BACKGROUND: Confidence intervals for the between study variance are useful in random-effects meta-analyses because they quantify the uncertainty in the corresponding point estimates. Methods for calculating these confidence intervals have been developed that are based on inverting hypothesis tests using generalised heterogeneity statistics. Whilst, under the random effects model, these new methods furnish confidence intervals with the correct coverage, the resulting intervals are usually very wide, making them uninformative.METHODS: We discuss a simple strategy for obtaining 95 % confidence intervals for the between-study variance with a markedly reduced width, whilst retaining the nominal coverage probability. Specifically, we consider the...
Several methods are available for generating confidence intervals for rate difference, rate ratio, o...
An unobserved random effect is often used to describe the between-study variation that is apparent i...
This paper compares the use of confidence intervals (CIs) and a sensitivity analysis called the numb...
Abstract Background Confidence intervals for the betw...
Meta-regression is becoming increasingly used to model study level covariate effects. However this t...
Confidence intervals must be robust in having nominal and actual probability coverage in close agree...
The DerSimonian-Laird confidence interval for the average treatment effect in meta-analysis is widel...
Background: Meta-analysis provides a useful statistical tool to effectively estimate treatment effec...
A random effects meta-analysis combines the results of several independent studies to summarise the ...
The effect sizes of studies included in a meta‐analysis do often not share a common true effect size...
In random-effects meta-analysis the between-study variance (τ 2) has a key role in assessing heterog...
One of the main objectives in meta-analysis is to estimate the overall effect size by calculating a ...
The probability coverage of intervals involving robust estimates of effect size based on seven proce...
Meta-analyses are an important tool within systematic reviews to estimate the overall effect size an...
Two methods of quantifying heterogeneity between studies in meta-analysis were studied. One method q...
Several methods are available for generating confidence intervals for rate difference, rate ratio, o...
An unobserved random effect is often used to describe the between-study variation that is apparent i...
This paper compares the use of confidence intervals (CIs) and a sensitivity analysis called the numb...
Abstract Background Confidence intervals for the betw...
Meta-regression is becoming increasingly used to model study level covariate effects. However this t...
Confidence intervals must be robust in having nominal and actual probability coverage in close agree...
The DerSimonian-Laird confidence interval for the average treatment effect in meta-analysis is widel...
Background: Meta-analysis provides a useful statistical tool to effectively estimate treatment effec...
A random effects meta-analysis combines the results of several independent studies to summarise the ...
The effect sizes of studies included in a meta‐analysis do often not share a common true effect size...
In random-effects meta-analysis the between-study variance (τ 2) has a key role in assessing heterog...
One of the main objectives in meta-analysis is to estimate the overall effect size by calculating a ...
The probability coverage of intervals involving robust estimates of effect size based on seven proce...
Meta-analyses are an important tool within systematic reviews to estimate the overall effect size an...
Two methods of quantifying heterogeneity between studies in meta-analysis were studied. One method q...
Several methods are available for generating confidence intervals for rate difference, rate ratio, o...
An unobserved random effect is often used to describe the between-study variation that is apparent i...
This paper compares the use of confidence intervals (CIs) and a sensitivity analysis called the numb...