Minimax Optimal Estimators for Additive Scalar Functionals of Discrete Distributions

Abstract

In this paper, we consider estimators for an additive functional of φ, which is defined as θ(P;φ)=Σi=1kφ(pi), from n i.i.d. random samples drawn from a discrete distribution P=(p1,...,pk) with alphabet size k. We propose a minimax optimal estimator for the estimation problem of the additive functional. We reveal that the minimax optimal rate is characterized by the divergence speed of the fourth derivative of φ if the divergence speed is high. As a result, we show there is no consistent estimator if the divergence speed of the fourth derivative of φ is larger than p-4. Furthermore, if the divergence speed of the fourth derivative of φ is p4-α for α ∈ (0,1), the minimax optimal rate is obtained within a universal multiplicative constant as k2(n n)2α + k2-2αn.