Improved multivariate normal mean estimation with unknown covariance when p is greater than n

Abstract

We consider the problem of estimating the mean vector of a p-variate normal (θ,) distribution under invariant quadratic loss, (δ-θ)'-1(δ-θ), when the covariance is unknown. We propose a new class of estimators that dominate the usual estimator δ0(X)=X. The proposed estimators of θ depend upon X and an independent Wishart matrix S with n degrees of freedom, however, S is singular almost surely when p>n. The proof of domination involves the development of some new unbiased estimators of risk for the p>n setting. We also find some relationships between the amount of domination and the magnitudes of n and p.