Goodness-of-Fit Testing for H\"older-Continuous Densities: Sharp Local Minimax Rates

Abstract

We consider the goodness-of fit testing problem for H\"older smooth densities over Rd: given n iid observations with unknown density p and given a known density p0, we investigate how large should be to distinguish, with high probability, the case p=p0 from the composite alternative of all H\"older-smooth densities p such that \|p-p0\|t ≥ where t ∈ [1,2]. The densities are assumed to be defined over Rd and to have H\"older smoothness parameter α>0. In the present work, we solve the case α ≤ 1 and handle the case α>1 using an additional technical restriction on the densities. We identify matching upper and lower bounds on the local minimax rates of testing, given explicitly in terms of p0. We propose novel test statistics which we believe could be of independent interest. We also establish the first definition of an explicit cutoff uB allowing us to split Rd into a bulk part (defined as the subset of Rd where p0 takes only values greater than or equal to uB) and a tail part (defined as the complementary of the bulk), each part involving fundamentally different contributions to the local minimax rates of testing.