Fixed-Size Confidence Regions for the Multinormal Mean in an Intraclass Correlation Model
DOI10.1080/01966324.1995.10737401zbMath0855.62039OpenAlexW2318842634WikidataQ58186240 ScholiaQ58186240MaRDI QIDQ4715611
Yoshikazu Takada, Hiroto Hyakutake, Makoto Aoshima
Publication date: 9 February 1997
Published in: American Journal of Mathematical and Management Sciences (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/01966324.1995.10737401
asymptotic approximationintraclass correlation coefficientmultivariate normal distributiontwo-stage proceduremean vectorpurely sequential procedurefixed-size confidence regions
Estimation in multivariate analysis (62H12) Parametric tolerance and confidence regions (62F25) Measures of association (correlation, canonical correlation, etc.) (62H20) Sequential estimation (62L12)
Related Items
Cites Work
- Unnamed Item
- Unnamed Item
- Asymptotic distributions of the MLE's and the LR test in the growth curve model with a serial covariance structure
- Note on the utilization of the generalized student ratio in the analysis of variance or dispersion
- A consistent and asymptotically efficient two-stage procedure to construct fixed width confidence intervals for the mean
- Second order approximations for sequential point and interval estimation
- The Heteroscedastic Method II: Simplified Sampling
- Two-Sample Procedures in Simultaneous Estimation
- Fixed–size confidence regions for the mean vector of a multinormal distribution
- On a General Selection Procedure for Multivariate Normal Populations: Asymptotic Approximation to Constants
- On the Asymptotic Theory of Fixed-Width Sequential Confidence Intervals for the Mean
- A Two-Sample Test for a Linear Hypothesis Whose Power is Independent of the Variance
