Asymptotic distribution of the latent roots of the noncentral wishart distribution and the power of the likelihood ratio test for nonadditivity
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Publication:3891559
DOI10.2307/3314677zbMath0446.62022OpenAlexW1965899415MaRDI QIDQ3891559
Edward M. Carter, Muni S. Srivastava
Publication date: 1980
Published in: Canadian Journal of Statistics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.2307/3314677
asymptotic distributionnonadditivitylatent rootsnoncentral Wishart distributionpower of likelihood ratio test
Multivariate distribution of statistics (62H10) Asymptotic distribution theory in statistics (62E20) Hypothesis testing in multivariate analysis (62H15)
Related Items (5)
Asymptotic distributions of two test statistics for testing independence with missing data ⋮ Noncentral Wishart matrices, asymptotic normality of vec and smooth statistics ⋮ Inference on covariance matrices under rank restrictions ⋮ Laplace approximations to hypergeometric functions of two matrix arguments ⋮ Power Function Studies
Cites Work
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- Asymptotic distributions of the latent roots of the covariance matrix with multiple population roots
- A statistical model which combines features of factor analytic and analysis of variance techniques
- The Power of Two Tests for Nonadditivity
- On Analyzing Two-Way AoV Data with Interaction
- Partitioning of interaction in analysis of variance
- An Asymptotic Expansion for the Noncentral Wishart Distribution
- Multiplicative effects in two‐way analysis of variance
- Distributions of Matrix Variates and Latent Roots Derived from Normal Samples
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