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To prove that Hilbert's tenth problem over a ring R has a negative answer, usually the integers or another ring for which Hilbert's tenth problem has a negative solution is modelled inside the ring of interest. In this paper, we formalize…

Logic · Mathematics 2024-10-28 A. Eggink

We study systems of polynomial equations in infinite finitely generated commutative associative rings with an identity element. For each such ring $R$ we obtain an interpretation by systems of equations of a ring of integers $O$ of a finite…

Number Theory · Mathematics 2021-02-08 Albert Garreta , Alexei Miasnikov , Denis Ovchinnikov

Let R be a recursive subring of a number field. We show that recursively enumerable sets are diophantine for the polynomial ring R[Z].

Number Theory · Mathematics 2008-09-11 Jeroen Demeyer

We prove that infinite p-adically discrete sets have Diophantine definitions in large subrings of some number fields. First, if K is a totally real number field or a totally complex degree-2 extension of a totally real number field, then…

Number Theory · Mathematics 2017-04-03 Bjorn Poonen , Alexandra Shlapentokh

We study systems of polynomial equations in several classes of finitely generated rings and algebras. For each ring $R$ (or algebra) in one of these classes we obtain an interpretation by systems of equations of a ring of integers $O$ of a…

Rings and Algebras · Mathematics 2022-10-26 Albert Garreta , Alexei Miasnikov , Denis Ovchinnikov

We establish that all rings of $S$-integers are universally definable in function fields in one variable over certain ground fields including global and non-archimedean local fields. That is, we show that the complement of such a ring of…

Number Theory · Mathematics 2026-05-01 Nicolas Daans , Philip Dittmann

The recent negative answer to Hilbert's tenth problem over rings of integers relies on a theorem that for every extension of number fields $L/K$, if there is an abelian variety $A$ over $K$ such that $0 < \operatorname{rank} A(K) =…

Number Theory · Mathematics 2025-10-23 Bjorn Poonen

We prove that Hilbert's Tenth Problem for a ring of integers in a number field K has a negative answer if K satisfies two arithmetical conditions (existence of a so-called division-ample set of integers and of an elliptic curve of rank one…

Number Theory · Mathematics 2007-05-23 Gunther Cornelissen , Thanases Pheidas , Karim Zahidi

We study the Diophantine problem (decidability of finite systems of equations) in different classes of finitely generated solvable groups (nilpotent, polycyclic, metabelian, free solvable, etc), which satisfy some natural…

Group Theory · Mathematics 2020-03-25 Albert Garreta , Alexei Miasnikov , Denis Ovchinnikov

We consider Hilbert's tenth problem for two families of noncommutative rings. Let $K$ be a field of characteristic $p$. We start by showing that Hilbert's tenth problem has a negative answer over the twisted polynomial ring $K\{\tau\}$ and…

Number Theory · Mathematics 2024-10-07 A. Eggink

Let k be a global field and \pp any nonarchimedean prime of k. We give a new and uniform proof of the well known fact that the set of all elements of k which are integral at \pp is diophantine over k. Let k^{perf} be the perfect closure of…

Number Theory · Mathematics 2007-05-23 Kirsten Eisentraeger

For a positive proportion of primes $p$ and $q$, we prove that $\mathbb{Z}$ is Diophantine in the ring of integers of $\mathbb{Q}(\sqrt[3]{p},\sqrt{-q})$. This provides a new and explicit infinite family of number fields $K$ such that…

Number Theory · Mathematics 2019-09-05 Natalia Garcia-Fritz , Hector Pasten

Yuri Matiyasevich's theorem states that the set of all Diophantine equations which have a solution in non-negative integers is not recursive. Craig Smory\'nski's theorem states that the set of all Diophantine equations which have at most…

Logic · Mathematics 2019-09-16 Agnieszka Peszek , Apoloniusz Tyszka

Except for a limited number of cases, a complete classification of the Diophantine sets of polynomial rings and fields of rational functions seems out of reach at present. We contribute to this problem by proving that several natural sets…

Number Theory · Mathematics 2022-10-20 Natalia Garcia-Fritz , Hector Pasten , Thanases Pheidas

Let $K$ be a one-variable function field over a field of constants of characteristic 0. Let $R$ be a holomorphy subring of $K$, not equal to $K$. We prove the following undecidability results for $R$: If $K$ is recursive, then Hilbert's…

Logic · Mathematics 2009-01-19 Laurent Moret-Bailly , Alexandra Shlapentokh

One of the main open problems regarding decidability of the existential theory of rings is the analogue of Hilbert's Tenth Problem (HTP) for the ring of entire holomorphic functions in one variable. In the direction of a negative solution,…

Number Theory · Mathematics 2021-11-08 D. Chompitaki , N. Garcia-Fritz , H. Pasten , T. Pheidas , X. Vidaux

This paper explores multiple closely related themes: bounding the complexity of Diophantine equations over the integers and developing mathematical proofs in parallel with formal theorem provers. Hilbert's Tenth Problem (H10) asks about the…

Number Theory · Mathematics 2025-07-01 Jonas Bayer , Marco David , Malte Hassler , Yuri Matiyasevich , Dierk Schleicher

We present a universal construction of Diophantine equations with bounded complexity in Isabelle/HOL. This is a formalization of our own work in number theory. Hilbert's Tenth Problem was answered negatively by Yuri Matiyasevich, who showed…

Logic in Computer Science · Computer Science 2025-09-30 Jonas Bayer , Marco David

For a nice algebraic variety $X$ over a number field $F$, one of the central problems of Diophantine Geometry is to locate precisely the set $X(F)$ inside $X(\A_F)$, where $\A_F$ denotes the ring of ad\`eles of $F$. One approach to this…

Number Theory · Mathematics 2018-06-14 Otto Overkamp

A negative solution to Hilbert's tenth problem for the ring of integers $O_F$ of a number field $F$ would follow if $\mathbb{Z}$ were Diophantine in $O_F$. Denef and Lipshitz conjectured that the latter occurs for every number field $F$. In…

Number Theory · Mathematics 2022-07-21 Hector Pasten
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