Axiomatizations of Presburger Arithmetic With Predicates For Powers
Abstract
We give a complete first-order axiomatization of the structure (Z,+,(N)∈ L), where L ⊂eq Z 2 is a set of pairwise multiplicatively independent integers and N = \n : n∈ N\. Using recent work of Karimov et al., we obtain that this axiomatization is computable for |L|=2, which proves that (Z,+,kN, N) is decidable for k, ∈ Z 2. Furthermore, we give an axiomatization of the universal theory of (Z,+,<,(N)∈ L).
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