Definability of the ring of integers in some infinite algebraic extensions of the rationals

Mathematical Logic Quarterly 58 (4-5):317-332 (2012)
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Abstract

Let K be an infinite Galois extension of the rationals such that every finite subextension has odd degree over the rationals and its prime ideals dividing 2 are unramified. We show that its ring of integers is first-order definable in K. As an application we prove that equation image together with all its Galois subextensions are undecidable, where Δ is the set of all the prime integers which are congruent to −1 modulo 4

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10.1002/malq.201110020

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The Undecidability of Algebraic Rings and Fields.Julia Robinson - 1964 - Journal of Symbolic Logic 29 (1):57-58.

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