Cobham's theorem for the Gaussian integers
Abstract
Assuming the four exponentials conjecture, Hansel and Safer showed that if a subset S of the Gaussian integers is both α=-m+i - and β=-n+i-recognizable, then it is syndetic, and they conjectured that S must be eventually periodic. Without assuming the four exponentials conjecture, we show that if α and β are multiplicatively independent Gaussian integers, and at least one of α, β is not an n-th root of an integer, then any α- and β-automatic configuration is eventually periodic; in particular we prove Hansel and Safer's conjecture. Otherwise, there exist non-eventually periodic configurations which are α-automatic for any root of an integer α. Our work generalises the Cobham-Semenov theorem to Gaussian numerations.
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