A strong version of Cobham's theorem

Abstract

Let k,≥ 2 be two multiplicatively independent integers. Cobham's famous theorem states that a set X⊂eq N is both k-recognizable and -recognizable if and only if it is definable in Presburger arithmetic. Here we show the following strengthening: let X⊂eq Nm be k-recognizable, let Y⊂eq Nn be -recognizable such that both X and Y are not definable in Presburger arithmetic. Then the first-order logical theory of (N,+,X,Y) is undecidable. This is in contrast to a well-known theorem of B\"uchi that the first-order logical theory of (N,+,X) is decidable.

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