One of the main objectives in meta-analysis is to estimate the overall effect size by calculating a confidence interval (CI). The usual procedure consists of assuming a standard normal distribution and a sampling variance defined as the inverse of the sum of the estimated weights of the effect sizes. But this procedure does not take into account the uncertainty due to the fact that the heterogeneity variance (2) and the within-study variances have to be estimated, leading to CIs that are too narrow with the consequence that the actual coverage probability is smaller than the nominal confidence level. In this article, the performances of 3 alternatives to the standard CI procedure are examined under a random-effects model and 8 different 2 e...
The meta-analytic random effects model assumes that the variability in effect size estimates drawn f...
Dependent effect sizes are ubiquitous in meta-analysis. Using Monte Carlo simulation, we compared th...
Two methods of quantifying heterogeneity between studies in meta-analysis were studied. One method q...
The DerSimonian-Laird confidence interval for the average treatment effect in meta-analysis is widel...
The effect sizes of studies included in a meta‐analysis do often not share a common true effect size...
Meta-analyses are an important tool within systematic reviews to estimate the overall effect size an...
The random-effects model, applied in most meta-analyses nowadays, typically assumes normality of the...
Abstract Background Confidence intervals for the betw...
ABSTRACT. Approximations to the distribution of a common form of effect size are presented. Single s...
Meta-regression is becoming increasingly used to model study level covariate effects. However this t...
Meta-analyses are conducted to synthesize the quantitative results of related studies. The random-ef...
Random-effects meta-analysis requires an estimate of the between-study variance, $\tau^2$. We study ...
Random-effects models are frequently used to synthesize information from different studies in meta-a...
The accuracy and precision of the estimation of population effect size was evaluated using standardi...
Moment-based estimators of the between-study variance are very popular when performing random effect...
The meta-analytic random effects model assumes that the variability in effect size estimates drawn f...
Dependent effect sizes are ubiquitous in meta-analysis. Using Monte Carlo simulation, we compared th...
Two methods of quantifying heterogeneity between studies in meta-analysis were studied. One method q...
The DerSimonian-Laird confidence interval for the average treatment effect in meta-analysis is widel...
The effect sizes of studies included in a meta‐analysis do often not share a common true effect size...
Meta-analyses are an important tool within systematic reviews to estimate the overall effect size an...
The random-effects model, applied in most meta-analyses nowadays, typically assumes normality of the...
Abstract Background Confidence intervals for the betw...
ABSTRACT. Approximations to the distribution of a common form of effect size are presented. Single s...
Meta-regression is becoming increasingly used to model study level covariate effects. However this t...
Meta-analyses are conducted to synthesize the quantitative results of related studies. The random-ef...
Random-effects meta-analysis requires an estimate of the between-study variance, $\tau^2$. We study ...
Random-effects models are frequently used to synthesize information from different studies in meta-a...
The accuracy and precision of the estimation of population effect size was evaluated using standardi...
Moment-based estimators of the between-study variance are very popular when performing random effect...
The meta-analytic random effects model assumes that the variability in effect size estimates drawn f...
Dependent effect sizes are ubiquitous in meta-analysis. Using Monte Carlo simulation, we compared th...
Two methods of quantifying heterogeneity between studies in meta-analysis were studied. One method q...