Predictive density estimators with integrated L1 loss

Abstract

This paper addresses the problem of an efficient predictive density estimation for the density q(\|y-θ\|2) of Y based on X p(\|x-θ\|2) for y, x, θ ∈ Rd. The chosen criteria are integrated L1 loss given by L(θ, q) \, =\, ∫Rd |q(y)- q(\|y-θ\|2) | \, dy, and the associated frequentist risk, for θ ∈ . For absolutely continuous and strictly decreasing q, we establish the inevitability of scale expansion improvements qc(y;X)\,=\, 1cd q(\|y-X\|2/c2 ) over the plug-in density q1, for a subset of values c ∈ (1,c0). The finding is universal with respect to p,q, and d ≥ 2, and extended to loss functions γ (L(θ, q ) ) with strictly increasing γ. The finding is also extended to include scale expansion improvements of more general plug-in densities q(\|y-θ(X)\|2 ), when the parameter space is a compact subset of Rd. Numerical analyses illustrative of the dominance findings are presented and commented upon. As a complement, we demonstrate that the unimodal assumption on q is necessary with a detailed analysis of cases where the distribution of Y|θ is uniformly distributed on a ball centered about θ. In such cases, we provide a univariate (d=1) example where the best equivariant estimator is a plug-in estimator, and we obtain cases (for d=1,3) where the plug-in density q1 is optimal among all qc.