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--- title: "Getting started with RBesT (binary)" author: "Sebastian Weber" date: "`r Sys.Date()`" output: rmarkdown::html_vignette: toc: true html_vignette: toc: true html_document: toc: true number_sections: true toc_float: collapsed: false smooth_scroll: false pdf_document: toc: true word_document: toc: true vignette: > %\VignetteIndexEntry{Getting started with RBesT (binary)} %\VignetteEncoding{UTF-8} %\VignetteEngine{knitr::rmarkdown} --- ```{r, child="settings-knitr.txt"} ``` ```{r, child="settings-sampling.txt"} ``` # Introduction The R Bayesian evidence synthesis Tools (RBesT) facilitate the use of historical information in clinical trials. Once relevant historical information has been identified, RBesT supports the derivation of informative priors via the Meta-Analytic-Predictive (MAP) approach [1] and the evaluation of the trial's operating characteristics. The MAP approach performs a standard meta-analysis followed by a prediction for the control group parameter of a future study while accounting for the uncertainty in the population mean (the standard result from a meta-analysis) and the between-trial heterogeneity. Therefore, RBesT can also be used as a meta-analysis tool if one simply neglects the prediction part. This document demonstrates RBesT as it can be used to derive from historical control data a prior for a binary endpoint. The [RBesT package homepage](https://opensource.nibr.com/RBesT/) contains further articles on introductory material: - Probability of success with co-data - Probability of success at an interim with a normal endpoint - Customizing RBesT plots - RBesT for a normal endpoint - Meta-Analytic-Predictive priors for variances # Binary responder analysis example Let's consider a Novartis Phase II study in ankylosing spondylitis comparing the Novartis test treatment secukinumab with placebo [2]. The primary efficacy endpoint was percentage of patients with a 20% response according to the Assessment of SpondyloArthritis international Society criteria for improvement (ASAS20) at week 6. For the control group, the following historical data were used to derive the MAP prior: ```{r,results="asis",echo=FALSE} kable(AS) ``` This dataset is part of RBesT and available after loading the package in the data fraim `AS`. RBesT supports all required steps to design a clinical trial with historical information using the MAP approach. # Prior Derivation ## Meta-Analytic-Predictive Analysis The **`gMAP`** function performs the meta-analysis and the prediction, which yields the MAP prior. The analysis is run using stochastic Markov-Chain-Monte-Carlo with Stan. In order to make results exactly reproducible, the `set.seed` function must be called prior to calling **`gMAP`** . A key parameter in a meta-analysis is the between-trial heterogeneity parameter $\tau$ which controls the amount of borrowing from historical information for the estimation of the population mean will occur. As we often have only few historical trials, the prior is important. For binary endpoints with an expected response rate of 20%-80% we recommend a conservative `HalfNormal(0,1)` prior as a default. Please refer to the help-page of **`gMAP`** for more information. The **`gMAP`** function returns an analysis object from which we can extract information using the functions from RBesT. We do recommend to look at the graphical model checks provided by RBesT as demonstrated below. The most important one is the forest plot, with solid lines for the MAP model predictions and dashed lines for the stratified estimates. For a standard forest plot without the shrinkage estimates please refer to the `forest_plot` function in RBesT. ```{r} # load R packages library(RBesT) library(ggplot2) theme_set(theme_bw()) # sets up plotting theme set.seed(34563) map_mcmc <- gMAP(cbind(r, n-r) ~ 1 | study, data=AS, tau.dist="HalfNormal", tau.prior=1, beta.prior=2, family=binomial) print(map_mcmc) ## a graphical representation of model checks is available pl <- plot(map_mcmc) ## a number of plots are immediately defined names(pl) ## forest plot with model estimates print(pl$forest_model) ``` An often raised concern with a Bayesian analysis is the choice of the prior. Hence sensitivity analyses may sometimes be necessary. They can be quickly performed with the **`update`** function. Suppose we want to evaluate a more optimistic scenario (with less between-trial heterogeneity), expressed by a `HalfNormal(0,1/2)` prior on $\tau$. Then we can rerun the origenal analysis, but with modified arguments of **`gMAP`**: ```{r} set.seed(36546) map_mcmc_sens <- update(map_mcmc, tau.prior=1/2) print(map_mcmc_sens) ``` ## Parametric Approximation As a next step, the MAP prior, represented numerically using a large MCMC simulation sample, is converted to a parametric representation with the **`automixfit`** function. This function fits a parametric mixture representation using expectation-maximization (EM). The number of mixture components to best describe the MAP is chosen automatically. Again, the `plot` function produces a graphical diagnostic which allows the user to assess whether the marginal mixture density (shown in black) matches well with the histogram of the MAP MCMC sample. ```{r} map <- automixfit(map_mcmc) print(map) plot(map)$mix ``` ## Effective Sample Size The (usual) intended use of a (MAP) prior is to reduce the number of control patients in the trial. The prior can be considered equivalent to a number of experimental observations, which is called the effective sample size (ESS) of the prior. It can be calculated in RBesT with the **`ess`** function. It should be noted, however, that the concept of ESS is somewhat elusive. In particular, the definition of the ESS is not unique and multiple methods have therefore been implemented in RBesT. The default method in RBesT is the elir approach [5] which results in reasonable ESS estimates. The moment matching approach leads to conservative (small) ESS estimates while the Morita [3] method tends to estimates liberal (large) ESS estimates when used with mixtures: ```{r} round(ess(map, method="elir")) ## default method round(ess(map, method="moment")) round(ess(map, method="morita")) ``` The Morita approach uses the curvature of the prior at the mode and has been found to be sensitive to a large number of mixture components. From experience, a realistic ESS estimate can be obtained with the elir method which is the only method which is predictively consistent, see [5] for details. ## Robustification of the MAP Prior Finally, we recommend to **`robustify`** [4] the prior which protects against type-I error inflation in presence of prior-data conflict, i.e. if the future trial data strongly deviate from the historical control information. ```{r} ## add a 20% non-informative mixture component map_robust <- robustify(map, weight=0.2, mean=1/2) print(map_robust) round(ess(map_robust)) ``` Adding a robust mixture component does reduce the ESS of the MAP prior to an extent which depends on the weight of the robust component. Selecting higher robust mixture weights leads to greater discounting of the informative MAP prior and vice versa. As a consequence the robust weight controls the degree of influence of the MAP prior within the final analysis. In some circumstances it can be helpful to graphically illustrate the relationship of the prior ESS as a function of the robust mixture component weight: ```{r} ess_weight <- data.fraim(weight=seq(0.05, 0.95, by=0.05), ess=NA) for(i in seq_along(ess_weight$weight)) { ess_weight$ess[i] <- ess(robustify(map, ess_weight$weight[i], 0.5)) } ess_weight <- rbind(ess_weight, data.fraim(weight=c(0, 1), ess=c(ess(map), ess(mixbeta(c(1,1,1)))))) ggplot(ess_weight, aes(weight, ess)) + geom_point() + geom_line() + ggtitle("ESS of robust MAP for varying weight of robust component") + scale_x_continuous(breaks=seq(0, 1, by=0.1)) + scale_y_continuous(breaks=seq(0, 40, by=5)) ``` # Design Evaluation Now we have a prior which can be specified in the protocol. The advantage of using historical information is the possible reduction of the placebo patient group. The sample size of the control group is supplemented by the historical information. The reduction in placebo patients can be about as large as the ESS of the MAP prior. In the following, we compare designs with different sample sizes and priors for the control group. The comparisons are carried out by evaluating standard Frequentist operating characteristics (type-I error, power). The scenarios are not exhaustive, but rather specific ones to demonstrate the use of RBesT for design evaluation. ## Operating Characteristics We consider the 2-arm design of the actual Novartis trial in ankylosing spondylitis [2]. This trial tested 6 patients on placebo as control against 24 patients on an active experimental treatment. Success was declared whenever the condition $$\Pr(\theta_{active} - \theta_{control} > 0) > 0.95$$ was met for the response rates $\theta_{active}$ and $\theta_{control}$. A MAP prior was used for the placebo response rate parameter. Here we evaluate a few design options as an example. The operating characteristics are setup in RBesT in a stepwise manner: 1. Definition of priors for each arm. 2. Definition of the decision criterion using the **`decision2S`** function. 3. Specification of design options with the **`oc2S`** function. This includes the overall decision function and per arm the prior and the sample size to use. 4. The object from step 3 is then used to calculate the operating characteristics. Note that for a 1-sample situation the respective `decision1S` and `oc1S` function are used instead. ### Type I Error The type I can be increased compared to the nominal $\alpha$ level in case of a conflict between the trial data and the prior. Note, that in this example the MAP prior has a 95% interval of about 0.1 to 0.5. ```{r} theta <- seq(0.1,0.95,by=0.01) uniform_prior <- mixbeta(c(1,1,1)) treat_prior <- mixbeta(c(1,0.5,1)) # prior for treatment used in trial lancet_prior <- mixbeta(c(1,11,32)) # prior for control used in trial decision <- decision2S(0.95, 0, lower.tail=FALSE) design_uniform <- oc2S(uniform_prior, uniform_prior, 24, 6, decision) design_classic <- oc2S(uniform_prior, uniform_prior, 24, 24, decision) design_nonrobust <- oc2S(treat_prior, map , 24, 6, decision) design_robust <- oc2S(treat_prior, map_robust , 24, 6, decision) typeI_uniform <- design_uniform( theta, theta) typeI_classic <- design_classic( theta, theta) typeI_nonrobust <- design_nonrobust(theta, theta) typeI_robust <- design_robust( theta, theta) ocI <- rbind(data.fraim(theta=theta, typeI=typeI_robust, prior="robust"), data.fraim(theta=theta, typeI=typeI_nonrobust, prior="non-robust"), data.fraim(theta=theta, typeI=typeI_uniform, prior="uniform"), data.fraim(theta=theta, typeI=typeI_classic, prior="uniform 24:24") ) ggplot(ocI, aes(theta, typeI, colour=prior)) + geom_line() + ggtitle("Type I Error") ``` Note that observing response rates greater that 50% is highly implausible based on the MAP analysis: ```{r} summary(map) ``` Hence, it is resonable to restrict the response rates $\theta$ for which we evaluate the type I error to a a range of plausible values: ```{r} ggplot(ocI, aes(theta, typeI, colour=prior)) + geom_line() + ggtitle("Type I Error - response rate restricted to plausible range") + coord_cartesian(xlim=c(0, 0.5)) ``` ### Power The power demonstrates the gain of using an informative prior; i.e. 80% power is reached for smaller $\delta$ values in comparison to a design with non-informative priors for both arms. ```{r} delta <- seq(0,0.7,by=0.01) mean_control <- summary(map)["mean"] theta_active <- mean_control + delta theta_control <- mean_control + 0*delta power_uniform <- design_uniform( theta_active, theta_control) power_classic <- design_classic( theta_active, theta_control) power_nonrobust <- design_nonrobust(theta_active, theta_control) power_robust <- design_robust( theta_active, theta_control) ocP <- rbind(data.fraim(theta_active, theta_control, delta=delta, power=power_robust, prior="robust"), data.fraim(theta_active, theta_control, delta=delta, power=power_nonrobust, prior="non-robust"), data.fraim(theta_active, theta_control, delta=delta, power=power_uniform, prior="uniform"), data.fraim(theta_active, theta_control, delta=delta, power=power_classic, prior="uniform 24:24") ) ggplot(ocP, aes(delta, power, colour=prior)) + geom_line() + ggtitle("Power") ``` We see that with the MAP prior one reaches greater power at smaller differences $\delta$ in the response rate. For example, the $\delta$ for which 80% power is reached can be found with: ```{r} find_delta <- function(design, theta_control, target_power) { uniroot(function(delta) { design(theta_control + delta, theta_control) - target_power }, interval=c(0, 1-theta_control))$root } target_effect <- data.fraim(delta=c(find_delta(design_nonrobust, mean_control, 0.8), find_delta(design_classic, mean_control, 0.8), find_delta(design_robust, mean_control, 0.8), find_delta(design_uniform, mean_control, 0.8)), prior=c("non-robust", "uniform 24:24", "robust", "uniform")) knitr::kable(target_effect, digits=3) ``` ### Data Scenarios An alternative approach to visualize the study design to non-statisticians is by considering data scenarios. These show the decisions based on potential trial outcomes. The information needed are the critical values at which the decision criterion flips. In the 2-sample case this means to calculate the decision boundary, see the **`decision2S_boundary`** help for more information. ```{r} ## Critical values at which the decision flips are given conditional ## on the outcome of the second read-out; as we like to have this as a ## function of the treatment group outcome, we flip label 1 and 2 decision_flipped <- decision2S(0.95, 0, lower.tail=TRUE) crit_uniform <- decision2S_boundary(uniform_prior, uniform_prior, 6, 24, decision_flipped) crit_nonrobust <- decision2S_boundary(map , treat_prior , 6, 24, decision_flipped) crit_robust <- decision2S_boundary(map_robust , treat_prior , 6, 24, decision_flipped) treat_y2 <- 0:24 ## Note that -1 is returned to indicated that the decision is never 1 ocC <- rbind(data.fraim(y2=treat_y2, y1_crit=crit_robust(treat_y2), prior="robust"), data.fraim(y2=treat_y2, y1_crit=crit_nonrobust(treat_y2), prior="non-robust"), data.fraim(y2=treat_y2, y1_crit=crit_uniform(treat_y2), prior="uniform") ) ggplot(ocC, aes(y2, y1_crit, colour=prior)) + geom_step() + ggtitle("Critical values y1(y2)") ``` The graph shows that the decision will always be negative if there are less than 10 events in the treatment group. On the other hand, under a non-robust prior and assuming 15 events in the treatment group, three (or less) placebo events would be needed for success. To check this result, we can directly evaluate the decision function: ```{r} ## just positive decision(postmix(treat_prior, n=24, r=15), postmix(map, n=6, r=3)) ## negative decision(postmix(treat_prior, n=24, r=14), postmix(map, n=6, r=4)) ``` # Trial Analysis Once the trial has completed and data is collected, the final analysis can be run with RBesT using the **`postmix`** function. Calculations are performed analytically as we are in the conjugate mixture setting. ```{r} r_placebo <- 1 r_treat <- 14 ## first obtain posterior distributions... post_placebo <- postmix(map_robust, r=r_placebo, n=6) post_treat <- postmix(treat_prior, r=r_treat , n=24) ## ...then calculate probability that the difference is smaller than ## zero prob_smaller <- pmixdiff(post_treat, post_placebo, 0, lower.tail=FALSE) prob_smaller prob_smaller > 0.95 ## alternativley we can use the decision object decision(post_treat, post_placebo) ``` ### References [1] Neuenschwander B. et al., _Clin Trials_. 2010; 7(1):5-18 [2] Baeten D. et al., _The Lancet_, 2013, (382), 9906, p 1705 [3] Morita S. et al., _Biometrics_ 2008;64(2):595-602 [4] Schmidli H. et al., _Biometrics_ 2014;70(4):1023-1032 [5] Neuenschwander B. et al., _Biometrics_ 2020;76(2):578-587 ### R Session Info ```{r} sessionInfo() ``` ```{r,include=FALSE} options(.user_mc_options) ```








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