Confidence intervals for the between group variance in the unbalanced one-way random effects model of anaylsis of variance
- 1 January 2000
- journal article
- research article
- Published by Taylor & Francis in Journal of Statistical Computation and Simulation
- Vol. 65 (1-4) , 311-323
- https://doi.org/10.1080/00949650008812004
Abstract
A confidence interval for the between group variance is proposed which is deduced from Wald'sexact confidence interval for the rtio of the two variance components in the one-way random effects model and the exact confidence interval for the error variance resp.an unbiased estimator of the error variance. In a simulation study the confidence coeffecients for these two intervals are compared with the confidence coefficients of two other commonly used confidence intervals. There the confidence interval derived here yields confidence coefficiends which are always greater than the prescriped level.Keywords
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This publication has 10 references indexed in Scilit:
- Variance ComponentsPublished by Wiley ,1992
- Confidence Intervals on Variance ComponentsPublished by Taylor & Francis ,1992
- On the Lower Bound of Confidence Coefficients for a Confidence Interval on Variance ComponentsPublished by JSTOR ,1990
- Confidence intervals on the among group variance component in the unbalanced one-fold nested designJournal of Statistical Computation and Simulation, 1986
- Confidence intervals on the intraclass correlation in the unbalanced one-way classificationCommunications in Statistics - Theory and Methods, 1986
- Interval Estimation for the Unbalanced Case of the One-Way Random Effects ModelThe Annals of Statistics, 1978
- Confidence Intervals for Variance Components -- A Comparative Monte Carlo StudyPublished by JSTOR ,1974
- A confidence interval for variance componentsBiometrika, 1962
- Components in RegressionBiometrics, 1951
- A Note on the Analysis of Variance with Unequal Class FrequenciesThe Annals of Mathematical Statistics, 1940