qualities.
The Beta model is based on the PDF of the beta distribution and models minima/maxima as a dose-response curve using 5 parameters. This can be a difficult model to fit but can describe non-symmetric dose-response relationships well.
Finally, all backends can fit GAMs. These are unparameterized functions that use a series of splines to fit a variety of trends.
In general these are less useful since they do not give directly interpretable parameters, but their flexibility can be valuable if your data does not fit some more standard model well.
Data from any parameterized model can be simulated using growthSim
. Through this vignette we will use data created in this way to show modeling options.
growthSim("logistic", n = 20, t = 25, params = list(
simdf <-"A" = c(200, 160),
"B" = c(13, 11),
"C" = c(3, 3.5)
)) ggplot(simdf, aes(time, y, group = interaction(group, id))) +
l <- geom_line(aes(color = group)) +
labs(title = "Logistic") +
theme_minimal() +
theme(legend.position = "none")
growthSim("gompertz", n = 20, t = 25, params = list(
simdf <-"A" = c(200, 160),
"B" = c(13, 11),
"C" = c(0.2, 0.25)
)) ggplot(simdf, aes(time, y, group = interaction(group, id))) +
g <- geom_line(aes(color = group)) +
labs(title = "Gompertz") +
theme_minimal() +
theme(legend.position = "none")
growthSim("monomolecular", n = 20, t = 25, params = list("A" = c(200, 160), "B" = c(0.08, 0.1)))
simdf <- ggplot(simdf, aes(time, y, group = interaction(group, id))) +
m <- geom_line(aes(color = group)) +
labs(title = "Monomolecular") +
theme_minimal() +
theme(legend.position = "none")
growthSim("exponential", n = 20, t = 25, params = list("A" = c(15, 20), "B" = c(0.095, 0.095)))
simdf <- ggplot(simdf, aes(time, y, group = interaction(group, id))) +
e <- geom_line(aes(color = group)) +
labs(title = "Exponential") +
theme_minimal() +
theme(legend.position = "none")
growthSim("linear", n = 20, t = 25, params = list("A" = c(1.1, 0.95)))
simdf <- ggplot(simdf, aes(time, y, group = interaction(group, id))) +
ln <- geom_line(aes(color = group)) +
labs(title = "Linear") +
theme_minimal() +
theme(legend.position = "none")
growthSim("power law", n = 20, t = 25, params = list("A" = c(16, 11), "B" = c(0.75, 0.7)))
simdf <- ggplot(simdf, aes(time, y, group = interaction(group, id))) +
pl <- geom_line(aes(color = group)) +
labs(title = "Power Law") +
theme_minimal() +
theme(legend.position = "none")
(l + g + m) / (e + ln + pl)
patch <- patch
As previously mentioned there are five backends supported in pcvr
. Here we will go over those backends in more detail. These backends are selected using one of nls, nlrq, nlme, mgcv, or brms which correspond to the functions shown in this table.
“nls” | “nlrq” | “nlme” | “mgcv” | “brms” |
---|---|---|---|---|
stats::nls |
quantreg::nlrq |
nlme::nlme |
mgcv::gam |
brms::brms |
nls
The nls
backend is the simplest option. These models account for non-linearity using any of the aforementioned model types and fit very quickly but do not have ways to take autocorrelation or heteroskedasticity into account.
nlrq
The nlrq
backend fits non-linear quantile models to specified quantiles of the data. These models account for non-linearity and account for heteroskedasticity in a non-parametric quantile based way (fitting 2.5% and 97.5% models will provide something like a 95% confidence interval that changes width across time as the data does).
nlme
The nlme
backend fits non-linear mixed effect models. These models account for non-linearity, autocorrelation, and to have options to model the heteroskedasticity.
mgcv
The mgcv
backend only fits GAMs, which do account for non-linearity but do not account for heteroskedasticity and autocorrelation and do not return interpretable parameters.
brms
The brms
backend fits hierarchical Bayesian models that account for non-linearity, autocorrelation and heteroskedasticity. These models are more flexible than any of the other options and are the focus of the Advanced Growth Modeling Tutorial.
pcvr
At a high level the relevant functions in pcvr
are growthSS
, fitGrowth
, growthPlot
, and testGrowth
.
growthSS
specifies self starting growth models and returns a list that is used by fitGrowth
fitGrowth
fits a growth model specified by growthSS
and returns a model or a list of model options.
growthPlot
visualizes the model fit. This is particularly helpful with brms
models to check their heteroskedastic sub models.
testGrowth
tests model parameters against nested versions of the same models to allow for straightforward hypothesis testing on frequentist (non-brms
) models. For brms
models the brms::hypothesis
function should be used.
growthSS
growthSS
is the first pcvr
helper function for setting up longitudinal models. growthSS
will return a list of elements used to fit a longitudinal model including a formula, starting values (or priors for brms
values), data to use, and several elements used internally in other functions.
growthSS
takes five arguments which specify the model to use, a simplified formula specifying the columns of your data to use, a sigma option, the data to use, and starting values/priors. The model and data to use are relatively straightforward, compare a plot of your data against the general shapes of the model parameterizations shown above to pick a model type and pass your dataframe to the df
argument. The remaining arguments are explained below.
growthSS(..., form, ...)
The form
argument of growthSS
needs to specify the outcome variable, the time variable, an identifier for individuals, and the grouping structure. These are passed as a formula object, using similar syntax to lme4
and brms
, such as outcome ~ time|individual_id/group_id
. Verbally this would be read as “outcome modeled by time accounting for correlation between individual_id’s with fixed effects specified per each group_id”. Note that this formula will not have to change for different growth models, this is only to specify the structure of your data. This simplification requires each of these parts of the formula must be a single column in your dataframe. Note that for each group in your data a set of parameters will be estimated. If you have lots of groups in your data then it may make sense to fit models to only a few groups at a time. If you do that then the models can still be compared by extracting the MCMC draws, combining them into a dataframe, then using brms::hypothesis
per normal.
For model backends that do not account for autocorrelation the individual will not be used and can be omitted leaving outcome ~ time|group_id
, but there is no harm in including the individual_id
component.
growthSS(..., sigma, ...)
The sigma
argument controls distributional sub models. This is only used with nlme
and brms
backends which support different options.
In nlme
models this models sigma and can be “int”, “power”, or “exp” which correspond to using nlme::varIdent
(constant variance within groups), nlme::varPower
(variance changing by a power function), nlme::varExp
(variance changing by an exponential function).
In brms
models this can be specified in the same way as the general growth model and can be used to model any distributional parameter in the model family you use. The default model family is Student T, which has sigma and nu parameters. Other distributions can be specified in the main growth model as model = "family_name: model_name"
(model = "poisson: linear"
as an example). For details on available families see ?brms::brmsfamily
. There is also an “int” model type which fits a 0 slope intercept only model. While “int” can be used in any brms
model the option is meant to be used specifying a homoskedastic sub model, or a period of noise before the main growth trend begins (in terms of growth or variance). Distributional parameters that are not specified will be modeled as constant between groups.
At a high level we can think about any of these models as fitting a curve to these lines.
set.seed(345)
growthSim("gompertz", n = 20, t = 35, params = list(
gomp <-"A" = c(200, 180, 160),
"B" = c(20, 22, 18),
"C" = c(0.15, 0.2, 0.1)
))
aggregate(y ~ group + time, data = gomp, FUN = sd)
sigma_df <-
ggplot(sigma_df, aes(x = time, y = y, group = group)) +
geom_line(color = "gray60") +
pcv_theme() +
labs(y = "SD of y", title = "Gompertz Sigma")
Several options are shown here, ignoring grouping here since the data is already aggregated.
function(x) {
draw_gomp_sigma <-23 * exp(-21 * exp(-0.22 * x))
}ggplot(sigma_df, aes(x = time, y = y)) +
geom_line(aes(group = group), color = "gray60") +
geom_hline(aes(yintercept = 12, color = "Homoskedastic"),
linetype = 5,
key_glyph = draw_key_path
+
) geom_abline(aes(slope = 0.8, intercept = 0, color = "Linear"),
linetype = 5,
key_glyph = draw_key_path
+
) geom_smooth(
method = "gam", aes(color = "Spline"), linetype = 5, se = FALSE,
key_glyph = draw_key_path
+
) geom_function(fun = draw_gomp_sigma, aes(color = "Gompertz"), linetype = 5) +
scale_color_viridis_d(option = "plasma", begin = 0.1, end = 0.9) +
guides(color = guide_legend(override.aes = list(linewidth = 1, linetype = 1))) +
pcv_theme() +
theme(legend.position = "bottom") +
labs(y = "SD of y", title = "Gompertz Sigma", color = "")
“int” will specify a homoskedastic model, that is one with constant variance over time per each group. While this is the default for almost every kind of statistical modeling it is an unrealistic assumption in this setting where we often follow growth from small seedlings to potentially fully grown plants. Even if we start with larger plants the homoskedastic assumption almost never holds in longitudinal modeling. We can fit an example model and see the issue with the homoskedastic assumption through the model’s credible intervals, which are far too wide at the beginning of the experiment and even include some negative values for plant area.
growthSS(
ss <-model = "gompertz", form = y ~ time | id / group, sigma = "int",
df = gomp, start = list("A" = 130, "B" = 15, "C" = 0.25)
)
fitGrowth(ss, iter = 1000, cores = 4, chains = 4, silent = 0)
fit_h <-
brmPlot(fit_h, form = ss$pcvrForm, df = ss$df)
We can relax this assumption and model sigma separately from the main growth trend. To show an example of the options in pcvr
, here we repeat the example from above using a linear submodel. Note that here we add some extra controls to the model fitting algorithm to help the model fit well with the added complexity at the cost of being slower.
growthSS(
ss <-model = "gompertz", form = y ~ time | id / group, sigma = "linear",
df = gomp, start = list("A" = 130, "B" = 15, "C" = 0.25)
)
fitGrowth(ss,
fit_l <-iter = 1000, cores = 4, chains = 4, silent = 0,
control = list(adapt_delta = 0.999, max_treedepth = 20)
)
brmPlot(fit_l, form = ss$pcvrForm, df = ss$df)
p1 <- p1 + coord_cartesian(ylim = c(0, 300))
p2 <- p1 / p2
p <- p
This model is also a poor fit, but it has a different problem. It accurately models the low variability at the beginning of the experiment, but the linear model is not flexible enough to adapt to the changes in variance even in this simulated data.
We can also use spline sub models. The spline model does a very good job of fitting the data due to the natural flexibility of polynomial functions. Again this added accuracy comes at the cost of taking longer for the model to fit. Here we can specify “gam” or “spline” for backwards compatibility.
growthSS(
ss <-model = "gompertz", form = y ~ time | id / group, sigma = "spline",
df = gomp, start = list("A" = 130, "B" = 15, "C" = 0.25)
)
fitGrowth(ss,
fit_s <-iter = 2000, cores = 4, chains = 4, silent = 0,
control = list(adapt_delta = 0.999, max_treedepth = 20)
)
brmPlot(fit_s, form = ss$pcvrForm, df = ss$df)
Here we try applying a gompertz function to the variance submodel. While this is much less flexible than splines it tends to describe the variance of a sigmoid growth model quite well and allows for easier hypothesis testing between groups. A fringe benefit can also be the predictability of the gompertz formula in extrapolating future data. Splines can have unexpected behavior when trying to predict timepoints outside of your initial data, but the gompertz formula is more predictable. Additionally, since the spline sub model will fit many basis functions this will generally be significantly faster since it only needs to find 3 parameters to complete the sub model, and each can have a mildly informative prior. As a single reference point, the model below fit in about 6 minutes while the spline model above took slightly over an hour to fit. These example models have three groups and the model with a gompertz sub model contains 21 total parameters while the spline sub model version contains 43 total parameters.
When setting priors for the gompertz sub-model it is generally reasonable to expect a similar growth rate and inflection point as in the main model (assuming the main model is gompertz as well).
growthSS(
ss <-model = "gompertz", form = y ~ time | id / group, sigma = "gompertz",
df = gomp, start = list(
"A" = 130, "B" = 15, "C" = 0.25,
"sigmaA" = 15, "sigmaB" = 15, "sigmaC" = 0.25
),type = "brms"
)
fitGrowth(ss,
fit_g <-iter = 2000, cores = 4, chains = 4, silent = 0,
control = list(adapt_delta = 0.999, max_treedepth = 20)
)
brmPlot(fit_g, form = ss$pcvrForm, df = ss$df)
A few other options are shown here as further examples. There are as many ways to model variance as there are to model growth using the brms
backend, but other options are more limited.
function(x) {
draw_gomp_sigma <-23 * exp(-21 * exp(-0.22 * x))
} function(x) {
draw_logistic_sigma <-20 / (1 + exp((15 - x) / 2))
} function(x) {
draw_logistic_exp <-2.5 * exp(0.08 * x)
} function(x) {
draw_logistic_quad <-0.3 * x) + (0.02 * x^2)
(
}
ggplot(sigma_df, aes(x = time, y = y)) +
geom_line(aes(group = group), color = "gray60", linetype = 5) +
geom_hline(aes(yintercept = 12, color = "Homoskedastic"), linetype = 1) +
geom_abline(aes(slope = 0.8, intercept = 0, color = "Linear"),
linetype = 1,
key_glyph = draw_key_path
+
) geom_smooth(
method = "gam", aes(color = "Spline"), linetype = 1, se = FALSE,
key_glyph = draw_key_path
+
) geom_function(fun = draw_gomp_sigma, aes(color = "Gompertz"), linetype = 1) +
geom_function(fun = draw_logistic_sigma, aes(color = "Logistic"), linetype = 1) +
geom_function(fun = draw_logistic_exp, aes(color = "Exponential"), linetype = 1) +
geom_function(fun = draw_logistic_quad, aes(color = "Quadratic"), linetype = 1) +
scale_color_viridis_d(option = "plasma", begin = 0.1, end = 0.9) +
guides(color = guide_legend(override.aes = list(linewidth = 1, linetype = 1))) +
pcv_theme() +
theme(legend.position = "bottom") +
labs(y = "SD of y", title = "Gompertz Sigma", color = "")
When considering several sub models (or growth models) we can compare brms
models using Leave-One-Out Information Criterion (LOO IC). For frequentist models a more familiar metric like BIC or AIC might be used.
add_criterion(fit_s, "loo")
loo_spline <- add_criterion(fit_h, "loo")
loo_homo <- add_criterion(fit_l, "loo")
loo_linear <- add_criterion(fit_g, "loo")
loo_gomp <-
loo_homo$criteria$loo$estimates[3, 1]
h <- loo_spline$criteria$loo$estimates[3, 1]
s <- loo_linear$criteria$loo$estimates[3, 1]
l <- loo_gomp$criteria$loo$estimates[3, 1]
g <-
data.frame(loo = c(h, s, l, g), model = c("Homosked", "Spline", "Linear", "Gompertz"))
loodf <-$model <- factor(loodf$model, levels = unique(loodf$model[order(loodf$loo)]), ordered = TRUE)
loodf
ggplot(
loodf,aes(x = model, y = loo, fill = model)
+
) geom_col() +
scale_fill_viridis_d() +
labs(y = "LOO Information Criteria", x = "Sub Model of Sigma") +
theme_minimal() +
theme(legend.position = "none")
The spline sub-model tends to have the best LOO IC, but comparing credible intervals while taking speed and interpretability into account may change which model is the best option for your situation. For this particular data the gompertz submodel does seem to perform very well despite the LOO IC difference from using splines.
growthSS(..., start, ...)
One of the main difficulties in non-linear modeling is getting the models to fit without convergence errors. Using growthSS
the six main model options (and GAMs, although in a different way) are self-starting and do not require starting values. For the double sigmoid options starting values are required though.
Additionally, using the brms
backend this argument is used to specify prior distributions. Setting appropriate prior distributions is an important part and often criticized part of Bayesian statistics. Prior distributions are often talked about in the language of “prior beliefs”, which can be somewhat misleading. Instead it can be helpful to think of prior distributions as hard-headed prior evidence.
In a broad sense, priors can be “strong” or “weak”.
A strong prior is generally thought of as a prior with low variance. Almost all of the probability is in a tight space and the observed data will have a very hard time shifting the distribution meaningfully. Here is an example of a strong prior hurting a model. This example is clearly dramatic, but less absurd strong priors will still impact your results.
set.seed(345)
growthSim("linear", n = 5, t = 10, params = list("A" = c(2, 3, 10)))
ln <-
prior(student_t(3, 0, 5), dpar = "sigma", class = "b") +
strongPrior <- prior(gamma(2, 0.1), class = "nu", lb = 0.001) +
prior(normal(10, .05), nlpar = "A", lb = 0)
growthSS(
ss <-model = "linear", form = y ~ time | id / group, sigma = "homo",
df = ln, priors = strongPrior
)
fitGrowth(ss, iter = 1000, cores = 2, chains = 2, silent = 0)
fit <-
brmPlot(fit, form = ss$pcvrForm, df = ss$df) +
coord_cartesian(ylim = c(0, 100))
Setting a prior as narrow as N(10, 0.05)
intuitively does feel too strong, as though we are so sure already that we can’t expect to learn much more, but another way that a prior can be too strong is in providing too much unrealistic information. Specifically the flat prior can also be thought of as too strong given that it will weigh all numbers equally, which is almost never a reasonable assumption. In our growth model examples there should be no probability given to negative growth rates when plants start from seed. Even if the flat prior is constricted to be positive there is no parameterization where a parameter value in the thousands or millions makes sense as being biologically plausible.
Finally, when setting priors separately for groups you should consider the evidence toward your eventual hypotheses contained in those priors. If the mean effect size of some hypothesis of interest is far away from 0 based solely on your prior distributions then they are probably too strong.
Above all, remember to focus on evidence instead of hopes and beliefs. By default pcvr
will make biologically plausible and individually weak priors for each parameter in your growth model using growthSS
and check that the prior evidence of common hypotheses is not too strong, but it will not stop you from going forward with strong priors if you specify them.
Generally we aim for “weak” or “mildly informative” priors. The goal with these is to constrict our sampler to possible values so that it moves faster and to introduce evidence driven domain expertise.
prior(student_t(3, 0, 5), dpar = "sigma", class = "b") +
weakPrior <- prior(gamma(2, 0.1), class = "nu", lb = 0.001) +
prior(lognormal(log(10), 0.25), nlpar = "A", lb = 0)
growthSS(
ss <-model = "linear", form = y ~ time | id / group, sigma = "homo",
df = ln, priors = weakPrior
)
fitGrowth(ss, iter = 1000, cores = 2, chains = 2, silent = 0)
fit <-
brmPlot(fit, form = ss$pcvrForm, df = ss$df) +
coord_cartesian(ylim = c(0, 100))
As you can see the weak priors moved to meet our data and now we have usable posterior distributions. The variance is large but that is natural with 5 reps per condition when looking at 99% credible intervals.
growthSS
In growthSS
priors can be specified as a brmsprior
object (in which case it is used as is, like in the strong/weak examples above), a named list (names representing parameters), or a numeric vector, where values will be used to generate lognormal priors with a long right tail. Lognormal priors with long right tails are used because the values for our growth curves are strictly positive and the lognormal distribution is easily interpreted. The tail is a product of the variance, which is assumed to be 0.25 for simplicity and to ensure priors are wide. This means that only a location parameter needs to be provided. If a list is used then each element of the list can be length 1 in which case each group will use the same prior or it can be a vector of the same length as unique(data$group)
where group
is your grouping variable from the form
argument to growthSS
. If a vector is used then a warning will be printed to check that the assumed order of groups is correct. The growthSim
function can be useful in thinking about what a reasonable prior distribution might be, although priors should not be picked by trying to get a great fit by eye to your collected data.
We can check the priors made by growthSS
with the plotPrior
function.
list("A" = 130, "B" = 10, "C" = 0.2)
priors <- plotPrior(priors)
priorPlots <-1]] / priorPlots[[2]] / priorPlots[[3]] priorPlots[[
Looking at the prior distributions this way is useful, but the parameter values can be a degree removed from what we are really wanting to check. To help with picking reasonable priors based on the growth curves they’d represent the plotPrior
function can also simulate growth curves by making draws from the specified prior distributions. Here is an example of using plotPrior
in this way to pick between possible sets of prior distributions for a gompertz model. For asymptotic distributions the prior on “A” is added to the y margin. For distributions with an inflection point the prior on “B” is shown in the x margin. Arbitrary numbers of priors can be compared in this manner, but more than two or three can be cluttered so an iterative process is recommended if you are learning about your growth model.
list("A" = c(100, 130), "B" = c(6, 12), "C" = c(0.5, 0.25))
twoPriors <-plotPrior(twoPriors, "gompertz", n = 100)[[1]]
growthSS(..., tau, ...)
For nlrq
models the “tau” argument determines which quantiles are fit. By default this uses the median (0.5), but can be any quantile or vector of quantiles between 0 and 1. In the next section we fit an nlrq model with many quantiles shown.
growthSS(..., hierarchy, ...)
Hierarchical models can be specified by adding covariates to the model formula and specifying models for those covariates in the hierarchy
argument.
A hierarchical formula would be written as y ~ time + covar | id / group
and we could specify to only model the A
parameter as being modeled by covar
by adding hierarchy = list("A" = "int_linear")
.
This would change a logistic model from something like:
\[ Y \sim \frac{A}{(1 + \text{e}^{( (B-x)/C)})}\\ A \sim 0 + \text{group}\\ B \sim 0 + \text{group}\\ C \sim 0 + \text{group} \]
to being something like:
\[ Y \sim \frac{A}{(1 + \text{e}^{( (B-x)/C)})}\\ A \sim AI + AA \cdot \text{covariate}\\ B \sim 0 + \text{group}\\ C \sim 0 + \text{group}\\ AI \sim 0 + \text{group}\\ AA \sim 0 + \text{group} \]
This can be helpful in modeling the effect of time on one phenotype given another or in including watering data, etc.
fitGrowth
The output from growthSS
is passed to fitGrowth
which fits the growth model using the specified backend.
Here we fit a model using each backend to simulated data.
set.seed(123)
growthSim("logistic", n = 20, t = 25, params = list(
simdf <-"A" = c(200, 160),
"B" = c(13, 11),
"C" = c(3, 3.5)
))
growthSS(
nls_ss <-model = "logistic", form = y ~ time | id / group,
df = simdf, type = "nls"
)
## Individual is not used with type = 'nls'.
growthSS(
nlrq_ss <-model = "logistic", form = y ~ time | id / group,
df = simdf, type = "nlrq",
tau = seq(0.01, 0.99, 0.04)
)
## Individual is not used with type = 'nlrq'.
growthSS(
nlme_ss <-model = "logistic", form = y ~ time | id / group,
df = simdf, sigma = "power", type = "nlme"
)
growthSS(
mgcv_ss <-model = "gam", form = y ~ time | id / group,
df = simdf, type = "mgcv"
)
## Individual is not used with type = 'gam'.
growthSS(
brms_ss <-model = "logistic", form = y ~ time | id / group,
sigma = "spline", df = simdf,
start = list("A" = 130, "B" = 10, "C" = 1)
)
Now we have all the essential model components in the ..._ss
objects. Since we specified a logistic model we have three parameters, the asymptote (A
), the inflection point (B
), and the growth rate (C
). In the brms
option our sub model uses a GAM and does not add more parameters. Note that in practice gompertz models tend to fit real data better than logistic models, but they can be more difficult to fit using the frequentist backends.
Before trying to fit the model it is generally a good idea to check one last plot of the data and make sure you have everything defined correctly.
ggplot(simdf, aes(time, y, group = interaction(group, id))) +
geom_line(aes(color = group))
This looks okay, there are no strange jumps in the data or glaring problems, the group and id variables seem to uniquely identify lines so the models should fit well.
Now we use fitGrowth
to fit our models. Additional arguments can be passed to fitGrowth (see ?fitGrowth
for details), but here we only use those to specify details for the brms
model. Note that 500 iterations for the brms
model is only to run a quick example, generally 2000 or more should be used and with more than 1 chain.
fitGrowth(nls_ss)
nls_fit <- fitGrowth(nlrq_ss)
nlrq_fit <- fitGrowth(nlme_ss)
nlme_fit <- fitGrowth(mgcv_ss) mgcv_fit <-
fitGrowth(brms_ss,
brms_fit <-iter = 500, cores = 1, chains = 1,
control = list(adapt_delta = 0.999, max_treedepth = 20)
)
We can check the model fits using growthPlot
.
growthPlot(nls_fit, form = nls_ss$pcvrForm, df = nls_ss$df)
growthPlot(nlrq_fit, form = nlrq_ss$pcvrForm, df = nlrq_ss$df)
growthPlot(nlme_fit, form = nlme_ss$pcvrForm, df = nlme_ss$df)
growthPlot(mgcv_fit, form = mgcv_ss$pcvrForm, df = mgcv_ss$df)
growthPlot(brms_fit, form = brms_ss$pcvrForm, df = brms_ss$df)
In linear regression the default null hypothesis (\(\beta = 0\)) can be useful as each beta past the intercept directly measures the effect of one variable. In non-linear regression we generally have more complicated model parameters and meaningful testing can be a little more involved, typically requiring contrast statements or nested models. In pcvr
the testGrowth
function allows for hypothesis testing on model parameters for frequentist models. For Bayesian models the brms::hypothesis
function is recommended.
testGrowth
testGrowth
takes three arguments, the growthSS
output used to fit a model, the model itself, and a list of parameters to test. Broadly, two kinds of tests are supported. First, if the test
argument is a parameter name or a vector of parameter names then a version of the model is fit with the parameters in test
not varying by group and the models are compared with an anova. In this case the resulting p-value is broadly testing the null hypothesis that the groups have the same value for that parameter.
Here we see that for our nls
model is statistically significantly improved by varying asymptote by group.
testGrowth(nls_ss, nls_fit, test = "A")$anova
## Analysis of Variance Table
##
## Model 1: y ~ A/(1 + exp((B[group] - time)/C[group]))
## Model 2: y ~ A[group]/(1 + exp((B[group] - time)/C[group]))
## Res.Df Res.Sum Sq Df Sum Sq F value Pr(>F)
## 1 995 204775
## 2 994 171686 1 33089 191.57 < 2.2e-16 ***
## ---
## Signif. codes: 0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
Likewise for the 49th percentile in our nlrq
model
testGrowth(nlrq_ss, nlrq_fit, test = "A")[["0.49"]]
## Model 1: y ~ A[group]/(1 + exp((B[group] - time)/C[group]))
## Model 2: y ~ A/(1 + exp((B[group] - time)/C[group]))
## #Df LogLik Df Chisq Pr(>Chisq)
## 1 6 -3901.2
## 2 5 -4029.8 -1 257.27 < 2.2e-16 ***
## ---
## Signif. codes: 0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
And the same is shown in our nlme
model.
testGrowth(nlme_ss, nlme_fit, test = "A")$anova
## Model df AIC BIC logLik Test L.Ratio p-value
## nullMod 1 13 4923.097 4986.898 -2448.548
## fit 2 16 4913.518 4992.042 -2440.759 1 vs 2 15.57932 0.0014
We cannot test parameters in the GAM of course but we still see that the grouping improves the model fit.
testGrowth(mgcv_ss, mgcv_fit)$anova
## Analysis of Deviance Table
##
## Model 1: y ~ s(time)
## Model 2: y ~ 0 + group + s(time, by = group)
## Resid. Df Resid. Dev Df Deviance F Pr(>F)
## 1 992.43 271044
## 2 985.06 172134 7.3716 98909 76.96 < 2.2e-16 ***
## ---
## Signif. codes: 0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
These are relatively basic options for testing hypotheses in non-linear growth models and should serve as a good starting point for frequentist model analysis.
The second kind of hypothesis test in testGrowth
is used if the test
argument is a hypothesis or list of hypotheses similar to those used in brms::hypothesis
syntax. These can test more complex non-linear hypotheses by using car::deltaMethod
to calculate standard errors for model parameters. Note that this kind of testing is only supported with nls
and nlme
model backends. This is a much more flexible testing option.
Here we test several hypotheses on our nls
and nlme
models to show the versatility of this option. In practice you should not use these hypotheses and should be giving some thought to how to express your stated hypothesis in terms of the model parameters.
testGrowth(fit = nls_fit, test = list(
"A1 - A2 *1.1",
"(B1+1) - B2",
"C1 - (C2-0.5)",
"A1/B1 - (1.1 * A2/B2)"
))
## Form Estimate SE t-value p-value
## 1 A1 - A2 *1.1 19.9337491 2.5232917 7.899899 7.368000e-15
## 2 (B1+1) - B2 3.1348883 0.1624348 19.299359 9.834919e-71
## 3 C1 - (C2-0.5) 0.1517508 0.1292836 1.173782 2.407636e-01
## 4 A1/B1 - (1.1 * A2/B2) -1.2329672 0.1538017 8.016603 3.036365e-15
testGrowth(fit = nlme_fit, test = list(
"(A.groupa / A.groupb) - 0.9",
"1 + (B.groupa - B.groupb)",
"C.groupa/C.groupb - 1"
))
## Form Estimate SE Z-value p-value
## 1 (A.groupa / A.groupb) - 0.9 0.3122200 0.03541821 8.815237 1.194318e-18
## 2 1 + (B.groupa - B.groupb) 3.1217633 0.16951043 18.416350 9.713729e-76
## 3 C.groupa/C.groupb - 1 -0.1002475 0.03665857 2.734627 6.245101e-03
brms::hypothesis
With the brms
backend our options expand dramatically. We can write arbitrarily complex hypotheses about our models and test the posterior probability using brms::hypothesis
. Here we keep it simple and test that group A has an asymptote 10% larger than group B’s asymptote. If we had a more complicated dataset then there is no reason we could not expand this hypothesis instead to something like ((A_genotype1_treatment1/A_genotype1_treatment2))-(1.1*(A_genotype2_treatment1/A_genotype2_treatment2)) > 0
to test relative tolerance to different treatments between genotypes. It would be out of scope to go over all the potentially interesting hypotheses since those will depend on your experimental design and questions, but hopefully this communicates the flexibility in using these models once they are fit. Access to the brms::hypothesis
function is generally a compelling reason to use the brms
backend if you have questions beyond “are these groups different?”
brms::hypothesis(brms_fit, "(A_groupa) > 1.1 * (A_groupb)")) (hyp <-
## Hypothesis Estimate Est.Error CI.Lower CI.Upper
## 1 ((A_groupa))-(1.1*(A_groupb)) > 0 16.78802 3.135185 12.01271 21.9525
## Evid.Ratio Post.Prob Star
## 1 Inf 1 *
As alluded to previously, using the brms
backend segmented models are possible and can be specified using “model1 + model2” syntax, where the “+” specifies a changepoint where the process shifts from model1 to model2. As many models as you need to combine can be combined in this way, but more than 2 segments is likely to be very slow and can become more difficult to fit well. If you add many segments together then consider editing the growthSS
output to set stronger priors on any changepoints that are in the same vicinity. Since the changepoints are parameterized they require priors and can be included in any hypothesis tests on the model.
Here we briefly show several threshold model options.
First we look at a “linear + linear” model using a gam submodel. To make the parameters distinct these segmented models have slightly different parameter names. Each section of the model has parameters named for the model and it’s parameters, so here we have “linear1A”, “changePoint1”, and “linear2A”. Similar to the standard models, a changepoint model of variance will have the name of the distributional parameter they are modeling appended to each parameter name.
growthSim(
simdf <-model = "linear + linear",
n = 20, t = 25,
params = list("linear1A" = c(15, 12), "changePoint1" = c(8, 6), "linear2A" = c(3, 5))
)
growthSS(
ss <-model = "linear + linear", form = y ~ time | id / group, sigma = "spline",
start = list("linear1A" = 10, "changePoint1" = 5, "linear2A" = 2),
df = simdf, type = "brms"
)
fitGrowth(ss, backend = "cmdstanr", iter = 500, chains = 1, cores = 1) fit <-
Here we look at a “linear + logistic” model using a gam submodel.
growthSim("linear + logistic",
simdf <-n = 20, t = 25,
params = list(
"linear1A" = c(15, 12), "changePoint1" = c(8, 6),
"logistic2A" = c(100, 150), "logistic2B" = c(10, 8),
"logistic2C" = c(3, 2.5)
)
)
growthSS(
ss <-model = "linear + logistic", form = y ~ time | id / group, sigma = "spline",
list(
"linear1A" = 10, "changePoint1" = 5,
"logistic2A" = 100, "logistic2B" = 10, "logistic2C" = 3
),df = simdf, type = "brms"
)
fitGrowth(ss, backend = "cmdstanr", iter = 500, chains = 1, cores = 1) fit <-
Here we fit a “linear + gam” model with a homoskedastic sub model.
growthSS(
ss <-model = "linear + gam", form = y ~ time | id / group, sigma = "int",
list("linear1A" = 10, "changePoint1" = 5),
df = simdf, type = "brms"
)
fitGrowth(ss, backend = "cmdstanr", iter = 500, chains = 1, cores = 1) fit <-
Here we fit a three part linear model with a gam to model variance. In this case we only used 500 iterations on one chain but the model still fits reasonably well.
growthSim("linear + linear + linear",
simdf <-n = 25, t = 50,
params = list(
"linear1A" = c(10, 12), "changePoint1" = c(8, 6),
"linear2A" = c(1, 2), "changePoint2" = c(25, 30), "linear3A" = c(20, 24)
)
)
growthSS(
ss <-model = "linear + linear + linear", form = y ~ time | id / group, sigma = "spline",
list(
"linear1A" = 10, "changePoint1" = 5,
"linear2A" = 2, "changePoint2" = 15,
"linear3A" = 5
df = simdf, type = "brms"
),
)
fitGrowth(ss, backend = "cmdstanr", iter = 500, chains = 1, cores = 1) fit <-
We can also fit thresholded models to the variance. Here we fit two part intercept only models to both the data and the variance. This is not a growth model exactly, but shows some of the available options well.
growthSS(
ss <-model = "int + int", form = y ~ time | id / group, sigma = "int + int",
list(
"int1" = 10, "changePoint1" = 10, "int2" = 20, # main model
"sigmaint1" = 10, "sigmachangePoint1" = 10, "sigmaint2" = 10
# sub model
), df = simdf, type = "brms"
)
fitGrowth(ss, backend = "cmdstanr", iter = 500, chains = 1, cores = 1) fit <-
Here we fit int + linear models to the overall trend and the variance
growthSS(
ss <-model = "int + linear", form = y ~ time | id / group, sigma = "int + linear",
list(
"int1" = 10, "changePoint1" = 10, "linear2A" = 20,
"sigmaint1" = 10, "sigmachangePoint1" = 10, "sigmalinear2A" = 10
),df = simdf, type = "brms"
) fitGrowth(ss, backend = "cmdstanr", iter = 500, chains = 1, cores = 1) fit <-
Finally we fit a model of “int + logistic” for the main growth trend and “int + gam” for the variance. The benefit here over a pure “gam” model of variance is that we can test the intercept and changepoint parameters of the variance now.
growthSS(
ss <-model = "int+logistic", form = y ~ time | id / group, sigma = "int + spline",
list(
"int1" = 5, "changePoint1" = 10,
"logistic2A" = 130, "logistic2B" = 10, "logistic2C" = 3,
"sigmaint1" = 5, "sigmachangePoint1" = 15
),df = simdf, type = "brms"
) fitGrowth(ss, backend = "cmdstanr", iter = 500, chains = 1, cores = 1) fit <-
Bayesian modeling offers a lot of flexibility but it is in less common use than frequentist statistics so it can be more difficult to explain to collaborators or reviewers. Additionally, guaranteeing reproducibility and transparency requires some different steps. To help with these (and other) potential issues John Kruschke wrote a paper on the Bayesian Analysis and Reporting Guidelines (BARG). All the information required to fully explain a Bayesian model is returned by Stan
and by brms
, but for ease of use pcvr has a barg
function that takes the fit model object and the growthSS
output to return several components of the BARG useful for checking one or more models. See the documentation (?barg
) for more details.
As a final note on brms
models, there is a possiblity of making interesting early stopping rules in a Bayesian framework. If you have models fit to subsets of your data then the distPlot
function will show changes in the posterior distribution for some or all of your parameters over time or over another subset variable. Here the growth trend plots are also a legend for the time of each posterior distribution.
print(load(url("https://raw.githubusercontent.com/joshqsumner/pcvrTestData/main/brmsFits.rdata")))
list(
from3to25 <-3, fit_5, fit_7, fit_9, fit_11, fit_13,
fit_15, fit_17, fit_19, fit_21, fit_23, fit_25
fit_
)
distributionPlot(fits = from3to25, form = y ~ time | id / group, params = c("A", "B", "C"), d = simdf)
The supported models in pcvr
are meant to lower the barrier to entry for complex models using brms
and Stan
. While there are lots of options using these growth models there are many many more options using brms
directly and still more is possible programming directly in Stan
. If you take an interest in developing more and more nuanced models then please see the brms
documentation, Stan
documentation, or stan forums. For models that you think may have broader appeal for high throughput plant phenotyping please raise an issue on github and help the DDPSC data science team understand what the desired model is/where existing options fall short for your needs.