Growth-Optimal E-Variables and an extension to the multivariate Csisz\'ar-Sanov-Chernoff Theorem

Abstract

We consider growth-optimal e-variables with maximal e-power, both in an absolute and relative sense, for simple null hypotheses for a d-dimensional random vector, and multivariate composite alternatives represented as a set of d-dimensional means 1. These include, among others, the set of all distributions with mean in 1, and the exponential family generated by the null restricted to means in 1. We show how these optimal e-variables are related to Csisz\'ar-Sanov-Chernoff bounds, first for the case that 1 is convex (these results are not new; we merely reformulate them) and then for the case that 1 `surrounds' the null hypothesis (these results are new).

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