Sharp Local Minimax Rates for Goodness-of-Fit Testing in multivariate Binomial and Poisson families and in multinomials

Abstract

We consider the identity testing problem - or goodness-of-fit testing problem - in multivariate binomial families, multivariate Poisson families and multinomial distributions. Given a known distribution p and n iid samples drawn from an unknown distribution q, we investigate how large >0 should be to distinguish, with high probability, the case p=q from the case d(p,q) ≥ , where d denotes a specific distance over probability distributions. We answer this question in the case of a family of different distances: d(p,q) = \|p-q\|t for t ∈ [1,2] where \|·\|t is the entrywise t norm. Besides being locally minimax-optimal - i.e. characterizing the detection threshold in dependence of the known matrix p - our tests have simple expressions and are easily implementable.