A comparison of statistical methods for meta-analysis

Stat Med. 2001 Mar 30;20(6):825-40. doi: 10.1002/sim.650.

Abstract

Meta-analysis may be used to estimate an overall effect across a number of similar studies. A number of statistical techniques are currently used to combine individual study results. The simplest of these is based on a fixed effects model, which assumes the true effect is the same for all studies. A random effects model, however, allows the true effect to vary across studies, with the mean true effect the parameter of interest. We consider three methods currently used for estimation within the framework of a random effects model, and illustrate them by applying each method to a collection of six studies on the effect of aspirin after myocardial infarction. These methods are compared using estimated coverage probabilities of confidence intervals for the overall effect. The techniques considered all generally have coverages below the nominal level, and in particular it is shown that the commonly used DerSimonian and Laird method does not adequately reflect the error associated with parameter estimation, especially when the number of studies is small.

Publication types

  • Comparative Study

MeSH terms

  • Anti-Inflammatory Agents, Non-Steroidal / standards
  • Anti-Inflammatory Agents, Non-Steroidal / therapeutic use
  • Aspirin / standards
  • Aspirin / therapeutic use
  • Clinical Trials as Topic
  • Computer Simulation*
  • Humans
  • Likelihood Functions
  • Meta-Analysis as Topic*
  • Models, Biological*
  • Models, Statistical*
  • Myocardial Infarction / drug therapy
  • Myocardial Infarction / prevention & control

Substances

  • Anti-Inflammatory Agents, Non-Steroidal
  • Aspirin