Testing for unspecified periodicities in binary time series

Abstract

Given independent random variables Y1, …, Yn with Yi ∈ \0,1\ we test the hypothesis whether the underlying success probabilities pi are constant or whether they are periodic with an unspecified period length of r 2. The test relies on an auxiliary integer d which can be chosen arbitrarily, using which a new time series of length d is constructed. For this new time series, the test statistic is derived according to the classical g test by Fisher. Under the null hypothesis of a constant success probability it is shown that the test keeps the level asymptotically, while it has power for most alternatives, i.e. typically in the case of r 3 and where r and d have common divisors.

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