EQUIVARIANT ESTIMATION UNDER THE PITMAN CLOSENESS CRITERION

For the point estimation in models with group structures, an invariance approach to deriving superior estimators is discussed in the Pitman closeness (PC) criterion. When the maximal invariant statistic is parameter-free, that is, ancillary, the closest equivariant estimator to the true value in the PC criterion is presented. On the other hand, as an example where a distribution of the maximal invariant statistic depends on unknown parameters, the paper treats the Stein problem in estimation of a variance and obtains an improved estimator in the PC criterion by Stein's invariance approach. Also the Stein problem in simultaneous estimation of a location vector of a spherical symmetric distribution is studied.