Admissible Bayes equivariant estimation of location vectors for spherically symmetric distributions with unknown scale

Abstract

This paper investigates estimation of the mean vector under invariant quadratic loss for a spherically symmetric location family with a residual vector with density of the form f(x,u)=η(p+n)/2f(η\\|x-θ\|2+\|u\|2\) , where η is unknown. We show that the natural estimator x is admissible for p=1,2. Also, for p≥ 3, we find classes of generalized Bayes estimators that are admissible within the class of equivariant estimators of the form \1-(x/\|u\|)\x. In the Gaussian case, a variant of the James--Stein estimator, [1-\(p-2)/(n+2)\/\\|x\|2/\|u\|2+(p-2)/(n+2)+1\]x, which dominates the natural estimator x, is also admissible within this class. We also study the related regression model.