Meta-analysis models
We fit two random effects models, first with a non-informative prior for the heterogeneity, then using the informative prior described by Turner et al. (2012).
Random effects meta-analysis with non-informative heterogeneity prior
We fit a random effects model using the nma() function with trt_effects = "random". We use \(\mathrm{N}(0, 100^2)\) prior distributions for the treatment effects \(d_k\) and study-specific intercepts \(\mu_j\), and a non-informative \(\textrm{half-N}(5^2)\) prior for the heterogeneity standard deviation \(\tau\). We can examine the range of parameter values implied by these prior distributions with the summary() method:
summary(normal(scale = 100))
#> A Normal prior distribution: location = 0, scale = 100.
#> 50% of the prior density lies between -67.45 and 67.45.
#> 95% of the prior density lies between -196 and 196.
summary(half_normal(scale = 5))
#> A half-Normal prior distribution: location = 0, scale = 5.
#> 50% of the prior density lies between 0 and 3.37.
#> 95% of the prior density lies between 0 and 9.8.Fitting the RE model
tr_fit_RE_noninf <- nma(tr_net,
trt_effects = "random",
prior_intercept = normal(scale = 100),
prior_trt = normal(scale = 100),
prior_het = half_normal(scale = 5))Basic parameter summaries are given by the print() method:
tr_fit_RE_noninf
#> A random effects NMA with a binomial likelihood (logit link).
#> Inference for Stan model: binomial_1par.
#> 4 chains, each with iter=2000; warmup=1000; thin=1;
#> post-warmup draws per chain=1000, total post-warmup draws=4000.
#>
#> mean se_mean sd 2.5% 25% 50% 75% 97.5% n_eff Rhat
#> d[Transfusion] -1.13 0.03 0.96 -3.23 -1.64 -1.10 -0.55 0.73 1195 1
#> lp__ -134.26 0.09 2.96 -141.17 -136.06 -133.91 -132.11 -129.30 1103 1
#> tau 1.84 0.03 1.03 0.54 1.15 1.61 2.27 4.55 1348 1
#>
#> Samples were drawn using NUTS(diag_e) at Thu Feb 24 09:05:43 2022.
#> For each parameter, n_eff is a crude measure of effective sample size,
#> and Rhat is the potential scale reduction factor on split chains (at
#> convergence, Rhat=1).By default, summaries of the study-specific intercepts \(\mu_j\) and study-specific relative effects \(\delta_{jk}\) are hidden, but could be examined by changing the pars argument:
# Not run
print(tr_fit_RE_noninf, pars = c("d", "mu", "delta"))The prior and posterior distributions can be compared visually using the plot_prior_posterior() function:
plot_prior_posterior(tr_fit_RE_noninf, prior = "het")
The posterior distribution for the heterogeneity variance \(\tau^2\) is summarised by
noninf_tau <- as.array(tr_fit_RE_noninf, pars = "tau")
noninf_tausq <- noninf_tau^2
names(noninf_tausq) <- "tausq"
summary(noninf_tausq)
#> mean sd 2.5% 25% 50% 75% 97.5% Bulk_ESS Tail_ESS Rhat
#> tausq 4.47 6.2 0.29 1.33 2.59 5.16 20.66 1368 1765 1Random effects meta-analysis with informative heterogeneity prior
Keeping the rest of the model setup the same, we now use an informative \(\textrm{log-N}(-3.93, 1.51^2)\) prior for the heterogeneity variance \(\tau^2\). We can examine the range of parameter values implied by this prior distribution with the summary() method:
summary(log_normal(-3.93, 1.51))
#> A log-Normal prior distribution: location = -3.93, scale = 1.51.
#> 50% of the prior density lies between 0.01 and 0.05.
#> 95% of the prior density lies between 0 and 0.38.Fitting the RE model, we specify the log_normal prior distribution in the prior_het argument, and set prior_het_type = "var" to indicate that this prior distribution is on the variance scale (instead of the standard deviation, the default).
tr_fit_RE_inf <- nma(tr_net,
trt_effects = "random",
prior_intercept = normal(scale = 100),
prior_trt = normal(scale = 100),
prior_het = log_normal(-3.93, 1.51),
prior_het_type = "var")Basic parameter summaries are given by the print() method:
tr_fit_RE_inf
#> A random effects NMA with a binomial likelihood (logit link).
#> Inference for Stan model: binomial_1par.
#> 4 chains, each with iter=2000; warmup=1000; thin=1;
#> post-warmup draws per chain=1000, total post-warmup draws=4000.
#>
#> mean se_mean sd 2.5% 25% 50% 75% 97.5% n_eff Rhat
#> d[Transfusion] -0.77 0.01 0.44 -1.72 -1.02 -0.73 -0.47 0.01 2405 1
#> lp__ -140.27 0.07 2.75 -146.58 -142.00 -139.95 -138.26 -135.85 1377 1
#> tau 0.47 0.01 0.35 0.05 0.20 0.40 0.67 1.32 1605 1
#>
#> Samples were drawn using NUTS(diag_e) at Thu Feb 24 09:05:55 2022.
#> For each parameter, n_eff is a crude measure of effective sample size,
#> and Rhat is the potential scale reduction factor on split chains (at
#> convergence, Rhat=1).By default, summaries of the study-specific intercepts \(\mu_j\) and study-specific relative effects \(\delta_{jk}\) are hidden, but could be examined by changing the pars argument:
# Not run
print(tr_fit_RE_inf, pars = c("d", "mu", "delta"))The prior and posterior distributions can be compared visually using the plot_prior_posterior() function:
plot_prior_posterior(tr_fit_RE_inf, prior = "het")
Note: The heterogeneity variance \(\tau^2\) is plotted here since the prior was specified on \(\tau^2\).
The posterior distribution for the heterogeneity variance \(\tau^2\) is summarised by
inf_tau <- as.array(tr_fit_RE_inf, pars = "tau")
inf_tausq <- inf_tau^2
names(inf_tausq) <- "tausq"
summary(inf_tausq)
#> mean sd 2.5% 25% 50% 75% 97.5% Bulk_ESS Tail_ESS Rhat
#> tausq 0.34 0.5 0 0.04 0.16 0.45 1.73 1490 3055 1