Minimax properties of Dirichlet kernel density estimators

Abstract

This paper considers the asymptotic behavior in β-H\"older spaces, and under Lp losses, of a Dirichlet kernel density estimator proposed by Aitchison and Lauder (1985) for the analysis of compositional data. In recent work, Ouimet and Tolosana-Delgado (2022) established the uniform strong consistency and asymptotic normality of this estimator. As a complement, it is shown here that the Aitchison-Lauder estimator can achieve the minimax rate asymptotically for a suitable choice of bandwidth whenever (p,β) ∈ [1, 3) × (0, 2] or (p, β) ∈ Ad, where Ad is a specific subset of [3, 4) × (0, 2] that depends on the dimension d of the Dirichlet kernel. It is also shown that this estimator cannot be minimax when either p ∈ [4, ∞) or β ∈ (2, ∞). These results extend to the multivariate case, and also rectify in a minor way, earlier findings of Bertin and Klutchnikoff (2011) concerning the minimax properties of Beta kernel estimators.

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