First-order definitions of rings of integral functions over algebraic extensions of function fields and undecidability
Abstract
In this paper, we study questions of definability and decidability for infinite algebraic extensions K of Fp(t) and their subrings of S-integral functions. We focus on fields K satisfying a local property which we call q-boundedness. This can be considered a function field analogue of prior work of the first author which considered algebraic extensions of Q. One simple consequence of our work states that if K is a q-bounded Galois extension of Fp(t), then for infinitely many non-constant u the integral closure O K of Fp[u] inside K is first-order definable in K. Under the additional assumption that the constant subfield of K is infinite, it follows that both O K and K have undecidable first-order theories, and that Fp[w] is definable in K for every non-constant w in K. Our primary tools are norm equations and the Hasse Norm Principle, in the spirit of Rumely. Our paper has an intersection with a recent arXiv preprint by Mart\'inez-Ranero, Salcedo, and Utreras, although our definability results are more extensive and undecidability results are much stronger.
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