Asymptotic efficiency of p-mean tests for means in high dimensions

Abstract

The asymptotic efficiency, AREp,2, of the tests for multivariate means theta in d based on the p-means relative to the standard 2-mean, (approximate) likelihood ratio test (LRT), is considered for large dimensions d. It turns out that these p-mean tests for p>2 may greatly outperform the LRT while never being significantly worse than the LRT. For instance, AREp,2 for p=3 varies from about 0.96 to ∞, depending on the direction of the alternative mean vector theta1, for the null hypothesis H0: theta=\0. These results are based on a complete characterization, under certain general and natural conditions, of the varying pairs (n,theta1) for which the values of the power of the p-mean test for theta=\0 and theta=theta1 tend, respectively, to prescribed values alpha and beta. The proofs use such classic results as the Berry-Esseen bound in the central limit theorem and the conditions of convergence to a given infinitely divisible distribution, as well as a recent result by the author on the Schur2-concavity properties of Gaussian measures.