Power one sequential tests exist for weakly compact P against Pc

Abstract

Suppose we observe data from a distribution P and we wish to test the composite null hypothesis that P∈ P against a composite alternative P∈ Q⊂eq Pc. Herbert Robbins and coauthors pointed out around 1970 that, while no batch test can have a level α∈(0,1) and power equal to one, sequential tests can be constructed with this fantastic property. Since then, and especially in the last decade, a plethora of sequential tests have been developed for a wide variety of settings. However, the literature has not yet provided a clean and general answer as to when such power-one sequential tests exist. This paper provides a remarkably general sufficient condition (that we also prove is not necessary). Focusing on i.i.d. laws in Polish spaces without any further restriction, we show that there exists a level-α sequential test for any weakly compact P, that is power-one against Pc (or any subset thereof). We show how to aggregate such tests into an e-process for P that increases to infinity under Pc. We conclude by building an e-process that is asymptotically relatively growth rate optimal against Pc, an extremely powerful result.