Multivariate Empirical Bayes and Estimation of Covariance Matrices,
Abstract
The problem of estimating a covariance matrix in the standard multivariate normal situation is considered. The loss function is one obtained naturally from the problem of estimating several normal mean vectors in an empirical Bayes Situation. Estimators which dominate any constant multiple of the sample covariance matrix are presented. These estimators work by shrinking the sample eigenvalues toward a central value, in much the same way as the James-Stein estimator for a mean vector shrinks the maximum likelihood estimators toward a common value.
Document Details
- Document Type
- Technical Report
- Publication Date
- Sep 01, 1974
- Accession Number
- ADA031631
Entities
People
- Bradley Efron
- Carl Morris
Organizations
- RAND Corporation