Non asymptotic minimax rates of testing in signal detection with heterogeneous variances

Abstract

The aim of this paper is to establish non-asymptotic minimax rates of testing for goodness-of-fit hypotheses in a heteroscedastic setting. More precisely, we deal with sequences (Yj)j∈ J of independent Gaussian random variables, having mean (θj)j∈ J and variance (σj)j∈ J. The set J will be either finite or countable. In particular, such a model covers the inverse problem setting where few results in test theory have been obtained. The rates of testing are obtained with respect to l2 and l∞ norms, without assumption on (σj)j∈ J and on several functions spaces. Our point of view is completely non-asymptotic.