Binary Data MCP-Mod

In this vignette we illustrate how to use the DoseFinding package with binary observations by fitting a first-stage GLM and applying the generalized MCP-Mod methodology to the resulting estimates. We also show how to deal with covariates.

For continuously distributed data see the corresponding vignette.

Background and data set

Assume a dose-finding study is planned for an hypothetical investigational treatment in atopic dermatitis, for the binary endpoint Investigator’s Global Assessment (IGA). The treatment is tested with doses 0, 0.5, 1.5, 2.5, 4. It is assumed the response rate for placebo will be around 10%, while the response rate for the top dose may be 35%. This is an example where the generalized MCP-Mod approach can be applied, i.e. dose-response testing and estimation will be performed on the logit scale.

We generate some example data in the setting just described. The 10% placebo effect translates to -2.2 on the logit scale, and the asymptotic effect of 25 percentage points above placebo becomes logit(0.35) - logit(0.1), approximately 1.6.

library(DoseFinding)
library(ggplot2)

logit <- function(p) log(p / (1 - p))
inv_logit <- function(y) 1 / (1 + exp(-y))
doses <- c(0, 0.5, 1.5, 2.5, 4)

## set seed and ensure reproducibility across R versions
set.seed(1, kind = "Mersenne-Twister", sample.kind = "Rejection", normal.kind = "Inversion")
group_size <- 100
dose_vector <- rep(doses, each = group_size)
N <- length(dose_vector)
## generate covariates
x1 <- rnorm(N, 0, 1)
x2 <- factor(sample(c("A", "B"), N, replace = TRUE, prob = c(0.6, 0.4)))
## assume approximately logit(10%) placebo and logit(35%) asymptotic response with ED50=0.5
prob <- inv_logit(emax(dose_vector, -2.2, 1.6, 0.5) + 0.3 * x1 + 0.3 * (x2 == "B"))
dat <- data.frame(y = rbinom(N, 1, prob),
                  dose = dose_vector, x1 = x1, x2 = x2)

Candidate models

We will use the following candidate set of models for the mean response on the logit scale:

mods <- Mods(emax = c(0.25, 1), sigEmax = rbind(c(1, 3), c(2.5, 4)), betaMod = c(1.1, 1.1),
             placEff = logit(0.1), maxEff = logit(0.35)-logit(0.1),
             doses = doses)
plotMods(mods)

## plot candidate models on probability scale
plotMods(mods, trafo = inv_logit)

Analysis without covariates

First assume covariates had not been used in the analysis (not recommended in practice). Let \(\mu_k\) denote the logit response probability at dose \(k\), so that for patient \(j\) in group \(k\) we have

\[ \begin{aligned} Y_{kj} &\sim \mathrm{Bernoulli}(p_{kj}) \\ \mathrm{logit}(p_{kj}) &= \mu_{k} \end{aligned} \]

We perform the MCP-Mod test on the logit scale estimates \(\hat\mu=(\hat\mu_1,\dots,\hat\mu_K)\) and their estimated covariance matrix \(\hat S\). We can extract both from the object returned by the glm() call.

fit_nocov <- glm(y~factor(dose) + 0, data = dat, family = binomial)
mu_hat <- coef(fit_nocov)
S_hat <- vcov(fit_nocov)
MCTtest(doses, mu_hat, S = S_hat, models = mods, type = "general")
Multiple Contrast Test

Contrasts:
     emax1  emax2 sigEmax1 sigEmax2 betaMod
0   -0.817 -0.641   -0.471   -0.280  -0.540
0.5 -0.126 -0.377   -0.589   -0.423  -0.356
1.5  0.202  0.103    0.163   -0.300   0.358
2.5  0.338  0.365    0.418    0.228   0.662
4    0.402  0.550    0.479    0.775  -0.124

Contrast Correlation:
         emax1 emax2 sigEmax1 sigEmax2 betaMod
emax1    1.000 0.945    0.831    0.608   0.789
emax2    0.945 1.000    0.956    0.805   0.762
sigEmax1 0.831 0.956    1.000    0.804   0.788
sigEmax2 0.608 0.805    0.804    1.000   0.327
betaMod  0.789 0.762    0.788    0.327   1.000

Multiple Contrast Test:
         t-Stat   adj-p
emax2     3.378 0.00104
emax1     3.349 0.00103
sigEmax1  3.047 0.00305
sigEmax2  2.668 0.01108
betaMod   2.631 0.01169

Dose-response modeling then can proceed with a combination of bootstrapping and model averaging. For detailed explanations refer to the vignette for analysis of continuous data.

one_bootstrap_prediction <- function(mu_hat, S_hat, doses, bounds, dose_seq) {
  sim <- drop(mvtnorm::rmvnorm(1, mu_hat, S_hat))
  fit <- lapply(c("emax", "sigEmax", "betaMod"), function(mod)
    fitMod(doses, sim, model = mod, S = S_hat, type = "general", bnds = bounds[[mod]]))
  index <- which.min(sapply(fit, gAIC))
  pred <- predict(fit[[index]], doseSeq = dose_seq, predType = "ls-means")
  return(pred)
}

## bs_predictions is a doses x replications matrix,
## probs is a 4-element vector of increasing probabilities for the quantiles
summarize_predictions <- function(bs_predictions, probs) {
  stopifnot(length(probs) == 4)
  med <- apply(bs_predictions, 1, median)
  quants <- apply(bs_predictions, 1, quantile, probs = probs)
  bs_df <- as.data.frame(cbind(med, t(quants)))
  names(bs_df) <- c("median", "low_out", "low_in", "high_in", "high_out")
  return(bs_df)
}

predict_and_plot <- function(mu_hat, S_hat, doses, dose_seq, n_rep) {
  bs_rep <- replicate(
    n_rep, one_bootstrap_prediction(mu_hat, S_hat, doses, defBnds(max(doses)), dose_seq))
  bs_summary <- summarize_predictions(bs_rep, probs = c(0.025, 0.25, 0.75, 0.975))
  bs_summary <- as.data.frame(inv_logit(bs_summary)) # back to probability scale
  ci_half_width <- qnorm(0.975) * sqrt(diag(S_hat))
  glm_summary <- data.frame(dose = doses, mu_hat = inv_logit(mu_hat),
                            low = inv_logit(mu_hat - ci_half_width),
                            high = inv_logit(mu_hat + ci_half_width))
  gg <- ggplot(cbind(bs_summary, dose_seq = dose_seq)) + geom_line(aes(dose_seq, median)) +
    geom_ribbon(aes(x = dose_seq, ymin = low_in, ymax = high_in), alpha = 0.2) +
    geom_ribbon(aes(x = dose_seq, ymin = low_out, ymax = high_out), alpha = 0.2) +
    geom_point(aes(dose, mu_hat), glm_summary) +
    geom_errorbar(aes(dose, ymin = low, ymax = high), glm_summary, width = 0, alpha = 0.5) +
    scale_y_continuous(breaks = seq(0, 1, 0.05)) +
    xlab("Dose") + ylab("Response Probability") +
    labs(title = "Bootstrap estimates for population response probability",
         subtitle = "confidence levels 50% and 95%")
  return(gg)
}
dose_seq <- seq(0, 4, length.out = 51)
predict_and_plot(mu_hat, S_hat, doses, dose_seq, 1000)

Analysis with covariates

In many situations there are important prognostic covariates (main effects) to adjust for in the analysis. Denote the vector of these additional covariates for patient \(j\) with \(x_{kj}\).

\[ \begin{aligned} Y_{kj} &\sim \mathrm{Bernoulli}(p_{kj}) \\ \mathrm{logit}(p_{kj}) &= \mu_k^d + x_{kj}^T\beta \end{aligned} \]

Fitting this model gives us estimated coefficients \(\hat\mu=(\hat\mu^d, \hat\beta)\) and an estimate \(\hat S\) of the covariance matrix of the estimator \(\hat\mu\).

In principle we could perform testing and estimation based on \(\hat\mu^d\) and the corresponding sub-matrix of \(\hat S\), but this would produce estimates for a patient with covariate vector \(\beta=0\), and not reflect the overall population.

To produce adjusted estimates per dose and to accommodate potential systematic differences in the covariates we predict the mean response probability at dose k for all observed values of the covariates and transform back to logit scale:

\[ \mu^*_k := \mathrm{logit}\biggl(\frac{1}{n} \sum_{i=1}^n \mathrm{logit}^{-1}(\hat\mu^d_k + x_{i}^T\hat\beta)\biggr) \]

Note here we index \(x\) with \(i\) that runs from 1 to \(n\) (all patients randomized in the study).

To obtain a variance estimate for \(\mu^*\) we repeat this with draws from \(\mathrm{MultivariateNormal}(\hat\mu, \hat S)\) and calculate the empirical covariance matrix \(S^*\) of theses draws.

Then we use \(\mu^*\) and \(S^*\) in MCTtest().

fit_cov <- glm(y~factor(dose) + 0 + x1 + x2, data = dat, family = binomial)

covariate_adjusted_estimates <- function(mu_hat, S_hat, formula_rhs, doses, other_covariates, n_sim) {
  ## predict every patient under *every* dose
  oc_rep <- as.data.frame(lapply(other_covariates, function(col) rep(col, times = length(doses))))
  d_rep <- rep(doses, each = nrow(other_covariates))
  pdat <- cbind(oc_rep, dose = d_rep)
  X <- model.matrix(formula_rhs, pdat)
  ## average on probability scale then backtransform to logit scale
  mu_star <- logit(tapply(inv_logit(X %*% mu_hat), pdat$dose, mean))
  ## estimate covariance matrix of mu_star
  pred <- replicate(n_sim, logit(tapply(inv_logit(X %*% drop(mvtnorm::rmvnorm(1, mu_hat, S_hat))),
                                        pdat$dose, mean)))
  return(list(mu_star = as.numeric(mu_star), S_star = cov(t(pred))))
}

ca <- covariate_adjusted_estimates(coef(fit_cov), vcov(fit_cov), ~factor(dose)+0+x1+x2,
                                   doses, dat[, c("x1", "x2")], 1000)
MCTtest(doses, ca$mu_star, S = ca$S_star, type = "general", models = mods)
Multiple Contrast Test

Contrasts:
     emax1  emax2 sigEmax1 sigEmax2 betaMod
0   -0.828 -0.659   -0.494   -0.277  -0.551
0.5 -0.067 -0.317   -0.546   -0.369  -0.299
1.5  0.131  0.021    0.090   -0.372   0.315
2.5  0.384  0.412    0.470    0.251   0.694
4    0.381  0.543    0.480    0.766  -0.160

Contrast Correlation:
         emax1 emax2 sigEmax1 sigEmax2 betaMod
emax1    1.000 0.945    0.829    0.598   0.785
emax2    0.945 1.000    0.954    0.799   0.750
sigEmax1 0.829 0.954    1.000    0.797   0.777
sigEmax2 0.598 0.799    0.797    1.000   0.299
betaMod  0.785 0.750    0.777    0.299   1.000

Multiple Contrast Test:
         t-Stat   adj-p
emax2     3.491 < 0.001
emax1     3.471 < 0.001
sigEmax1  3.115 0.00238
sigEmax2  2.749 0.00888
betaMod   2.639 0.01215

In the case at hand the results here are not dramatically different. Adjusting for covariates gives slightly lower variance estimates.

ggplot(data.frame(dose = rep(doses, 4),
                  est = c(inv_logit(mu_hat), diag(S_hat), inv_logit(ca$mu_star), diag(ca$S_star)),
                  name = rep(rep(c("mean", "var"), each = length(doses)), times = 2),
                  a = rep(c(FALSE, TRUE), each = 2*length(doses)))) +
  geom_point(aes(dose, est, color = a)) +
  scale_color_discrete(name = "adjusted") +
  facet_wrap(vars(name), scales = "free_y") + ylab("")

Dose-response modelling proceeds in the same way as before, but now on the adjusted estimates.

predict_and_plot(ca$mu_star, ca$S_star, doses, dose_seq, 1000) +
  labs(title = "Covariate adjusted bootstrap estimates for population response probability")

Avoiding problems with complete seperation and 0 responders

In a number of situations it makes sense to replace ML estimation for logistic regression via glm(..., family=binomial), with the Firth logistic regression (see Heinze and Schemper 2002), implemented as the logistf function from the logistf package. This is particularly important for small sample size per dose and if small number of responses are expected on some treatment arms. The estimator of Firth regression corresponds to the posterior mode in a Bayesian logistic regression model with Jeffrey’s prior on the parameter vector. This estimator is well defined even in situations where the ML estimate for logistic regression does not exist (e.g. for complete separation).

Considerations around optimal contrasts at design stage and analysis stage

The formula for the optimal contrasts is given by \[ c^{\textrm{opt}} \propto S^{-1}\biggl(\mu^0_m - \frac{(\mu^0_m)^T S^{-1}1_K}{1_K^T S^{-1} 1_K}\biggr) \] where \(\mu^0_m\) is the standardized mean response, \(K\) is the number doses, and \(1_K\) is an all-ones vector of length \(K\) and \(S\) is the covariance matrix of the estimates at the doses (see Pinheiro et al. 2014).

For calculating the optimal contrast for the generalized MCP step the covariance matrix \(S\) of the estimator \(\hat\mu\) can be re-estimated once the trial data are available. With normally distributed data this is possible with decent accuracy even at rather low sample sizes. In the case of binary data, \(\hat\mu\) is on the logit scale and the diagonal elements of \(S\) are approximately \((np(1-p))^{-1}\), where \(n\) is the sample size of the dose group. This can be derived using the delta method. An estimate of this variance depends on the observed response rate and can thus be quite variable in particular for small sample sizes per group (e.g. smaller than 20).

A crude alternative in these situations is to not use the estimated \(S\) but a diagonal matrix with the inverse of the sample size per dose on the diagonal in the formula for calculation of the optimal contrast. The contrast calculated this way will asymptotically not be equal to the “optimal” contrast for the underlying model, but simulations show that they can be closer to the “true” optimal contrast (calculated based on the true variance per dose group) for small sample size, compared to the contrast calculated based on the estimated variance.

To re-run the adjusted analysis above for the contrasts, calculated as outlined above, we need to calculate and hand-over the contrast matrix manually via contMat in the MCTtest() function. In our case (with 100 patients per group) we obtain a result that is only slightly different.

## here we have balanced sample sizes across groups, so we select w = 1
## otherwise would select w proportional to group sample sizes
optCont <- optContr(mods, doses, w = 1)
MCTtest(doses, ca$mu_star, S = ca$S_star, type = "general", contMat = optCont)
Multiple Contrast Test

Contrasts:
     emax1  emax2 sigEmax1 sigEmax2 betaMod
0   -0.861 -0.753   -0.597   -0.391  -0.679
0.5 -0.010 -0.240   -0.479   -0.389  -0.255
1.5  0.233  0.170    0.223   -0.240   0.383
2.5  0.299  0.346    0.402    0.268   0.573
4    0.340  0.477    0.450    0.752  -0.022

Contrast Correlation:
         emax1 emax2 sigEmax1 sigEmax2 betaMod
emax1    1.000 0.965    0.863    0.659   0.884
emax2    0.965 1.000    0.959    0.811   0.882
sigEmax1 0.863 0.959    1.000    0.836   0.879
sigEmax2 0.659 0.811    0.836    1.000   0.522
betaMod  0.884 0.882    0.879    0.522   1.000

Multiple Contrast Test:
         t-Stat   adj-p
emax2     3.427 < 0.001
emax1     3.318 0.00118
sigEmax1  3.166 0.00193
sigEmax2  3.055 0.00255
betaMod   2.907 0.00466

Power and sample size considerations

We can calculate the power under each of the candidate models from the top of this vignette. For example, we assume a Mods(emax = 0.25) and calculate the vector of mean responses lo on the logit scale. When we transform it back to probability scale p, we can calculate the approximate variance of the (logit-scale) estimator mu_hat with the formula \[ \mathrm{Var}(\hat\mu) = \frac{1}{np(1-p)} \] (see the section above). Next we calculate the minimum power across the candidate set using powMCT() and plot it for increasing n.

See also the vignette on sample size calculation.

## for simplicity: contrasts as discussed in the previous section
contMat <- optContr(mods, w=1)

## we need each alternative model as a separate object
alt_model_par <- list(emax = 0.25, emax = 1, sigEmax = c(1, 3),
                      sigEmax = c(2.5, 4), betaMod = c(1.1, 1.1))
alt_common_par <- list(placEff = logit(0.1), maxEff = logit(0.35)-logit(0.1),
                       doses = doses)
## this is a bit hackish because we need to pass named arguments to Mods()
alt_mods <- lapply(seq_along(alt_model_par), function(i) {
  do.call(Mods, append(alt_model_par[i], alt_common_par))
})

prop_true_var_mu_hat <- lapply(seq_along(alt_model_par), function(i) {
  ## mean responses on logit scale
  lo <- getResp(do.call(Mods, append(alt_model_par[i], alt_common_par)))
  p <- inv_logit(lo) # mean responses on probability scale
  v <- 1 / (p * (1-p)) # element-wise variance of mu_hat up to a factor of 1/n
  return(as.numeric(v)) # drop unnecessary attributes
})

min_power_at_group_size <- function(n) {
  pwr <- mapply(function(m, v) powMCT(contMat, alpha=0.025, altModels=m, S=diag(v/n), df=Inf),
                alt_mods, prop_true_var_mu_hat)
  return(min(pwr))
}

n <- seq(5, 80, by=5)
pwrs <- sapply(n, min_power_at_group_size)
qplot(n, pwrs, geom="line", ylab="Min. Power over candidate set")+
  scale_y_continuous(breaks = seq(0,1,by=0.1), limits = c(0,1))
Warning: `qplot()` was deprecated in ggplot2 3.4.0.
This warning is displayed once every 8 hours.
Call `lifecycle::last_lifecycle_warnings()` to see where this warning was
generated.

References

Heinze, G., and Schemper, M. (2002), “A solution to the problem of separation in logistic regression,” Statistics in Medicine, 21, 2409–2419. https://doi.org/10.1002/sim.1047.
Pinheiro, J., Bornkamp, B., Glimm, E., and Bretz, F. (2014), “Model-based dose finding under model uncertainty using general parametric models,” Statistics in Medicine, 33, 1646–1661. https://doi.org/10.1002/sim.6052.