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On shrinkage estimation for balanced loss functions

Statistics Theory 2019-04-08 v1 Statistics Theory

Abstract

The estimation of a multivariate mean θ\theta is considered under natural modifications of balanced loss function of the form: (i) ωρ(δδ02)+(1ω)ρ(δθ2)\omega \, \rho(\|\delta-\delta_0\|^2) + (1-\omega) \, \rho(\|\delta-\theta\|^2) , and (ii) (ωδδ02+(1ω)δθ2)\ell \left( \omega \, \|\delta-\delta_0\|^2 + (1-\omega) \, \|\delta-\theta\|^2 \right)\,, where δ0\delta_0 is a target estimator of γ(θ)\gamma(\theta). After briefly reviewing known results for original balanced loss with identity ρ\rho or \ell, we provide, for increasing and concave ρ\rho and \ell which also satisfy a completely monotone property, Baranchik-type estimators of θ\theta which dominate the benchmark δ0(X)=X\delta_0(X)=X for XX either distributed as multivariate normal or as a scale mixture of normals. Implications are given with respect to model robustness and simultaneous dominance with respect to either ρ\rho or $\ell

Keywords

Cite

@article{arxiv.1904.03171,
  title  = {On shrinkage estimation for balanced loss functions},
  author = {Éric Marchand and William E. Strawderman},
  journal= {arXiv preprint arXiv:1904.03171},
  year   = {2019}
}

Comments

15 pages

R2 v1 2026-06-23T08:30:48.940Z