International audienceAmong 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 lown solution. In particular, this requires to control effectively iterations of the Turing jump. In this paper, we design some variants of Mathias forcing to construct solutions to cohesive-ness, the Erd˝ os-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 ...
This thesis is divided into two main parts. In the first part, we focus on analyzing the properties ...
Abstract. We discuss the use of nonstandard methods in the study of Ramsey type problems, and illust...
Ramsey theory is the study of the structure of mathematical objects that is preserved under partitio...
International audienceAmong the Ramsey-type hierarchies, namely, Ramsey's theorem, the free set, the...
International audienceA Turing degree d bounds a principle P of reverse mathematics if every computa...
he main objective of this research is to study the relative strength of combinatorial principles, in...
We give a new treatment of the relations between Ramsey's Theorem, ACA 0 and ACA′ 0. First we combin...
PhD thesis, 268 pagesIn this thesis, we investigate the computational content and the logical streng...
International audienceThe Erdos-Moser theorem (EM) states that every infinite tournament has an infi...
The computability-theoretic and reverse mathematical aspects of various combinatorial principles, su...
31 pagesThe rainbow Ramsey theorem states that every coloring of tuples where each color is used a b...
International audienceWe use the framework of reverse mathematics to address the question of, given ...
The enterprise of comparing mathematical theorems according to their logical strength is an active a...
International audienceThe separation between two theorems in reverse mathematics is usually done by ...
International audienceInformally, a mathematical statement is robust if its strength is left unchang...
This thesis is divided into two main parts. In the first part, we focus on analyzing the properties ...
Abstract. We discuss the use of nonstandard methods in the study of Ramsey type problems, and illust...
Ramsey theory is the study of the structure of mathematical objects that is preserved under partitio...
International audienceAmong the Ramsey-type hierarchies, namely, Ramsey's theorem, the free set, the...
International audienceA Turing degree d bounds a principle P of reverse mathematics if every computa...
he main objective of this research is to study the relative strength of combinatorial principles, in...
We give a new treatment of the relations between Ramsey's Theorem, ACA 0 and ACA′ 0. First we combin...
PhD thesis, 268 pagesIn this thesis, we investigate the computational content and the logical streng...
International audienceThe Erdos-Moser theorem (EM) states that every infinite tournament has an infi...
The computability-theoretic and reverse mathematical aspects of various combinatorial principles, su...
31 pagesThe rainbow Ramsey theorem states that every coloring of tuples where each color is used a b...
International audienceWe use the framework of reverse mathematics to address the question of, given ...
The enterprise of comparing mathematical theorems according to their logical strength is an active a...
International audienceThe separation between two theorems in reverse mathematics is usually done by ...
International audienceInformally, a mathematical statement is robust if its strength is left unchang...
This thesis is divided into two main parts. In the first part, we focus on analyzing the properties ...
Abstract. We discuss the use of nonstandard methods in the study of Ramsey type problems, and illust...
Ramsey theory is the study of the structure of mathematical objects that is preserved under partitio...