Simulation study of estimating between-study variance and overall effect in meta-analysis of odds-ratios
Random-effects meta-analysis requires an estimate of the between-study variance, τ^2. We study methods of estimation of τ^2 and its confidence interval in meta-analysis of odds ratio, and also the performance of related estimators of the overall effect. We provide results of extensive simulations on five point estimators of τ^2 (the popular methods of DerSimonian-Laird, restricted maximum likelihood, and Mandel and Paule; the less-familiar method of Jackson; and the new method (KD) based on the improved approximation to the distribution of the Q statistic by Kulinskaya and Dollinger (2015)); five interval estimators for τ^2 (profile likelihood, Q-profile, Biggerstaff and Jackson, Jackson, and KD), six point estimators of the overall effect (the five inverse-variance estimators related to the point estimators of τ^2 and an estimator (SSW) whose weights use only study-level sample sizes), and eight interval estimators for the overall effect (five based on the point estimators for τ^2; the Hartung-Knapp-Sidik-Jonkman (HKSJ) interval; a KD-based modification of HKSJ; and an interval based on the sample-size-weighted estimator). Results of our simulations show that none of the point estimators of τ^2 can be recommended, however the new KD estimator provides a reliable coverage of τ^2. Inverse-variance estimators of the overall effect are substantially biased. The SSW estimator of the overall effect and the related confidence interval provide the reliable point and interval estimation of log-odds-ratio.
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