Minimax L2-Separation Rate in Testing the Sobolev-Type Regularity of a function

Abstract

In this paper we study the problem of testing if an L2-function f belonging to a certain l2-Sobolev-ball Bt(R) of radius R>0 with smoothness level t>0 indeed exhibits a higher smoothness level s>t, that is, belongs to Bs(R). We assume that only a perturbed version of f is available, where the noise is governed by a standard Brownian motion scaled by 1n. More precisely, considering a testing problem of the form H0:~f∈ Bs(R)~~vs.~~H1:~f∈ Bt(R),~∈fh∈ Bs f-hL2> for some >0, we approach the task of identifying the smallest value for , denoted , enabling the existence of a test with small error probability in a minimax sense. By deriving lower and upper bounds on , we expose its precise dependence on n: n-t2t+1/2. As a remarkable aspect of this composite-composite testing problem, it turns out that the rate does not depend on s and is equal to the rate in signal-detection, i.e. the case of a simple null hypothesis.