Your search keyword '"Patey, Ludovic"' showing total 213 results

1. Cross-constraint basis theorems and products of partitions

Author

Cervelle, Julien, Gaudelier, William, and Patey, Ludovic Levy

Subjects

Mathematics - Logic

Abstract

We both survey and extend a new technique from Lu Liu to prove separation theorems between products of Ramsey-type theorems over computable reducibility. We use this technique to show that Ramsey's theorem for $n$-tuples and three colors is not computably reducible to finite products of Ramsey's theorem for $n$-tuples and two colors., Comment: 35 pages

Published

2024

2. The reverse mathematics of the pigeonhole hierarchy

Author

Houérou, Quentin Le, Patey, Ludovic Levy, and Mimouni, Ahmed

Subjects

Mathematics - Logic, Computer Science - Logic in Computer Science, 03B30, 03F30, 05D10, 03D80, F.4.1

Abstract

The infinite pigeonhole principle for $k$ colors ($\mathsf{RT}_k$) states, for every $k$-partition $A_0 \sqcup \dots \sqcup A_{k-1} = \mathbb{N}$, the existence of an infinite subset~$H \subseteq A_i$ for some~$i < k$. This seemingly trivial combinatorial principle constitutes the basis of Ramsey's theory, and plays a very important role in computability and proof theory. In this article, we study the infinite pigeonhole principle at various levels of the arithmetical hierarchy from both a computability-theoretic and reverse mathematical viewpoint. We prove that this hierarchy is strict over~$\mathsf{RCA}_0$ using an elaborate iterated jump control construction, and study its first-order consequences. This is part of a large meta-mathematical program studying the computational content of combinatorial theorems.

Published

2024

3. $\Pi^0_4$ conservation of Ramsey's theorem for pairs

Author

Houérou, Quentin Le, Patey, Ludovic Levy, and Yokoyama, Keita

Subjects

Mathematics - Logic, 03F30, 03B30, 05D10

Abstract

In this article, we prove that Ramsey's theorem for pairs and two colors is a $\forall \Pi^0_4$ conservative extension of $\mathsf{RCA}_0 + \mathsf{B}\Sigma^0_2$, where a $\forall \Pi^0_4$ formula consists of a universal quantifier over sets followed by a $\Pi^0_4$ formula. The proof is an improvement of a result by Patey and Yokoyama and a step towards the resolution of the longstanding question of the first-order part of Ramsey's theorem for pairs., Comment: 36 pages. Changed the definition of Ramsey-like-Pi12-statement to the more restrictive notion of RT-like statement

Published

2024

4. $\Pi^0_4$ conservation of the Ordered Variable Word theorem

Author

Houérou, Quentin Le and Patey, Ludovic Levy

Subjects

Mathematics - Logic, 03F30, 03B30, 05D10

Abstract

A left-variable word over an alphabet~$A$ is a word over~$A \cup \{\star\}$ whose first letter is the distinguished symbol~$\star$ standing for a placeholder. The Ordered Variable Word theorem ($\mathsf{OVW}$), also known as Carlson-Simpson's theorem, is a tree partition theorem, stating that for every finite alphabet~$A$ and every finite coloring of the words over~$A$, there exists a word $c_0$ and an infinite sequence of left-variable words $w_1, w_2, \dots$ such that $\{ c_0 \cdot w_1[a_1] \cdot \dots \cdot w_k[a_k] : k \in \mathbb{N}, a_1, \dots, a_k \in A \}$ is monochromatic. In this article, we prove that $\mathsf{OVW}$ is $\Pi^0_4$-conservative over~$\mathsf{RCA}_0 + \mathsf{B}\Sigma^0_2$. This implies in particular that $\mathsf{OVW}$ does not imply $\mathsf{ACA}_0$ over~$\mathsf{RCA}_0$. This is the first principle for which the only known separation from~$\mathsf{ACA}_0$ involves non-standard models., Comment: 19 pages

Published

2024

5. Conservation of Ramsey's theorem for pairs and well-foundedness

Author

Houérou, Quentin Le, Patey, Ludovic Levy, and Yokoyama, Keita

Subjects

Mathematics - Logic

Abstract

In this article, we prove that Ramsey's theorem for pairs and two colors is $\Pi^1_1$-conservative over~$\mathsf{RCA}_0 + \mathsf{B}\Sigma^0_2 + \mathsf{WF}(\epsilon_0)$ and over~$\mathsf{RCA}_0 + \mathsf{B}\Sigma^0_2 + \bigcup_n \mathsf{WF}(\omega^\omega_n)$. These results improve theorems from Chong, Slaman and Yang and Ko{\l}odziejczyk and Yokoyama and belong to a long line of research towards the characterization of the first-order part of Ramsey's theorem for pairs., Comment: 36 pages

Published

2024

6. The weakness of the Erd\H{o}s-Moser theorem under arithmetic reductions

Author

Patey, Ludovic Levy and Mimouni, Ahmed

Subjects

Mathematics - Logic, 03B30

Abstract

The Erd\H{o}s-Moser theorem $(\mathsf{EM})$ says that every infinite tournament admits an infinite transitive subtournament. We study the computational behavior of the Erd\H{o}s-Moser theorem with respect to the arithmetic hierarchy, and prove that $\Delta^0_n$ instances of $\mathsf{EM}$ admit low${}_{n+1}$ solutions for every $n \geq 1$, and that if a set $B$ is not arithmetical, then every instance of $\mathsf{EM}$ admits a solution relative to which $B$ is still not arithmetical. We also provide a level-wise refinement of this theorem. These results are part of a larger program of computational study of combinatorial theorems in Reverse Mathematics.

Published

2023

7. The reverse mathematics of Carlson's theorem for located words

Author

Bompard, Tristan, Liu, Lu, and Patey, Ludovic

Subjects

Mathematics - Combinatorics, Mathematics - Logic

Abstract

In this article, we give two proofs of Carlson's theorem for located words in~$\mathsf{ACA}^+_0$. The first proof is purely combinatorial, in the style of Towsner's proof of Hindman's theorem. The second uses topological dynamics to show that an iterated version of Hindman's theorem for bounded sums implies Carlson's theorem for located words., Comment: 16 pages

Published

2022

8. Carlson-Simpson's lemma and applications in reverse mathematics

Author

d'Auriac, Paul-Elliot Anglès, Mignoty, Bastien, Liu, Lu, and Patey, Ludovic

Subjects

Mathematics - Logic

Abstract

We study the reverse mathematics of infinitary extensions of the Hales-Jewett theorem, due to Carlson and Simpson. These theorems have multiple applications in Ramsey's theory, such as the existence of finite big Ramsey numbers for the triangle-free graph, or the Dual Ramsey theorem. We show in particular that the Open Dual Ramsey theorem holds in $\mathsf{ACA}^{+}_0$., Comment: 13 pages

Published

2022

9. The Reverse Mathematics of CAC for trees

Author

Cervelle, Julien, Gaudelier, William, and Patey, Ludovic

Subjects

Mathematics - Logic

Abstract

CAC for trees is the statement asserting that any infinite subtree of $\mathbb{N}^{<\mathbb{N}}$ has an infinite path or an infinite antichain. In this paper, we study the computational strength of this theorem from a reverse mathematical viewpoint. We prove that TAC for trees is robust, that is, there exist several characterizations, some of which already appear in the literature, namely, the tree antichain theorem (TCAC) introduced by Conidis, and the statement SHER introduced by Dorais et al. We show that CAC for trees is computationally very weak, in that it admits probabilistic solutions., Comment: 28 pages

Published

2022

10. Partition genericity and pigeonhole basis theorems

Author

Monin, Benoit and Patey, Ludovic

Subjects

Mathematics - Logic

Abstract

There exist two notions of typicality in computability theory, namely, genericity and randomness. In this article, we introduce a new notion of genericity, called partition genericity, which is at the intersection of these two notions of typicality, and show that many basis theorems apply to partition genericity. More precisely, we prove that every co-hyperimmune set and every Kurtz random is partition generic, and that every partition generic set admits weak infinite subsets. In particular, we answer a question of Kjos-Hanssen and Liu by showing that every Kurtz random admits an infinite subset which does not compute any set of positive Hausdorff dimension. Partition genericty is a partition regular notion, so these results imply many existing pigeonhole basis theorems., Comment: 23 pages

Published

2022

11. The reverse mathematics of the Thin set and Erd\H{o}s-Moser theorems

Author

Liu, Lu and Patey, Ludovic

Subjects

Mathematics - Logic, 03B30 03F35

Abstract

The thin set theorem for $n$-tuples and $k$ colors ($\mathsf{TS}^n_k$) states that every $k$-coloring of $[\mathbb{N}]^n$ admits an infinite set of integers $H$ such that $[H]^n$ avoids at least one color. In this paper, we study the combinatorial weakness of the thin set theorem in reverse mathematics by proving neither $\mathsf{TS}^n_k$, nor the free set theorem ($\mathsf{FS}^n$) imply the Erd\H{o}s-Moser theorem ($\mathsf{EM}$) whenever $k$ is sufficiently large (answering a question of Patey and giving a partial result towards a question of Cholak Giusto, Hirst and Jockusch). Given a problem $\mathsf{P}$, a computable instance of $\mathsf{P}$ is universal iff its solution computes a solution of any other computable $\mathsf{P}$-instance. It has been established that most of Ramsey-type problems do not have a universal instance, but the case of Erd\H{o}s-Moser theorem remained open so far. We prove that Erd\H{o}s-Moser theorem does not admit a universal instance (answering a question of Patey)., Comment: 34 pages

Published

2021

12. Computing sets from all infinite subsets

Author

Greenberg, Noam, Harrison-Trainor, Matthew, Patey, Ludovic, and Turetsky, Dan

Subjects

Mathematics - Logic

Abstract

A set is introreducible if it can be computed by every infinite subset of itself. Such a set can be thought of as coding information very robustly. We investigate introreducible sets and related notions. Our two main results are that the collection of introreducible sets is $\Pi^1_1$-complete, so that there is no simple characterization of the introreducible sets; and that every introenumerable set has an introreducible subset., Comment: 30 pages

Published

2020

13. Milliken's tree theorem and its applications: a computability-theoretic perspective

Author

d'Auriac, Paul-Elliot Anglès, Cholak, Peter A., Dzhafarov, Damir D., Monin, Benoît, and Patey, Ludovic

Subjects

Mathematics - Logic, 05D10, 03D80, 03E05

Abstract

Milliken's tree theorem is a deep result in combinatorics that generalizes a vast number of other results in the subject, most notably Ramsey's theorem and its many variants and consequences. Motivated by a question of Dobrinen, we initiate the study of Milliken's tree theorem from the point of view of computability theory. Our advance here stems from a careful analysis of the Halpern-La\"{u}chli theorem which shows that it can be carried out effectively (i.e., that it is computably true). We use this as the basis of a new inductive proof of Milliken's tree theorem that permits us to gauge its effectivity in turn. The principal outcome of this is a comprehensive classification of the computable content of Milliken's tree theorem. We apply our analysis also to several well-known applications of Milliken's tree theorem, namely Devlin's theorem, a partition theorem for Rado graphs, and a generalized version of the so-called tree theorem of Chubb, Hirst, and McNicholl. These are all certain kinds of extensions of Ramsey's theorem for different structures, namely the rational numbers, the Rado graph, and perfect binary trees, respectively. We obtain a number of new results about how these principles relate to Milliken's tree theorem and to each other, in terms of both their computability-theoretic and combinatorial aspects. We identify again the familiar dichotomy between coding the halting problem or not based on the size of instance, but this is more subtle here owing to the more complicated underlying structures, particularly in the case of Devlin's theorem. We also establish new structural Ramsey-theoretic properties of the Rado graph theorem and the generalized Chubb-Hirst-McNicholl tree theorem using Zucker's notion of big Ramsey structure., Comment: 136 pages

Published

2020

14. Carlson-Simpson's lemma and applications in reverse mathematics

Author

Angles d'Auriac, Paul-Elliot, Liu, Lu, Mignoty, Bastien, and Patey, Ludovic

Published

2023

15. The weakness of the pigeonhole principle under hyperarithmetical reductions

Author

Monin, Benoit and Patey, Ludovic

Subjects

Mathematics - Logic

Abstract

The infinite pigeonhole principle for 2-partitions ($\mathsf{RT}^1_2$) asserts the existence, for every set $A$, of an infinite subset of $A$ or of its complement. In this paper, we study the infinite pigeonhole principle from a computability-theoretic viewpoint. We prove in particular that $\mathsf{RT}^1_2$ admits strong cone avoidance for arithmetical and hyperarithmetical reductions. We also prove the existence, for every $\Delta^0_n$ set, of an infinite low${}_n$ subset of it or its complement. This answers a question of Wang. For this, we design a new notion of forcing which generalizes the first and second-jump control of Cholak, Jockusch and Slaman., Comment: 29 pages

Published

2019

16. SRT22 does not imply RT22 in omega-models

Author

Monin, Benoit and Patey, Ludovic

Subjects

Mathematics - Logic

Abstract

We complete a 40-year old program on the computability-theoretic analysis of Ramsey's theorem, starting with Jockusch in 1972, and improving a result of Chong, Slaman and Yang in 2014. Given a set $X$, let $[X]^n$ be the collection of all $n$-element subsets of $X$. Ramsey's theorem for $n$-tuples asserts the existence, for every finite coloring of $[\omega]^n$, of an infinite set $X \subseteq \omega$ such that $[X]^n$ is monochromatic. The meta-mathematical study of Ramsey has a rich history, with several long-standing open problems and seminal theorems, including Seetapun's theorem in 1995 and Liu's theorem in 2012 about Ramsey's theorem for pairs. The remaining question about the study of Ramsey's theorem from a computational viewpoint was the relation between Ramsey's theorem for pairs ($\mathsf{RT}^2_2$) and its restriction to stable colorings ($\mathsf{SRT}^2_2$), that is, colorings admitting a limit behavior. Chong, Slaman and Yang first proved that $\mathsf{SRT}^2_2$ does not formally imply $\mathsf{RT}^2_2$ in a proof-theoretic sense, using non-standard models of reverse mathematics. In this article, we answer the open question whether this non-implication also holds within the framework of computability theory. More precisely, we construct a $\omega$-model of $\mathsf{SRT}^2_2$ which is not a model of $\mathsf{RT}^2_2$. For this, we design a new notion of effective forcing refining Mathias forcing using the notion of largeness classes., Comment: 21 pages

Published

2019

17. COH, SRT22, and multiple functionals

Author

Dzhafarov, Damir and Patey, Ludovic

Subjects

Mathematics - Logic

Abstract

We prove the following result: there is a family $R = \langle R_0,R_1,\ldots \rangle$ of subsets of $\omega$ such that for every stable coloring $c : [\omega]^2 \to k$ hyperarithmetical in $R$ and every finite collection of Turing functionals, there is an infinite homogeneous set $H$ for $c$ such that none of the finitely many functionals map $R \oplus H$ to an infinite cohesive set for $R$. This extends the current best partial results towards the $\mathsf{SRT}^2_2$ vs. $\mathsf{COH}$ problem in reverse mathematics, and is also a partial result towards the resolution of several related problems, such as whether $\mathsf{COH}$ is omnisciently computably reducible to $\mathsf{SRT}^2_2$., Comment: 13 pages

Published

2019

18. Relationships between computability-theoretic properties of problems

Author

Downey, Rod, Greenberg, Noam, Harrison-Trainor, Matthew, Patey, Ludovic, and Turetsky, Dan

Subjects

Mathematics - Logic

Abstract

A problem is a multivalued function from a set of \emph{instances} to a set of \emph{solutions}. We consider only instances and solutions coded by sets of integers. A problem admits preservation of some computability-theoretic weakness property if every computable instance of the problem admits a solution relative to which the property holds. For example, cone avoidance is the ability, given a non-computable set $A$ and a computable instance of a problem $\mathsf{P}$, to find a solution relative to which $A$ is still non-computable. In this article, we compare relativized versions of computability-theoretic notions of preservation which have been studied in reverse mathematics, and prove that the ones which were not already separated by natural statements in the literature actually coincide. In particular, we prove that it is equivalent to admit avoidance of 1 cone, of $\omega$ cones, of 1 hyperimmunity or of 1 non-$\Sigma^0_1$ definition. We also prove that the hierarchies of preservation of hyperimmunity and non-$\Sigma^0_1$ definitions coincide. On the other hand, none of these notions coincide in a non-relativized setting., Comment: 19 pages

Published

2019

19. Some results concerning the $\mathsf{SRT}^2_2$ vs. $\mathsf{COH}$ problem

Author

Cholak, Peter A., Dzhafarov, Damir D., Hirschfeldt, Denis R., and Patey, Ludovic

Subjects

Mathematics - Logic

Abstract

The $\mathsf{SRT}^2_2$ vs.\ $\mathsf{COH}$ problem is a central problem in computable combinatorics and reverse mathematics, asking whether every Turing ideal that satisfies the principle $\mathsf{SRT}^2_2$ also satisfies the principle $\mathsf{COH}$. This paper is a contribution towards further developing some of the main techniques involved in attacking this problem. We study several principles related to each of $\mathsf{SRT}^2_2$ and $\mathsf{COH}$, and prove results that highlight the limits of our current understanding, but also point to new directions ripe for further exploration.

Published

2019

20. Ramsey-like theorems and moduli of computation

Author

Patey, Ludovic

Subjects

Mathematics - Logic

Abstract

Ramsey's theorem asserts that every $k$-coloring of $[\omega]^n$ admits an infinite monochromatic set. Whenever $n \geq 3$, there exists a computable $k$-coloring of $[\omega]^n$ whose solutions compute the halting set. On the other hand, for every computable $k$-coloring of $[\omega]^2$ and every non-computable set $C$, there is an infinite monochromatic set $H$ such that $C \not \leq_T H$. The latter property is known as cone avoidance. In this article, we design a natural class of Ramsey-like theorems encompassing many statements studied in reverse mathematics. We prove that this class admits a maximal statement satisfying cone avoidance and use it as a criterion to re-obtain many existing proofs of cone avoidance. This maximal statement asserts the existence, for every $k$-coloring of $[\omega]^n$, of an infinite subdomain $H \subseteq \omega$ over which the coloring depends only on the sparsity of its elements. This confirms the intuition that Ramsey-like theorems compute Turing degrees only through the sparsity of its solutions., Comment: 26 pages

Published

2019

21. Thin set theorems and cone avoidance

Author

Cholak, Peter and Patey, Ludovic

Subjects

Mathematics - Logic

Abstract

The thin set theorem $\mathsf{RT}^n_{<\infty,\ell}$ asserts the existence, for every $k$-coloring of the subsets of natural numbers of size $n$, of an infinite set of natural numbers, all of whose subsets of size $n$ use at most $\ell$ colors. Whenever $\ell = 1$, the statement corresponds to Ramsey's theorem. From a computational viewpoint, the thin set theorem admits a threshold phenomenon, in that whenever the number of colors $\ell$ is sufficiently large with respect to the size $n$ of the tuples, then the thin set theorem admits strong cone avoidance. Let $d_0, d_1, \dots$ be the sequence of Catalan numbers. For $n \geq 1$, $\mathsf{RT}^n_{<\infty, \ell}$ admits strong cone avoidance if and only if $\ell \geq d_n$ and cone avoidance if and only if $\ell \geq d_{n-1}$. We say that a set $A$ is $\mathsf{RT}^n_{<\infty, \ell}$-encodable if there is an instance of $\mathsf{RT}^n_{<\infty, \ell}$ such that every solution computes $A$. The $\mathsf{RT}^n_{<\infty, \ell}$-encodable sets are precisely the hyperarithmetic sets if and only if $\ell < 2^{n-1}$, the arithmetic sets if and only if $2^{n-1} \leq \ell < d_n$, and the computable sets if and only if $d_n \leq \ell$., Comment: 30 pages

Published

2018

22. Ramsey's theorem and products in the Weihrauch degrees

Author

Dzhafarov, Damir D., Goh, Jun Le, Hirschfeldt, Denis R., Patey, Ludovic, and Pauly, Arno

Subjects

Mathematics - Logic

Abstract

We study the positions in the Weihrauch lattice of parallel products of various combinatorial principles related to Ramsey's theorem. Among other results, we obtain an answer to a question of Brattka, by showing that Ramsey's theorem for pairs ($\mathsf{RT}^2_2$) is strictly Weihrauch below the parallel product of the stable Ramsey's theorem for pairs and the cohesive principle ($\mathsf{SRT}^2_2 \times \mathsf{COH}$)., Comment: 30 pages

Published

2018

23. Pigeons do not jump high

Author

Monin, Benoit and Patey, Ludovic

Subjects

Mathematics - Logic

Abstract

The infinite pigeonhole principle for 2-partitions asserts the existence, for every set $A$, of an infinite subset of $A$ or of its complement. In this paper, we develop a new notion of forcing enabling a fine analysis of the computability-theoretic features of the pigeonhole principle. We deduce various consequences, such as the existence, for every set $A$, of an infinite subset of it or its complement of non-high degree. We also prove that every $\Delta^0_3$ set has an infinite low${}_3$ solution and give a simpler proof of Liu's theorem that every set has an infinite subset in it or its complement of non-PA degree., Comment: 20 pages

Published

2018

24. A computable analysis of variable words theorems

Author

Liu, Lu, Monin, Benoit, and Patey, Ludovic

Subjects

Mathematics - Logic

Abstract

The Carlson-Simpson lemma is a combinatorial statement occurring in the proof of the Dual Ramsey theorem. Formulated in terms of variable words, it informally asserts that given any finite coloring of the strings, there is an infinite sequence with infinitely many variables such that for every valuation, some specific set of initial segments is homogeneous. Friedman, Simpson, and Montalban asked about its reverse mathematical strength. We study the computability-theoretic properties and the reverse mathematics of this statement, and relate it to the finite union theorem. In particular, we prove the Ordered Variable word for binary strings in ACA0., Comment: 9 pages

Published

2017

25. THE REVERSE MATHEMATICS OF ${\mathsf {CAC\ FOR\ TREES}}$.

Author

CERVELLE, JULIEN, GAUDELIER, WILLIAM, and PATEY, LUDOVIC

Abstract

${\mathsf {CAC\ for\ trees}}$ is the statement asserting that any infinite subtree of $\mathbb {N}^{ has an infinite path or an infinite antichain. In this paper, we study the computational strength of this theorem from a reverse mathematical viewpoint. We prove that ${\mathsf {CAC\ for\ trees}}$ is robust, that is, there exist several characterizations, some of which already appear in the literature, namely, the statement $\mathsf {SHER}$ introduced by Dorais et al. [8], and the statement $\mathsf {TAC}+\mathsf {B}\Sigma ^0_2$ where $\mathsf {TAC}$ is the tree antichain theorem introduced by Conidis [6]. We show that ${\mathsf {CAC\ for\ trees}}$ is computationally very weak, in that it admits probabilistic solutions. [ABSTRACT FROM AUTHOR]

Published

2024

26. [formula omitted] does not imply [formula omitted] in ω-models

Author

Monin, Benoit and Patey, Ludovic

Published

2021

27. The Rado Path Decomposition Theorem

Author

Cholak, Peter, Igusa, Gregory, Patey, Ludovic, Soskova, Mariya, and Turetsky, Dan

Subjects

Mathematics - Logic, Mathematics - Combinatorics, 05C55 05C70 03D80 03B30 03F35

Abstract

We discuss a theorem of Rado: Every r-coloring of the pairs of natural numbers has a path decomposition., Comment: Updated Oct 4 2017. Our thanks to the readers for their comments. Updated in Dec 2018. The major change was the additional of the Section 1.1 which motivating the work within the current framework of computable combinatorics

Published

2016

28. Coloring trees in reverse mathematics

Author

Dzhafarov, Damir and Patey, Ludovic

Subjects

Mathematics - Logic

Abstract

The tree theorem for pairs ($\mathsf{TT}^2_2$), first introduced by Chubb, Hirst, and McNicholl, asserts that given a finite coloring of pairs of comparable nodes in the full binary tree $2^{<\omega}$, there is a set of nodes isomorphic to $2^{<\omega}$ which is homogeneous for the coloring. This is a generalization of the more familiar Ramsey's theorem for pairs ($\mathsf{RT}^2_2$), which has been studied extensively in computability theory and reverse mathematics. We answer a longstanding open question about the strength of $\mathsf{TT}^2_2$, by showing that this principle does not imply the arithmetic comprehension axiom ($\mathsf{ACA}_0$) over the base system, recursive comprehension axiom ($\mathsf{RCA}_0$), of second-order arithmetic. In addition, we give a new and self-contained proof of a recent result of Patey that $\mathsf{TT}^2_2$ is strictly stronger than $\mathsf{RT}^2_2$. Combined, these results establish $\mathsf{TT}^2_2$ as the first known example of a natural combinatorial principle to occupy the interval strictly between $\mathsf{ACA}_0$ and $\mathsf{RT}^2_2$. The proof of this fact uses an extension of the bushy tree forcing method, and develops new techniques for dealing with combinatorial statements formulated on trees, rather than on $\omega$., Comment: 25 pages

Published

2016

29. Partial orders and immunity in reverse mathematics

Author

Patey, Ludovic

Subjects

Mathematics - Logic, 03B30, 03F35

Abstract

We identify computability-theoretic properties enabling us to separate various statements about partial orders in reverse mathematics. We obtain simpler proofs of existing separations, and deduce new compound ones. This work is part of a larger program of unification of the separation proofs of various Ramsey-type theorems in reverse mathematics in order to obtain a better understanding of the combinatorics of Ramsey's theorem and its consequences. We also answer a question of Murakami, Yamazaki and Yokoyama about pseudo Ramsey's theorem for pairs., Comment: 21 pages, extended version

Published

2016

30. The reverse mathematics of non-decreasing subsequences

Author

Patey, Ludovic

Subjects

Mathematics - Logic

Abstract

Every function over the natural numbers has an infinite subdomain on which the function is non-decreasing. Motivated by a question of Dzhafarov and Schweber, we study the reverse mathematics of variants of this statement. It turns out that this statement restricted to computably bounded functions is computationally weak and does not imply the existence of the halting set. On the other hand, we prove that it is not a consequence of Ramsey's theorem for pairs. This statement can therefore be seen as an arguably natural principle between the arithmetic comprehension axiom and stable Ramsey's theorem for pairs., Comment: 16 pages

Published

2016

31. Pi01 encodability and omniscient reductions

Author

Monin, Benoit and Patey, Ludovic

Subjects

Mathematics - Logic

Abstract

A set of integers $A$ is computably encodable if every infinite set of integers has an infinite subset computing $A$. By a result of Solovay, the computably encodable sets are exactly the hyperarithmetic ones. In this paper, we extend this notion of computable encodability to subsets of the Baire space and we characterize the $\Pi^0_1$ encodable compact sets as those who admit a non-empty $\Sigma^1_1$ subset. Thanks to this equivalence, we prove that weak weak K\"onig's lemma is not strongly computably reducible to Ramsey's theorem. This answers a question of Hirschfeldt and Jockusch., Comment: 9 pages

Published

2016

32. Ramsey's theorem for singletons and strong computable reducibility

Author

Dzhafarov, Damir D., Patey, Ludovic, Solomon, Reed, and Westrick, Linda Brown

Subjects

Mathematics - Logic

Abstract

We answer a question posed by Hirschfeldt and Jockusch by showing that whenever $k > \ell$, Ramsey's theorem for singletons and $k$-colorings, $\mathsf{RT}^1_k$, is not strongly computably reducible to the stable Ramsey's theorem for $\ell$-colorings, $\mathsf{SRT}^2_\ell$. Our proof actually establishes the following considerably stronger fact: given $k > \ell$, there is a coloring $c : \omega \to k$ such that for every stable coloring $d : [\omega]^2 \to \ell$ (computable from $c$ or not), there is an infinite homogeneous set $H$ for $d$ that computes no infinite homogeneous set for $c$. This also answers a separate question of Dzhafarov, as it follows that the cohesive principle, $\mathsf{COH}$, is not strongly computably reducible to the stable Ramsey's theorem for all colorings, $\mathsf{SRT}^2_{<\infty}$. The latter is the strongest partial result to date in the direction of giving a negative answer to the longstanding open question of whether $\mathsf{COH}$ is implied by the stable Ramsey's theorem in $\omega$-models of $\mathsf{RCA}_0$., Comment: 13 pages

Published

2016

33. The reverse mathematics of Ramsey-type theorems

Author

Patey, Ludovic

Subjects

Mathematics - Logic

Abstract

In this thesis, we investigate the computational content and the logical strength of Ramsey's theorem and its consequences. For this, we use the frameworks of reverse mathematics and of computable reducibility. We proceed to a systematic study of various Ramsey-type statements under a unified and minimalistic framework and obtain a precise analysis of their interrelations. We clarify the role of the number of colors in Ramsey's theorem. In particular, we show that the hierarchy of Ramsey's theorem induced by the number of colors is strictly increasing over computable reducibility, and exhibit in reverse mathematics an infinite decreasing hiearchy of Ramsey-type theorems by weakening the homogeneity constraints. These results tend to show that the Ramsey-type statements are not robust, that is, slight variations of the statements lead to strictly different subsystems. Finally, we pursuit the analysis of the links between Ramsey's theorems and compacity arguments, by extending Liu's theorem to several Ramsey-type statements and by proving its optimality under various aspects., Comment: PhD thesis, 268 pages

Published

2016

34. The proof-theoretic strength of Ramsey's theorem for pairs and two colors

Author

Patey, Ludovic and Yokoyama, Keita

Subjects

Mathematics - Logic

Abstract

Ramsey's theorem for $n$-tuples and $k$-colors ($\mathsf{RT}^n_k$) asserts that every k-coloring of $[\mathbb{N}]^n$ admits an infinite monochromatic subset. We study the proof-theoretic strength of Ramsey's theorem for pairs and two colors, namely, the set of its $\Pi^0_1$ consequences, and show that $\mathsf{RT}^2_2$ is $\Pi^0_3$ conservative over $\mathsf{I}\Sigma^0_1$. This strengthens the proof of Chong, Slaman and Yang that $\mathsf{RT}^2_2$ does not imply $\mathsf{I}\Sigma^0_2$, and shows that $\mathsf{RT}^2_2$ is finitistically reducible, in the sense of Simpson's partial realization of Hilbert's Program. Moreover, we develop general tools to simplify the proofs of $\Pi^0_3$-conservation theorems., Comment: 32 pages

Published

2015

35. Controlling iterated jumps of solutions to combinatorial problems

Author

Patey, Ludovic

Subjects

Mathematics - Logic, 03B30, 03F35

Abstract

Among the Ramsey-type hierarchies, namely, Ramsey's theorem, the free set, the thin set and the rainbow Ramsey theorem, only Ramsey's theorem is known to collapse in reverse mathematics. A promising approach to show the strictness of the hierarchies would be to prove that every computable instance at level n has a low_n solution. In particular, this requires effective control of iterations of the Turing jump. In this paper, we design some variants of Mathias forcing to construct solutions to cohesiveness, the Erdos-Moser theorem and stable Ramsey's theorem for pairs, while controlling their iterated jumps. For this, we define forcing relations which, unlike Mathias forcing, have the same definitional complexity as the formulas they force. This analysis enables us to answer two questions of Wei Wang, namely, whether cohesiveness and the Erdos-Moser theorem admit preservation of the arithmetic hierarchy, and can be seen as a step towards the resolution of the strictness of the Ramsey-type hierarchies., Comment: 32 pages

Published

2015

36. Coloring the rationals in reverse mathematics

Author

Frittaion, Emanuele and Patey, Ludovic

Subjects

Mathematics - Logic, 03B30, 03F35

Abstract

Ramsey's theorem for pairs asserts that every 2-coloring of the pairs of integers has an infinite monochromatic subset. In this paper, we study a strengthening of Ramsey's theorem for pairs due to Erdos and Rado, which states that every 2-coloring of the pairs of rationals has either an infinite 0-homogeneous set or a 1-homogeneous set of order type eta, where eta is the order type of the rationals. This theorem is a natural candidate to lie strictly between the arithmetic comprehension axiom and Ramsey's theorem for pairs. This Erdos-Rado theorem, like the tree theorem for pairs, belongs to a family of Ramsey-type statements whose logical strength remains a challenge., Comment: 13 pages

Published

2015

37. Open questions about Ramsey-type statements in reverse mathematics

Author

Patey, Ludovic

Subjects

Mathematics - Logic, 03B30, 03F35

Abstract

Ramsey's theorem states that for any coloring of the n-element subsets of N with finitely many colors, there is an infinite set H such that all n-element subsets of H have the same color. The strength of consequences of Ramsey's theorem has been extensively studied in reverse mathematics and under various reducibilities, namely, computable reducibility and uniform reducibility. Our understanding of the combinatorics of Ramsey's theorem and its consequences has been greatly improved over the past decades. In this paper, we state some questions which naturally arose during this study. The inability to answer those questions reveals some gaps in our understanding of the combinatorics of Ramsey's theorem., Comment: 15 pages

Published

2015

38. Dominating the Erdos-Moser theorem in reverse mathematics

Author

Patey, Ludovic

Subjects

Mathematics - Logic, 03B30, 03F35

Abstract

The Erdos-Moser theorem (EM) states that every infinite tournament has an infinite transitive subtournament. This principle plays an important role in the understanding of the computational strength of Ramsey's theorem for pairs (RT^2_2) by providing an alternate proof of RT^2_2 in terms of EM and the ascending descending sequence principle (ADS). In this paper, we study the computational weakness of EM and construct a standard model (omega-model) of simultaneously EM, weak K\"onig's lemma and the cohesiveness principle, which is not a model of the atomic model theorem. This separation answers a question of Hirschfeldt, Shore and Slaman, and shows that the weakness of the Erdos-Moser theorem goes beyond the separation of EM from ADS proven by Lerman, Solomon and Towsner., Comment: 36 pages

Published

2015

39. The strength of the tree theorem for pairs in reverse mathematics

Author

Patey, Ludovic

Subjects

Mathematics - Logic, 03B30, 03F35

Abstract

No natural principle is currently known to be strictly between the arithmetic comprehension axiom (ACA) and Ramsey's theorem for pairs (RT^2_2) in reverse mathematics. The tree theorem for pairs (TT^2_2) is however a good candidate. The tree theorem states that for every finite coloring over tuples of comparable nodes in the full binary tree, there is a monochromatic subtree isomorphic to the full tree. The principle TT^2_2 is known to lie between ACA and RT^2_2 over RCA, but its exact strength remains open. In this paper, we prove that RT^2_2 together with weak K\"onig's lemma (WKL) does not imply TT^2_2, thereby answering a question of Montalban. This separation is a case in point of the method of Lerman, Solomon and Towsner for designing a computability-theoretic property which discriminates between two statements in reverse mathematics. We therefore put the emphasis on the different steps leading to this separation in order to serve as a tutorial for separating principles in reverse mathematics., Comment: 16 pages

Published

2015

40. The weakness of being cohesive, thin or free in reverse mathematics

Author

Patey, Ludovic

Subjects

Mathematics - Logic, 03B30, 03F35

Abstract

Informally, a mathematical statement is robust if its strength is left unchanged under variations of the statement. In this paper, we investigate the lack of robustness of Ramsey's theorem and its consequence under the frameworks of reverse mathematics and computable reducibility. To this end, we study the degrees of unsolvability of cohesive sets for different uniformly computable sequence of sets and identify different layers of unsolvability. This analysis enables us to answer some questions of Wang about how typical sets help computing cohesive sets. We also study the impact of the number of colors in the computable reducibility between coloring statements. In particular, we strengthen the proof by Dzhafarov that cohesiveness does not strongly reduce to stable Ramsey's theorem for pairs, revealing the combinatorial nature of this non-reducibility and prove that whenever $k$ is greater than $\ell$, stable Ramsey's theorem for $n$-tuples and $k$ colors is not computably reducible to Ramsey's theorem for $n$-tuples and $\ell$ colors. In this sense, Ramsey's theorem is not robust with respect to his number of colors over computable reducibility. Finally, we separate the thin set and free set theorem from Ramsey's theorem for pairs and identify an infinite decreasing hierarchy of thin set theorems in reverse mathematics. This shows that in reverse mathematics, the strength of Ramsey's theorem is very sensitive to the number of colors in the output set. In particular, it enables us to answer several related questions asked by Cholak, Giusto, Hirst and Jockusch., Comment: 31 pages

Published

2015

41. Iterative forcing and hyperimmunity in reverse mathematics

Author

Patey, Ludovic

Subjects

Mathematics - Logic, 03B30, 03F35

Abstract

The separation between two theorems in reverse mathematics is usually done by constructing a Turing ideal satisfying a theorem P and avoiding the solutions to a fixed instance of a theorem Q. Lerman, Solomon and Towsner introduced a forcing technique for iterating a computable non-reducibility in order to separate theorems over omega-models. In this paper, we present a modularized version of their framework in terms of preservation of hyperimmunity and show that it is powerful enough to obtain the same separations results as Wang did with his notion of preservation of definitions., Comment: 15 pages

Published

2015

42. Somewhere over the rainbow Ramsey theorem for pairs

Author

Patey, Ludovic

Subjects

Mathematics - Logic, 03B30, 03F35

Abstract

The rainbow Ramsey theorem states that every coloring of tuples where each color is used a bounded number of times has an infinite subdomain on which no color appears twice. The restriction of the statement to colorings over pairs (RRT22) admits several characterizations: it is equivalent to finding an infinite subset of a 2-random, to diagonalizing against Turing machines with the halting set as oracle... In this paper we study principles that are closely related to the rainbow Ramsey theorem, the Erd\H{o}s Moser theorem and the thin set theorem within the framework of reverse mathematics. We prove that the thin set theorem for pairs implies RRT22, and that the stable thin set theorem for pairs implies the atomic model theorem over RCA. We define different notions of stability for the rainbow Ramsey theorem and establish characterizations in terms of Ramsey-type K\"onig's lemma, relativized Schnorr randomness or diagonalization of Delta2 functions., Comment: 31 pages

Published

2015

43. Ramsey-type graph coloring and diagonal non-computability

Author

Patey, Ludovic

Subjects

Mathematics - Logic, 03B30 03F35

Abstract

A function is diagonally non-computable (d.n.c.) if it diagonalizes against the universal partial computable function. D.n.c. functions play a central role in algorithmic randomness and reverse mathematics. Flood and Towsner asked for which functions h, the principle stating the existence of an h-bounded d.n.c. function (DNR_h) implies the Ramsey-type K\"onig's lemma (RWKL). In this paper, we prove that for every computable order h, there exists an~$\omega$-model of DNR_h which is not a not model of the Ramsey-type graph coloring principle for two colors (RCOLOR2) and therefore not a model of RWKL. The proof combines bushy tree forcing and a technique introduced by Lerman, Solomon and Towsner to transform a computable non-reducibility into a separation over omega-models., Comment: 18 pages

Published

2014

44. PARTITION GENERICITY AND PIGEONHOLE BASIS THEOREMS.

Author

MONIN, BENOIT and PATEY, LUDOVIC

Subjects

COMPUTABLE functions, FRACTAL dimensions

Abstract

There exist two main notions of typicality in computability theory, namely, Cohen genericity and randomness. In this article, we introduce a new notion of genericity, called partition genericity , which is at the intersection of these two notions of typicality, and show that many basis theorems apply to partition genericity. More precisely, we prove that every co-hyperimmune set and every Kurtz random is partition generic, and that every partition generic set admits weak infinite subsets, for various notions of weakness. In particular, we answer a question of Kjos-Hanssen and Liu by showing that every Kurtz random admits an infinite subset which does not compute any set of positive effective Hausdorff dimension. Partition genericity is a partition regular notion, so these results imply many existing pigeonhole basis theorems. [ABSTRACT FROM AUTHOR]

Published

2024

45. Milliken’s Tree Theorem and Its Applications: A Computability-Theoretic Perspective

Author

Anglès d’Auriac, Paul-Elliot, primary, Cholak, Peter, additional, Dzhafarov, Damir, additional, Monin, Benoît, additional, and Patey, Ludovic, additional

Published

2024

46. Diagonally non-computable functions and fireworks

Author

Bienvenu, Laurent and Patey, Ludovic

Subjects

Mathematics - Logic, 03B30 03F35

Abstract

A set C of reals is said to be negligible if there is no probabilistic algorithm which generates a member of C with positive probability. Various classes have been proven to be negligible, for example the Turing upper-cone of a non-computable real, the class of coherent completions of Peano Arithmetic or the class of reals of minimal degrees. One class of particular interest in the study of negligibility is the class of diagonally non-computable (DNC) functions, proven by Kucera to be non-negligible in a strong sense: every Martin-L\"of random real computes a DNC function. Ambos-Spies et al. showed that the converse does not hold: there are DNC functions which compute no Martin-L\"of random real. In this paper, we show that such the set of such DNC functions is in fact non-negligible. More precisely, we prove that for every sufficiently fast-growing computable~$h$, every 2-random real computes an $h$-bounded DNC function which computes no Martin-L\"of random real. Further, we show that the same holds for the set of reals which compute a DNC function but no bounded DNC function. The proofs of these results use a combination of a technique due to Kautz (which, following a metaphor of Shen, we like to call a `fireworks argument') and bushy tree forcing, which is the canonical forcing notion used in the study of DNC functions., Comment: 22 pages

Published

2014

47. On the logical strengths of partial solutions to mathematical problems

Author

Bienvenu, Laurent, Patey, Ludovic, and Shafer, Paul

Subjects

Mathematics - Logic, 03B30, 03F35

Abstract

We use the framework of reverse mathematics to address the question of, given a mathematical problem, whether or not it is easier to find an infinite partial solution than it is to find a complete solution. Following Flood, we say that a Ramsey-type variant of a problem is the problem with the same instances but whose solutions are the infinite partial solutions to the original problem. We study Ramsey-type variants of problems related to K\"onig's lemma, such as restrictions of K\"onig's lemma, Boolean satisfiability problems, and graph coloring problems. We find that sometimes the Ramsey-type variant of a problem is strictly easier than the original problem (as Flood showed with weak K\"onig's lemma) and that sometimes the Ramsey-type variant of a problem is equivalent to the original problem. We show that the Ramsey-type variant of weak K\"onig's lemma is robust in the sense of Montalban: it is equivalent to several perturbations of itself. We also clarify the relationship between Ramsey-type weak K\"onig's lemma and algorithmic randomness by showing that Ramsey-type weak weak K\"onig's lemma is equivalent to the problem of finding diagonally non-recursive functions and that these problems are strictly easier than Ramsey-type weak K\"onig's lemma. This answers a question of Flood., Comment: 43 pages

Published

2014

48. Degrees bounding principles and universal instances in reverse mathematics

Author

Patey, Ludovic

Subjects

Mathematics - Logic, 03B30, 03F35

Abstract

A Turing degree d bounds a principle P of reverse mathematics if every computable instance of P has a d-computable solution. P admits a universal instance if there exists a computable instance such that every solution bounds P. We prove that the stable version of the ascending descending sequence principle (SADS) as well as the stable version of the thin set theorem for pairs (STS(2)) do not admit a bound of low_2 degree. Therefore no principle between Ramsey's theorem for pairs RT22 and SADS or STS(2) admit a universal instance. We construct a low_2 degree bounding the Erd\H{o}s-Moser theorem (EM), thereby showing that previous argument does not hold for EM. Finally, we prove that the only Delta^0_2 degree bounding a stable version of the rainbow Ramsey theorem for pairs (SRRT22) is 0'. Hence no principle between the stable Ramsey theorem for pairs SRT22 and SRRT22 admit a universal instance. In particular the stable version of the Erd\H{o}s-Moser theorem does not admit one. It remains unknown whether EM admits a universal instance., Comment: 23 pages

Published

2014

49. The complexity of satisfaction problems in reverse mathematics

Author

Patey, Ludovic

Subjects

Mathematics - Logic, 03B30, 03F35

Abstract

Satisfiability problems play a central role in computer science and engineering as a general framework for studying the complexity of various problems. Schaefer proved in 1978 that truth satisfaction of propositional formulas given a language of relations is either NP-complete or tractable. We classify the corresponding satisfying assignment construction problems in the framework of reverse mathematics and show that the principles are either provable over RCA or equivalent to WKL. We formulate also a Ramseyan version of the problems and state a different dichotomy theorem. However, the different classes arising from this classification are not known to be distinct., Comment: 19 pages

Published

2014

50. Pigeons do not jump high

Author

Monin, Benoit and Patey, Ludovic

Published

2019