A divisibility theorem for odd J-characteristics of two-level designs
Abstract
We prove a divisibility theorem for the signed J-characteristics of two-level designs: if the number of factors n is odd and every J-characteristic of a proper odd-cardinality subset of factors vanishes, then the top J-characteristic is divisible by 2n-1. As an arithmetic consequence, any two-level design whose J-characteristics vanish in orders one, two, three, five, and seven but which has a nonzero odd-order J-characteristic must have at least 256 runs. This settles, uniformly in the number of factors, a conjecture of Eendebak, Schoen, Vazquez, and Goos (2023) on the nonexistence of certain strength-three even--odd designs with 56 or 64 runs. The divisibility bound is sharp at every odd order and is attained by the even-weight half-fraction.
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