Monte Carlo Comparison of ANOVA, MIVQUE, REML, and ML Estimators of Variance Components

Abstract

For the one-way classification random model with unbalanced data, we compare five estimators of σ² _a and σ² _e , the among- and within-treatments variance components: analysis of variance (ANOVA), maximum likelihood (ML), restricted maximum likelihood (REML), and two minimum variance quadratic unbiased (MIVQUE) estimators. MIVQUE(0) is MIVQUE with a priori values = 0 and = 1; MIVQUE(A) is MIVQUE with the ANOVA estimates used as a priori's, We enforce nonnegativity for all estimators, setting any negative estimate to zero in accord with usual practice. The estimators are compared through their biases and MSE's, estimated by Monte Carlo simulation. Our results indicate that the ANOVA estimators perform well, except with seriously unbalanced data when σ² _a /σ² _e > 1; ML is excellent when σ² _a /σ² _e < 0.5, and MIVQUE(A) is adequate; further iteration to the REML estimates is unnecessary. When σ² _a /σ² _e ≥ 1, MIVQUE(0) (the default for SASS PROCEDURE VARCOMP) is poor for estimating σ² _a and very poor for σ² _e , even for just mildly unbalanced data.