International audienceA 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 (RT 2 2) and SADS or STS(2) admit a universal instance. We construct a low 2 degree bounding the Erd˝ os Moser theorem (EM), thereby showing that the previous argument does not hold for EM. Finally, we prove that the only ∆ 0 2 degree bounding ...
A (Turing) ideal I is a downward closed set of Turing degrees which is also closed under the supremu...
PhD thesis, 268 pagesIn this thesis, we investigate the computational content and the logical streng...
Recall that RT is the upper semilattice of recursively enumerable Turing degrees. We consider two fu...
International audienceA Turing degree d bounds a principle P of reverse mathematics if every computa...
International audienceAmong the Ramsey-type hierarchies, namely, Ramsey's theorem, the free set, the...
International audienceThe Erdos-Moser theorem (EM) states that every infinite tournament has an infi...
76 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2004.We also study Ramsey degrees, ...
Several notions of computability theoretic reducibility between Π12 principles have been studied. Th...
The enterprise of comparing mathematical theorems according to their logical strength is an active a...
In this thesis, we study the proof-theoretical and computational strength of some combinatorial prin...
We study the reverse mathematics and computability-theoretic strength of (stable) Ramsey’s Theorem f...
Abstract. We study the reverse mathematics and computability-the-oretic strength of (stable) Ramsey’...
31 pagesThe rainbow Ramsey theorem states that every coloring of tuples where each color is used a b...
Reverse Mathematics seeks to find the minimal set existence or comprehension axioms needed to prove ...
Abstract. We show that the principle PART from Hirschfeldt and Shore [7] is equivalent to the Σ02-Bo...
A (Turing) ideal I is a downward closed set of Turing degrees which is also closed under the supremu...
PhD thesis, 268 pagesIn this thesis, we investigate the computational content and the logical streng...
Recall that RT is the upper semilattice of recursively enumerable Turing degrees. We consider two fu...
International audienceA Turing degree d bounds a principle P of reverse mathematics if every computa...
International audienceAmong the Ramsey-type hierarchies, namely, Ramsey's theorem, the free set, the...
International audienceThe Erdos-Moser theorem (EM) states that every infinite tournament has an infi...
76 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2004.We also study Ramsey degrees, ...
Several notions of computability theoretic reducibility between Π12 principles have been studied. Th...
The enterprise of comparing mathematical theorems according to their logical strength is an active a...
In this thesis, we study the proof-theoretical and computational strength of some combinatorial prin...
We study the reverse mathematics and computability-theoretic strength of (stable) Ramsey’s Theorem f...
Abstract. We study the reverse mathematics and computability-the-oretic strength of (stable) Ramsey’...
31 pagesThe rainbow Ramsey theorem states that every coloring of tuples where each color is used a b...
Reverse Mathematics seeks to find the minimal set existence or comprehension axioms needed to prove ...
Abstract. We show that the principle PART from Hirschfeldt and Shore [7] is equivalent to the Σ02-Bo...
A (Turing) ideal I is a downward closed set of Turing degrees which is also closed under the supremu...
PhD thesis, 268 pagesIn this thesis, we investigate the computational content and the logical streng...
Recall that RT is the upper semilattice of recursively enumerable Turing degrees. We consider two fu...