The power function and an approximation for testing variance components in the presence of interaction in two-way random effects models
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Publication:3935314
DOI10.2307/3315299zbMath0477.62056OpenAlexW2114821919MaRDI QIDQ3935314
No author found.
Publication date: 1981
Published in: Canadian Journal of Statistics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.2307/3315299
Asymptotic distribution theory in statistics (62E20) Parametric hypothesis testing (62F03) Approximation by polynomials (41A10) Analysis of variance and covariance (ANOVA) (62J10)
Cites Work
- On Approximating the Null and Nonnull Distributions of the F Ration i Unbalanced Random-Effect Models from Nonnormal Universes
- Some Alternative Expansions for the Distribution Function of a Noncentral Chi-Square Random Variable
- On the Roy-Tiku Approximation to the Distribution of Sample Variances from Nonnormal Universes
- On approximating the central and noncentral multivariate gamma distributions
- Some notes on the relationship between the distributions of central and non-central F
- Partitioning of interaction in analysis of variance
- A New Analysis of Variance Model for Non-Additive Data
- Power Function of the F-Test Under Non-Normal Situations
- An Analysis of a Two-Way Model with Interaction and No Replication
- Linear Statistical Inference and its Applications
- Approximating the general non-normal variance-ratio sampling distributions
- BI-VARIATE k-STATISTICS AND CUMULANTS OF THEIR JOINT SAMPLING DISTRIBUTION
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