Recently I have asked a question on how to generate meaningful bootstrap confidence and prediction intervals for mixed effect models predictions in R using `bootMer`

for 1) data seen in model fit and 2) new data (i.e. not seen in model fit). I followed the approach suggested in the answer, by training a simple mixed effects model on the `sleepstudy`

dataset with fixed effect on `Days`

and random effect on `Subject`

. Here is a reproducible R code, where I compute confidence and prediction intervals for a subject in the data as well as for a new subject (note: all bootMer calls are seeded).

```
# Load necessary libraries
library(lme4)
library(ggplot2)
# Load the sleepstudy dataset
data("sleepstudy")
# Fit the mixed effect model
mem <- lmer(Reaction ~ Days + (1 | Subject), data = sleepstudy)
# Define the subject for the plots
subject <- 337
# Seen subject
seen_data <- sleepstudy[sleepstudy$Subject == subject, ]
# New subject
new_data <- data.frame(Days = seq(min(sleepstudy$Days), max(sleepstudy$Days), length.out = 10),
Subject = factor(rep("999", 10)))
# Define prediction functions for bootstrapping
predfn <- function(.) { predict(., newdata = seen_data, re.form = NULL) }
cifn <- function(.) { predict(., newdata = seen_data, re.form = NA) }
sfun <- function(.) { simulate(., newdata = new_data, re.form = NA, allow.new.levels = TRUE)[[1]] }
cifn_new <- function(.) { predict(., newdata = new_data, re.form = NA) }
# Perform bootstrapping for seen subject
boot_pred <- bootMer(mem, FUN = predfn, nsim = 500, re.form = NULL, type = "parametric", seed = 2804)
boot_ci <- bootMer(mem, FUN = cifn, nsim = 500, re.form = NA, type = "parametric", seed = 2804)
# Perform bootstrapping for new subject
boot_pred_new <- bootMer(mem, FUN = sfun, nsim = 500, re.form = NA, type = "parametric", seed = 2804)
boot_ci_new <- bootMer(mem, FUN = cifn_new, nsim = 500, re.form = NA, type = "parametric", seed = 2804)
# Helper function to calculate confidence and prediction intervals
calc_intervals <- function(boot_obj, level = 0.95) {
alpha <- 1 - level
lower <- apply(boot_obj$t, 2, quantile, probs = alpha / 2)
upper <- apply(boot_obj$t, 2, quantile, probs = 1 - alpha / 2)
list(lower = lower, upper = upper)
}
# Calculate intervals
ci_seen <- calc_intervals(boot_ci)
pi_seen <- calc_intervals(boot_pred)
ci_new <- calc_intervals(boot_ci_new)
pi_new <- calc_intervals(boot_pred_new)
# Predictions
predictions_seen <- predict(mem, newdata = seen_data, re.form = NULL)
predictions_new <- predict(mem, newdata = new_data, re.form = NA, allow.new.levels = TRUE)
# Plotting
plot_intervals <- function(days, predictions, ci, pi, title) {
data_plot <- data.frame(Days = days,
Prediction = predictions,
CI_Lower = ci$lower,
CI_Upper = ci$upper,
PI_Lower = pi$lower,
PI_Upper = pi$upper)
ggplot(data_plot, aes(x = Days)) +
geom_line(aes(y = Prediction, color = "Prediction")) +
geom_ribbon(aes(ymin = CI_Lower, ymax = CI_Upper, fill = "Confidence Interval"), alpha = 0.2) +
geom_ribbon(aes(ymin = PI_Lower, ymax = PI_Upper, fill = "Prediction Interval"), alpha = 0.1) +
scale_color_manual(name = "Legend", values = c("Prediction" = "blue")) +
scale_fill_manual(name = "Legend", values = c("Confidence Interval" = "green", "Prediction Interval" = "red")) +
labs(title = title, y = "Reaction Time", x = "Days") +
theme_minimal() +
theme(legend.position = "bottom")
}
# Create plots
plot_seen_ci <- plot_intervals(seen_data$Days, predictions_seen, ci_seen, pi_seen,
"Seen Subject - Confidence and Prediction Intervals")
plot_new_ci <- plot_intervals(new_data$Days, predictions_new, ci_new, pi_new,
"New Subject - Confidence and Prediction Intervals")
# Print plots
print(plot_seen_ci)
print(plot_new_ci)
```

As you can see below, the plot for a new subject looks fine (at least qualitatively).

In the case of a subject seen in training data instead (see plot below), the confidence interval is shifted with respect to model prediction and the prediction interval. Please note that `cifn`

is exactly the same as `cifn_new`

and also that `boot_ci`

is exactly the same as `boot_ci_new`

(as suggested in the answer to my previous question).
This to me is problematic, because the confidence band for a seen subject (with both `boot_ci_new`

and `cifn_new`

having `re.form=NA`

) is, in general, not centered on the corresponding model predictions (where `re.form=NULL`

, since random effects that have been learned during model fit are rightfully included).

**Question: Does it make sense at all to compute confidence intervals of mixed effects model predictions with bootstrapping for data seen in model fit? If yes, how can I have confidence intervals that are correctly centered around model predictions, like the corresponding prediction intervals? Is anything wrong in the choice of the arguments of the functions in the script?**