Describing the Time Course of Events

The individual times to event may be highly variable within a population, and we can describe such variability by using a cumulative distribution function (CDF), which depicts the probability ${\rm{P}}$ that the time-to-event T is equal to or lower than any given time:

([1]) $$G\left( t \right) = {\rm{P}}\left( {T \le t} \right)$$

where G(t) corresponds to the proportion of individuals that experienced the event until time $t$ ; within the framework of survival analyses, $G\left( t \right)$ is referred to as the “time-to-event curve” and, analogously, for germination/emergence assays, we may call it “time-to-germination/emergence curve.”

Relating to the shape of the time-to-event curve $G\left( t \right)$ , we distinguish: (1) parametric and (2) nonparametric models; the selection between the two is mainly based on the assumptions we are willing to make about the observed data.

Parametric Time-to-Event Models

In many cases, we can reasonably assume that the time-to-event curve within a population can be described by a parametric model ${\rm{\Phi }}$ , based on a few meaningful parameters:

([2]) $$G\left( t \right) = d\;{\rm{\Phi }}\left( {t,e,b} \right)$$

where $e$ is the location parameter, $b$ is the shape parameter, and $d$ represents the maximum fraction of individuals that experience the event ( $0 \lt d \le 1$ ), so that 1 – d is the so-called cured fraction that has not experienced the event by the end of experiment (e.g., ungerminated seeds). The term ${\rm{\Phi }}$ represents any valid CDF, such as lognormal, log-logistic, or Weibull.

To fit the time-to-event curve and fully respect the nature of time-to-event data, we use Equation 2 to build a likelihood, based on the observed counts and related intervals (see, e.g., Onofri et al. Reference Onofri, Mesgaran, Tei and Cousens2011); the likelihood function is then maximized to estimate the value of d, b, and e (maximum likelihood estimation [MLE]). As an example, a time-to-event model referring to the data in Table 1 would be specified in R language as:

$${\tt{Counts}}\sim {\tt{Start}} + {\tt{End}}$$

We see that the fitting process uses the observed counts with no need of any preliminary transformation. Furthermore, for each count, we consider the whole uncertainty interval during which the event(s) must have taken place. In other words, we are using just as much information as is contained in the data, which results in more reliable estimates of parameters and related variances (Onofri et al. Reference Onofri, Mesgaran, Neve and Cousens2014; Ritz et al Reference Ritz, Pipper and Streibig2013).

In our framework, parametric time-to-event models can be fit using the drmte() function in the drcte package, which works similarly to the drm() function in the drc package. Assuming that the data (the variables: ‘count’, ‘start’, and ‘end’) are stored in a ‘data frame’ named ‘dataset’ in one of the long formats, the R codes to fit a time-to-event model follow:

\begin{align*}mod\, {{\lt}-}\, {{\tt drmte}}& ({{\tt count}}\sim {{\tt start}} + {{\tt end}},\,{{\tt data}} = {{\tt dataset}},\\ & {{\tt fct}} = {{\tt selectedCDF}}())\end{align*}

where the argument ‘fct’ can be assigned to one of the available R functions (Ritz Reference Ritz2010), such as: LL.3()/LL.2() (log-logistic CDF), LN.3()/LN.2() (log-normal CDF), W1.3/W1.2 (Weibull type 1 CDF), and W2.3/W2.2 (Weibull type 2 CDF), as provided in drc. We also provide the loglogistic(), lognormal(), weibull1(), and weibull2() functions, where the sign of the shape parameter b is reversed and constrained to be positive for increasing curves, which is conceptually more appropriate to CDFs. Those who are experienced with the drm() function will note that the ‘type = “event”’ argument used in drm() is not necessary in drmte(), as this latter function is specifically designed for time-to-event methods.

Example 1

The germination of alfalfa (Medicago sativa L.) was tested at 3 C, by using three replicated petri dishes with 100 seeds each. Germinated seeds were periodically counted and removed from the dishes during a period of 34 d (A Onofri and P Benincasa, unpublished data). A parametric time-to-event model (Weibull CDF, type 1) was fit to the observed counts of germinated seeds; the equation is:

([3]) $$G\left( t \right) = d\;{\rm{exp}}\left\{ { - {\rm{exp}}\left\{ { - b\left[ {{\rm{log}}\left( t \right) - {\rm{log}}\left( e \right)} \right]} \right\}} \right\}$$

where $e$ is the abscissa of the inflection point (location parameter), $b$ is the slope at inflection point, and $d$ is the maximum proportion of germinated seeds (upper asymptote). The maximum-likelihood estimates of model parameters were $b$ = 8.20, $d$ = 0.89, and e = 7.88 d (we will discuss SEs later); the time-to-event curve is shown in Figure 1.

Nonparametric Time-to-Event Models

Parametric models make some stringent assumptions on the shape of the time-to-event curve that may not be realistic in some cases. For instance, in emergence studies, events may come in successive flushes, perhaps, due to the existence of several subpopulations with different dormancy cycles. Therefore, the time course of emergences assumes the form of a staircase, which cannot be described properly through parametric models. In other instances, there might be a uniform and abrupt flux of events in a very short time or, conversely, events might be very few and sporadic, so that the iterative estimation process does not converge to reasonable estimates.

In all these (and other) situations, we may prefer (or be forced) to fit a time-to-event model that makes fewer a priori assumptions on the shape of the time-to-event curve, accommodating also unusual (stepwise) shapes, as dictated by the observed data. The most widespread solution in survival analysis for interval-censored data is to use an expectation-maximization algorithm to find the nonparametric maximum likelihood estimator (NPMLE) of the time-to-event curve (Fay and Shaw Reference Fay and Shaw2010); we suggest that this same approach to be used for time-to-event data in agriculture.

The NPMLE is based on a set of $m$ unique and non-overlapping time intervals (Turnbull’s intervals; Fay and Shaw Reference Fay and Shaw2010), denoted by the ${I_j} = \left( {{l_j},{r_j}} \right)$ , where $j$ varies from 1 to $m$ with $l$ and $r$ representing, respectively, the left and right interval margins. Each time interval is associated to a probability mass value ${w_j} = P\left( {{l_j} \lt t\; \le \;{r_j}} \right)$ corresponding to the probability that the events happen in the jth interval. The determination of Turnbull’s intervals and related masses is obvious with non-overlapping intervals, while it requires iterative calculations when intervals overlap. The resulting time-to-event curve has a staircase shape and is univocally defined by the Turnbull’s intervals and related masses, which can be conceptually regarded as model parameters:

([4]) $$G(t) = \left\{ {\matrix{ {0,} \hfill & {{\rm{if }}{\mkern 1mu} t = {l_1}} \hfill \cr {\mathop \sum \nolimits^{{w_{j,}}} } \hfill & {{\rm{if }}{\mkern 1mu} t = {r_j},with{\mkern 1mu} {\mkern 1mu} 2 \le j \le m - 1} \hfill \cr {1,} \hfill & {{\rm{if }}{\mkern 1mu} t = {r_m}} \hfill \cr } } \right.$$

The important characteristic of such a nonparametric approach is that the time-to-event curve is only defined at the end of each interval, while it is undefined elsewhere; therefore, it is often represented by a shaded area (Figure 2). As will be shown, in some instances, it may be convenient to assume that the events are evenly scattered within each interval, which appears to be a biologically reasonable assumption (Fay and Shaw Reference Fay and Shaw2010).

Figure 2. Nonparametric time-to-event curve (nonparametric maximum likelihood estimator [NPMLE]) for a seedling emergence assay with two marked emergence flushes (Example 2). Symbols show the NPMLE for the time to event at the end of Turnbull’s intervals, while the gray areas represent the uncertainty due to censoring.

Nonparametric time-to-event models can be fit in drcte by simply setting ‘fct = NPMLE()’ in the drmte() function.

Example 2

A pot assay was performed to evaluate the time to emergence for 50 seeds of prickly lettuce (Lactuca serriola L.) Emerged seedlings were counted and removed every second day from the beginning of the assay, for 32 d. The assay was repeated with a slightly different monitoring schedule, that is, the number of emerged seedlings was counted 1 d after the beginning of the assay and, afterward, every second day for 33 d (AO, unpublished data).

The observed pattern of emergence indicates two distinct flushes around the 4th and the 24th day after the beginning of the assay. Therefore, we fit an NPMLE of the time-to-event curve; the results show that the overlapping intervals were merged into one set of Turnbull’s intervals, and the time-to-event curve follows closely the observed emergence pattern, with no predefined shape (Figure 2). The gray boxes indicate our uncertainty, as we do not know the exact moments that the germination took place within each interval.

This nonparametric approach is very flexible and can be used to describe any time-to-event curve shapes. However, in some instances, such as making a prediction, we might be reluctant to accept a “broken-stick” model to describe a continuous phenomenon and prefer a smooth curve. Another nonparametric option was proposed by Barreiro-Ures et al. (Reference Barreiro-Ures, Francisco-Fernández, Cao, Fraguela, Doallo, González-Andújar and Reyes2019), which uses a kernel density estimator (KDE) to provide a smooth CDF with no predefined shape:

([5]) $$G\left( t \right) = \sum\limits_{j = 1}^m {{w_j}} {\rm{K}}\left( {{{t - {I_j}} \over h}} \right)$$

where ${I_j} = \left( {{l_j} + {r_j}} \right)/2$ is the center of each interval, ${\rm{K}}$ is a gaussian kernel function, and $h$ is the so-called bandwidth, that is, the parameter controlling the amount of smoothing, or how closely the CDF should follow the observed data. The selection of the bandwidth is crucial: a small bandwidth value will give to a very close fit, but the resulting shape may be highly unrealistic (overfitting). Alternatively, a large bandwidth will result in a poor fit (underfitting). To optimize the selection of the bandwidth, Barreiro-Ures et al. (Reference Barreiro-Ures, Francisco-Fernández, Cao, Fraguela, Doallo, González-Andújar and Reyes2019) proposed the asymptotic mean integrated squared error (AMISE) and the bootstrap method: both methods have been implemented in the drcte package, although the first one is less computer intensive and is used as the default method.

KDEs can be fit with ‘drcte()’ by setting ‘fct = KDE()’ for AMISE method or ‘fct = KDE(bw = “boot”)’ for the bootstrap method in the abovementioned R code. For Example 2, the AMISE bandwidth was equal to 1.767, while the bootstrap bandwidth was 0.9031; both the estimated curves appear to provide better fits to the observed data than a parametric (log-logistic) curve (Figure 3).

Figure 3. Nonparametric time-to-event curves (kernel density estimator [KDE]) for the same assay as in Figure 2 (Example 2). Symbols show the observed data, the solid line shows the KDE for the cumulative probability with bandwidth = 1.767 (AMISE method), while the segmented line shows the KDE with a bandwidth of 0.9031 (bootstrap method). The dotted line shows a log-logistic (parametric) fit.

It should be noted that there is no particular preference between parametric and nonparametric methods in our framework, and the selection is left to the user, according to the aims of the experiment. In general, parametric methods are well suited to make inferences about underlying biological mechanisms of the process, while nonparametric methods may give the best fit to the observed data (Cao et al. Reference Cao, Francisco-Fernández, Anand, Bastida and González-Andújar2013; Gonzalez-Andujar et al. Reference Gonzalez-Andujar, Francisco-Fernandez, Cao, Reyes, Urbano, Forcella and Bastida2016) and might be preferred for some emergence studies or, more generally, whenever the time course of events cannot be adequately described by a parametric time-to-event model.

Modeling the Effect of Experimental Factors

The effect of treatment factors can be accounted for by coding a different time-to-event curve for each factor level. We may be interested in testing whether, overall, those curves are not significantly different from one another, which would imply that there is no treatment effect. Statistical tests of significance are based on the selection of an appropriate test statistic and depend on the model type (parametric, NPMLE, or KDE). Based on our experience and the literature, we suggest, at least as the default choice, a likelihood ratio statistic for parametric models (Bolker Reference Bolker2008), a Wilcoxon-type statistic for NPMLEs (Gomez et al. Reference Gomez, Colle, Oller and Langohr2009), and a Cramér-von Mises–type distance statistic for KDEs (Barreiro-Ures et al. Reference Barreiro-Ures, Francisco-Fernández, Cao, Fraguela, Doallo, González-Andújar and Reyes2019). It is beyond the scope of this paper to give details about these methods: the three statistics are conceptually very different, but they share the property that they are close to 0 when the time-to-event curves are very similar across the treatment levels. Conversely, the values of these statistics progressively increase as the difference between the curves increases.

Example 3

A germination assay was performed to compare three species belonging to the Verbascum genus (data are taken from Catara et al. Reference Catara, Cristaudo, Gualtieri, Galesi, Impelluso and Onofri2016). For each species, four replicated petri dishes with 25 seeds were inspected daily for 15 d and the germinated seeds were counted and removed at each inspection date. For the sake of this exercise, we used this data set to fit an NPMLE of the time-to-event curve, although a parametric time-to-event model would be appropriate as well.

The time-to-event curves were rather different from one another (Figure 4) and the sums of the Wilcoxon scores for the three groups are, respectively, −58.3 for in Verbascum arcturus L., 7.95 for moth mullein (Verbascum blattaria L.), and 50.36 for Cretan mullein (Verbascum creticum Cav.), confirming that the germination of the first species was, on average, the slowest (lowest score sum), while the germination of the third species was the fastest (largest score sum). The overall Wilcoxon score is equal to 58.99, which is a rather high value, supporting the idea that the time-to-event curves are different from one another.

Figure 4. Nonparametric time-to-event curves for a germination assay with three species of the genus Verbascum (Example 3). The gray areas represent the uncertainty due to censoring.

In order to calculate a P-value for the null hypothesis that the three curves are not significantly different, we suggest a permutation approach. The basic idea is that, if the null hypothesis is true, the labels for the groups can be freely permuted among observations. Accordingly, we will:

1. 1. randomly permute the labels for the groups across seeds, in order to obtain a new set of observations for each group, while keeping the same size as the original groups;

2. 2. calculate the statistic of interest (in this example the Wilcoxon statistics);

3. 3. repeat this process a large number of times (e.g., 999), so that we can build a permutation distribution for the statistics of interest;

4. 4. compare the observed value of statistics (in this case, 58.99) against the permutation distribution and calculate the proportion of values that are as large as or larger than the observed value. This proportion can be regarded as the P-value for the null hypothesis.

The above process seems intuitive, but there is one issue that we should take into consideration, that is, the observations (the seeds, in this example) are usually clustered within randomization units (the petri dishes, in this example) and, therefore, permuting the labels for the individual observations belonging to the same petri dish is meaningless, as it ignores the original experimental design. It is, thus, more appropriate to permute the group labels across randomization units and not across observations. In this example (Example 3), there are 12 dishes, to which we can randomly allocate the 12 group labels to create new permutation samples (Winkler et al. Reference Winkler, Webster, Vidaurre, Nichols and Smith2015). The resulting P-value is 0.005; accordingly, the null hypothesis is rejected, and we can conclude that the time courses of germination differ significantly among species.

Dealing with treatment factors, the drmte() function in the drcte package behaves very much the same as the drm function in the drc package; the argument ‘curveid’ is used to specify the treatment variable. The compCDF() function can be used to compare the different time-to-event curves across treatment levels. The most appropriate statistic is automatically selected, depending on the fitted model, although the user can override the default choice, if necessary. A P-level is calculated by using the permutation approach, and if a variable coding for randomization units is provided by way of the ‘units’ argument, group labels are permuted across groups and not across individuals.

Modeling the Effects of Quantitative Variables

The progress to relevant events in plant/animal life is usually affected by several environmental covariates (e.g., water, temperature, oxygen availability, and other continuous variables), which we might want to incorporate in the time-to-event function. For example, the effects of water availability and temperature on seed germination/emergence have been described by using the so-called hydrotime, thermal time, and hydrothermal time models (Bradford Reference Bradford, Kigel and Galili1995, Reference Bradford2002).

All such models can be easily cast as parametric time-to-event models by defining a CDF for germination time. This CDF should have the following characteristics: (1) it should contain the external covariates together with time as the predictors; (2) it should be defined for time values between 0 and infinity; and (3) the response G should be bound between 0 and 1. Hydro-(thermal)-time-to-event models were proposed in Onofri et al. (Reference Onofri, Benincasa, Mesgaran and Ritz2018), with their respective instructions to implement them in R. Other models had been previously proposed by Mesgaran et al. (Reference Mesgaran, Mashhadi, Alizadeh, Hunt, Young and Cousens2013, Reference Mesgaran, Onofri, Mashhadi and Cousens2017) as nonlinear regression models, which nonetheless depict the cumulative proportion of germination times within the population, and therefore, they can be easily cast into the time-to-event platform.

The drcte package includes functions to fit most of the hydrothermal time models proposed insofar. These models can be passed through the ‘fct’ argument, while the names of the data columns corresponding to these covariates need to be added to the model definition after the names of the columns coding for the time interval margins.

Example 4

Here we examine a germination assay with rapeseed (Brassica napus L. var. oleifera ‘Excalibur’) that tested the effects of 13 water potentials (−0.03, −0.15, −0.3, −0.4, −0.5, −0.6, −0.7, −0.8, −0.9, −1, −1.1, −1.2, −1.5 MPa) created by using a polyethylene glycol solution (PEG 6000). For each water potential level, three replicated petri dishes with 50 seeds were incubated at 20 C, and germinated seeds were counted and removed every 2 to 3 d for 14 d (Pace et al. Reference Pace, Benincasa, Ghanem, Quinet and Lutts2012).

For this data set, we fit the following hydrotime model (adopted from Mesgaran et al. [Reference Mesgaran, Mashhadi, Alizadeh, Hunt, Young and Cousens2013] and slightly reparametrized):

([6]) $$G\left( {t,\Psi } \right) = {1 \over {1 + {\rm{exp}}\left\{ {{{{\rm{log}}\left[ {\Psi - {{{\theta _H}} \over t} + \delta } \right] - {\rm{log}}\left( {{\Psi _{b\left( {50} \right)}} + \delta } \right)} \over \sigma }} \right\}}}$$

In Equation 6, the predictors are $t$ (time, day) and ${\rm{\Psi }}$ (water potential, MPa), and the parameters to be estimated are the hydrotime constant ${{\rm{\theta }}_H}$ , the median base water potential ${{\rm{\Psi }}_{b\left( {50} \right)}}$ , the threshold parameter ${\rm{\delta }}$ (Mesgaran et al. Reference Mesgaran, Onofri, Mashhadi and Cousens2017), and the scale parameter ${\rm{\sigma }}$ .

This function can be seen as the CDF of event times within the population and hence can be fit within the time-to-event framework by using the observed counts of germinated seeds as the response and the corresponding time interval extremes as the predictors (the two variables ‘timeBef’ and ‘timeAf’), together with water potential in the substrate. We used the drmte function in the drcte package, together with the HTLL() function, which corresponds to Equation 6. The code to fit the model is given in the Supplementary Material and parameter estimates were: ${{\rm{\theta }}_H}$ = 0.677 MPa d, ${{\rm{\Psi }}_{b\left( {50} \right)}}$ = −0.948 MPa, ${\rm{\delta }}$ = 1.137 MPa, and ${\rm{\sigma }}$ = 0.372. The observed data and fitted values are shown in Figure 5. It is worth noting that the time-to-event curve is a function of a continuous environmental variable (water potential), and predictions can be also obtained for water potential levels that were not included in the original experiment.

Figure 5. Hydro-time-to-event model (Mesgaran et al. Reference Mesgaran, Mashhadi, Alizadeh, Hunt, Young and Cousens2013) fit to a germination assay with rapeseed (Brassica napus L. var. oleifera ‘Excalibur’), at different water potential levels (MPa) in the substrate (Example 4). Symbols show the observed data, and dotted lines show the fitted values.

Extracting Information from a Time-to-Event Curve

Determining the whole time-to-event curve gives us a full and unambiguous description of the progress to germination, emergence, or other relevant events, and for this reason, we suggest that this is the first step of data analysis for all types of time-to-event assays. We have also shown that time-to-event curves can be compared to assess whether the overall time course of events is affected by the experimental treatments.

If necessary, the time-to-event curves can be also used to derive further information to better focus on some specific traits of the biological process under investigation.

Model Parameters and SEs

For a parametric time-to-event curve, model parameters (e.g., $b$ , $d$ , and $e$ in Equation 3) are not only useful to fully specify the curve itself, but they also imbed biological meanings, for example, to describe the prevalence ( $d$ ), the speed ( $e$ ), and the uniformity ( $b$ ) of event times within the population of interest. Obviously, these parameters should be reported together with a measure of variability, for example, SE.

As MLE methods are used, “naive” SEs can be obtained from the second derivative of the likelihood function, as implemented in most statistical software. Unfortunately, these naive SEs are only valid when the individual observations (seeds/seedlings/plants) are totally independent of one another. To account for the experimental design and obtain cluster-robust SEs, a possible approach is to use the so-called sandwich estimator (Carroll et al. Reference Carroll, Wang, Simpson, Stromberg and Ruppert1998), which has been shown to be reliable for clustered survival data (Yu and Peng Reference Yu and Peng2008).

In the drcte package, as well as in several other packages in R, parameter estimates and SEs are obtained from the model object, by using the ‘summary()’ method. In drcte objects, the ‘units’ argument can be used to provide variable coding for the randomization units to derive cluster-robust SEs by way of the facilities provided in the sandwich package (Zeileis et al. Reference Zeileis, Köll and Graham2020).

Example 5

In a pot emergence assay, seeds of prickly lettuce (Lactuca serriola L.) were put in 6 replicated trays filled with soil (50 seeds per tray, at a depth of 10 mm), and emerged seedlings were counted daily for 15 d and removed from the trays. The value of estimated parameters from a lognormal time-to-event model are shown in Table 3. As shown, there is a marked difference between naive and sandwich SEs, in particular, for the location parameter $e$ , which defines the median emergence time for the emerged fraction.

Table 3. Estimates for model parameters relating to a lognormal time-to-event model, for an assay with Lactuca serriola (Example 5).

Predictions

The time-to-event curve (either parametric or nonparametric) can be used to predict the cumulative proportion of individuals that experienced the event at any given time $t$ . For parametric time-to-event curves and KDEs, predictions are straightforward, as the curve is continuous for any time level from 0 to infinity. For NPMLEs, we need to take into account that the time-to-event curve is not specified within each time interval, as shown in Figure 2. Thus, we have to make a reasonable assumption as to how the cumulative probability of events will increase within the time from the left to the right of interval margin. A reasonable choice is to assume that the probability increases progressively within each interval (“interpolation” method; Figure 2); however, it is also very common in literature to assume that the probability increases abruptly either at the beginning of the interval (“left-side” prediction method) or at the middle of the interval (“midpoint” prediction method; see Therneau Reference Therneau2021) or at the end of the interval (“right-side” prediction method).

As a convention, predictions need to be reported with a measure of variability. For parametric models, SEs for predictions can be derived by the delta method (Efron Reference Efron1981), along with a cluster-robust sandwich estimator for the variance–covariance matrix (Zeileis et al. Reference Zeileis, Köll and Graham2020), if this is required by the experimental design. For nonparametric models, we recommend the bootstrap method, and the possible constraints to randomization imposed by the experimental design can be accounted for by resampling randomization units rather than individuals (Goldstein Reference Goldstein1999).

In the drcte package, predictions are obtained from the model object by using the ‘predict()’ method and by providing a set of times when predictions need to be obtained. Similar to the ‘summary()’ method, the ‘units’ argument can be used to provide a variable coding for the randomization units, which is used to derive cluster robust SEs, according to the type of fitted model. For NPMLEs, the ‘type’ argument can be used to select the prediction method (interpolation is the default choice).

Example 3 Continued

For the data set on the three species of the genus Verbascum, it may be relevant to ask what cumulative proportion of emergence can be expected on the 5th and 10th days. The predictions are easily obtained in the drcte package, along with cluster-robust SEs, using the codes reported in the Supplementary Material (Table 4).

Table 4. Prediction for the cumulative proportion of germinated seeds from the data of Example 3 (Figure 4). Cluster robust bootstrap SEs are given.

Quantiles

Very often, we are also interested in some specific percentiles from the estimated distribution of event times, that is, the times taken to reach a certain proportion of individuals with the event. In seed germination assays, these percentiles are usually defined as, for example,T ₁₀ (time to 10% germination), T ₃₀ (time to 30% germination), T ₅₀ (time to 50% germination), and so on. The reciprocals of these quantities (1/T _x , with x being the germination percentage) are also of interest and are often referred to as the germination rates (e.g., GR₁₀, GR₃₀, and GR₅₀), and they represent the daily progress to germination and provide an intelligible measure of “speed.”

The concept of quantiles for time-to-event studies is closely related to the concept of effective doses (ED) in dose–response assays, although we discourage the use of this term for time-to-event studies, as the main predictor is not, in strict terms, a dose, but rather time. As a general suggestion for time-to-event assays, quantiles should be calculated for the whole sample, and they should not be restricted to the fraction of individuals that have experienced the event, especially when the purpose is to make comparisons across treatment groups (Bradford Reference Bradford2002; Keshtkar et al. Reference Keshtkar, Kudsk and Mesgaran2021).

In order to calculate quantiles in drcte, we have included the ED() function for compatibility with the drc package, although we recommend the use of the ‘quantile()’ method, which is specifically tailored to deal with statistical distributions. Quantiles can be calculated considering the whole population of individuals (default choice) or they can be restricted to the fraction of individuals with the event (use the ‘restricted = T’ argument), although this second choice (corresponding to ‘type = “relative”’ in drc) is discouraged. Quantiles can also be calculated for rates, by using the ‘rate = T’ argument. In all cases, SEs are calculated according to the same techniques as discussed before for predictions, and the ‘units’ argument can also be used to account for the experimental design.

Example 3 Continued

Here we compare the three Verbascum species in terms of the germination rates for the 10th and 50th percentiles. Bootstrap estimators with cluster-robust SEs are reported in Table 5.

Table 5. Quantiles for germination rates as derived for the data of Example 3 (Figure 4).

^a Cluster robust bootstrap SEs are given.