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Related papers: Linear Orders in Presburger Arithmetic

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Presburger Arithmetic $\mathop{\mathbf{PrA}}\nolimits$ is the true theory of natural numbers with addition. We consider linear orderings interpretable in Presburger Arithmetic and establish various necessary and sufficient conditions for…

Logic · Mathematics 2019-11-27 Alexander Zapryagaev

We completely characterize definable linear orders in o-minimal structures expanding groups. For example, let (P,<_p) be a linear order definable in the real field R. Then (P,<_p) embeds definably in (R^{n+1},<_l), where <_l is the…

Logic · Mathematics 2010-11-09 Janak Ramakrishnan

This paper is devoted to understand groups definable in Presburger arithmetic. We prove the following theorems: Theorem 1. Every group definable in a model of Presburger Arithmetic is abelian-by-finite. Theorem 2. Every bounded group…

Logic · Mathematics 2018-11-13 Alf Onshuus , Mariana Vicaría

Presburger Arithmetic is the true theory of natural numbers with addition. We study interpretations of Presburger Arithmetic in itself. The main result of this paper is that all self-interpretations are definably isomorphic to the trivial…

Logic · Mathematics 2020-04-08 Fedor Pakhomov , Alexander Zapryagaev

We give a complete first-order axiomatization of the structure $(\mathbb{Z},+,(\ell^{\mathbb{N}})_{\ell\in L})$, where $L \subseteq \mathbb{Z}_{\ge 2}$ is a set of pairwise multiplicatively independent integers and $\ell^{\mathbb{N}} =…

Logic · Mathematics 2026-02-24 Philipp Hieronymi , Michael Reitmeir , Xiaoduo Wang

This paper gives a thorough overview of what is known about first-order logic with counting quantifiers and with arithmetic predicates. As a main theorem we show that Presburger arithmetic is closed under unary counting quantifiers.…

Logic in Computer Science · Computer Science 2007-05-23 Nicole Schweikardt

We entirely classify definable sets up to definable bijections in $\mathbb{Z}$-groups, where the language is the one of ordered abelian groups. From this, we deduce, among others, a classification of definable families of bounded definable…

Logic · Mathematics 2018-01-17 Raf Cluckers , Immanuel Halupczok

We show pro-definability of spaces of definable types in various classical complete first order theories, including complete o-minimal theories, Presburger arithmetic, $p$-adically closed fields, real closed and algebraically closed valued…

Logic · Mathematics 2022-08-09 Pablo Cubides Kovacsics , Jinhe Ye

We show that if a first-order structure $\mathcal{M}$, with universe $\mathbb{Z}$, is an expansion of $(\mathbb{Z},+,0)$ and a reduct of $(\mathbb{Z},+,<,0)$, then $\mathcal{M}$ must be interdefinable with $(\mathbb{Z},+,0)$ or…

Logic · Mathematics 2018-07-17 Gabriel Conant

We show that the decidability of the first-order theory of the language that combines Boolean algebras of sets of uninterpreted elements with Presburger arithmetic operations. We thereby disprove a recent conjecture that this theory is…

Logic in Computer Science · Computer Science 2007-05-23 Viktor Kuncak , Martin Rinard

We consider expansions of Presburger arithmetic with families of monadic polynomial predicates. (Examples of such predicates are the set of perfect squares, or the set of integers of the form $2n^3-5n+3$, etc.) Although the full attendant…

Logic in Computer Science · Computer Science 2026-05-19 Piotr Bacik , Joris Nieuwveld , Joël Ouaknine , Mihir Vahanwala , Madhavan Venkatesh , Emil Rugaard Wieser

The first-order theory of addition over the natural numbers, known as Presburger arithmetic, is decidable in double exponential time. Adding an uninterpreted unary predicate to the language leads to an undecidable theory. We sharpen the…

Logic in Computer Science · Computer Science 2017-03-06 Matthias Horbach , Marco Voigt , Christoph Weidenbach

We show that the first-order theory of Sturmian words over Presburger arithmetic is decidable. Using a general adder recognizing addition in Ostrowski numeration systems by Baranwal, Schaeffer and Shallit, we prove that the first-order…

Logic in Computer Science · Computer Science 2024-08-14 Philipp Hieronymi , Dun Ma , Reed Oei , Luke Schaeffer , Christian Schulz , Jeffrey Shallit

An algebraic linear ordering is a component of the initial solution of a first-order recursion scheme over the continuous categorical algebra of countable linear orderings equipped with the sum operation and the constant 1. Due to a general…

Formal Languages and Automata Theory · Computer Science 2010-02-10 Stephen L. Bloom , Zoltan Esik

We show that it is decidable whether or not a relation on the reals definable in the structure $\langle \mathbb{R}, +,<, \mathbb{Z} \rangle$ can be defined in the structure $\langle \mathbb{R}, +,<, 1 \rangle$. This result is achieved by…

Logic in Computer Science · Computer Science 2023-06-22 Alexis Bès , Christian Choffrut

Presburger arithmetic PrA is the true theory of natural numbers with addition. We study interpretations of PrA in itself. We prove that all one-dimensional self-interpretations are definably isomorphic to the identity self-interpretation.…

Logic · Mathematics 2018-01-31 Alexander Zapryagaev , Fedor Pakhomov

Presburger arithmetic is the first-order theory of the natural numbers with addition (but no multiplication). We characterize sets that can be defined by a Presburger formula as exactly the sets whose characteristic functions can be…

Combinatorics · Mathematics 2015-05-08 Kevin Woods

We prove that for any integers $\alpha, \beta > 1$, the existential fragment of the first-order theory of the structure $\langle \mathbb{Z}; 0,1,<, +, \alpha^{\mathbb{N}}, \beta^{\mathbb{N}}\rangle$ is decidable (where $\alpha^{\mathbb{N}}$…

Logic in Computer Science · Computer Science 2025-07-22 Toghrul Karimov , Florian Luca , Joris Nieuwveld , Joël Ouaknine , James Worrell

We determine all groups definable in Presburger arithmetic, up to a finite index subgroup.

Logic · Mathematics 2021-12-06 Juan Pablo Acosta López

We show that, for every linear ordering of $[2]^n$, there is a large subcube on which the ordering is lexicographic. We use this to deduce that every long sequence contains a long monotone subsequence supported on an affine cube. More…

Combinatorics · Mathematics 2019-07-01 Boris Bukh , Anish Sevekari
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