On shrinkage estimation of a spherically symmetric distribution for balanced loss functions

Abstract

We consider the problem of estimating the mean vector θ of a d-dimensional spherically symmetric distributed X based on balanced loss functions of the forms: (i) ω (\|-0\|2) +(1-ω)(\| - θ\|2) and (ii) (ω \| - 0\|2 +(1-ω)\| - θ\|2), where δ0 is a target estimator, and where and are increasing and concave functions. For d≥ 4 and the target estimator δ0(X)=X, we provide Baranchik-type estimators that dominate δ0(X)=X and are minimax. The findings represent extensions of those of Marchand \& Strawderman (ms2020) in two directions: (a) from scale mixture of normals to the spherical class of distributions with Lebesgue densities and (b) from completely monotone to concave ' and '.