PhD thesis, 268 pagesIn 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 re...
Reverse mathematics aims to determine which set theoretic axioms are necessary to prove the theorems...
he main objective of this research is to study the relative strength of combinatorial principles, in...
Ramsey theory is the study of the structure of mathematical objects that is preserved under partitio...
PhD thesis, 268 pagesIn this thesis, we investigate the computational content and the logical streng...
International audienceInformally, a mathematical statement is robust if its strength is left unchang...
International audienceRamsey's theorem states that for any coloring of the n-element subsets of N wi...
The enterprise of comparing mathematical theorems according to their logical strength is an active a...
International audienceWe use the framework of reverse mathematics to address the question of, given ...
Several notions of computability theoretic reducibility between Π12 principles have been studied. Th...
Abstract. Ramsey’s theorem states that each coloring has an infinite homo-geneous set, but these set...
International audienceRamsey's theorem for n-tuples and k-colors (RT n k) asserts that every k-color...
In this thesis, we study the proof-theoretical and computational strength of some combinatorial prin...
International audienceWe answer a question posed by Hirschfeldt and Jockusch by showing that wheneve...
This BCs thesis deals with topics from graph theory. Ramsey theory in its most basic form deals with...
The computability-theoretic and reverse mathematical aspects of various combinatorial principles, su...
Reverse mathematics aims to determine which set theoretic axioms are necessary to prove the theorems...
he main objective of this research is to study the relative strength of combinatorial principles, in...
Ramsey theory is the study of the structure of mathematical objects that is preserved under partitio...
PhD thesis, 268 pagesIn this thesis, we investigate the computational content and the logical streng...
International audienceInformally, a mathematical statement is robust if its strength is left unchang...
International audienceRamsey's theorem states that for any coloring of the n-element subsets of N wi...
The enterprise of comparing mathematical theorems according to their logical strength is an active a...
International audienceWe use the framework of reverse mathematics to address the question of, given ...
Several notions of computability theoretic reducibility between Π12 principles have been studied. Th...
Abstract. Ramsey’s theorem states that each coloring has an infinite homo-geneous set, but these set...
International audienceRamsey's theorem for n-tuples and k-colors (RT n k) asserts that every k-color...
In this thesis, we study the proof-theoretical and computational strength of some combinatorial prin...
International audienceWe answer a question posed by Hirschfeldt and Jockusch by showing that wheneve...
This BCs thesis deals with topics from graph theory. Ramsey theory in its most basic form deals with...
The computability-theoretic and reverse mathematical aspects of various combinatorial principles, su...
Reverse mathematics aims to determine which set theoretic axioms are necessary to prove the theorems...
he main objective of this research is to study the relative strength of combinatorial principles, in...
Ramsey theory is the study of the structure of mathematical objects that is preserved under partitio...