A generalization of Cobham's Theorem
classification
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keywords
cobhamprimitivesigmasubstitutiontheoremdependentdominanteigenvalues
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If a non-periodic sequence $X$ is the image by a morphism of a fixed point of both a primitive substitution $\sigma$ and a primitive substitution $\tau$, then the dominant eigenvalues of the matrices of $\sigma$ and of $\tau$ are multiplicatively dependent. This is the way we propose to generalize Cobham's Theorem.
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