Add to ORKGWhen attempting to generalize recursion theory to admissible ordinals, it may seem as if all classical priority constructions can be lifted to any admissible ordinal satisfying a sufficiently strong fragment of the replacement scheme. We show, however, that this is not always the case. In fact, there are some constructions which make an essential use of the notion of finiteness which cannot be replaced by the generalized notion of alpha-finiteness. As examples we discuss both codings of models of arithmetic into the recursively enumerable degrees, and non-distributive lattice embeddings into these degrees. We show that if an admissible ordinal alpha is effectively close to omega (where this closeness can be measured by size or by cofinali...
AbstractLet Es denote the lattice of Medvedev degrees of non-empty Π10 subsets of 2ω, and let Ew den...
Abstract. We give an algorithm for deciding whether an embedding of a finite partial order P into th...
A basic resul t of intui t ive recursion theory is that a set (of natural numbers) is decidable (rec...
AbstractSeveral problems in recursion theory on admissible ordinals (α-recursion theory) and recursi...
Several problems in recursion theory on admissible o¡dinals (a-recursion theory) and recursion theor...
'We int¡oduce recursively invariant p-recursion theory as a new approach towards recursion theo...
AbstractWe introduce recursively invariant β-recursion theory as a new approach towards recursion th...
AbstractA certain lattice with eight elements is shown to be not embeddable as a lattice in the recu...
In Recursion Theory (Computability Theory), we study Turing degrees in terms of their degree-theoret...
Several new features arise in the generalization of recursion theory on crl to recursion theory on a...
AbstractThe consistency strength of the ∑2 (Sacks finite injury) priority method is I∑2, yet classic...
AbstractWe show that the elementary theory of the recursively enumerable tt-degrees has the same com...
This monograph presents recursion theory from a generalized and largely global point of view. A majo...
SETS, MODELS, AND PROOFS: TOPICS IN THE THEORY OF RECURSIVE FUNCTIONS David Roger Belanger, Ph.D. Co...
Priority arguments are applied to three problems in the theory of rce. classes. Chapter I: A conject...
AbstractLet Es denote the lattice of Medvedev degrees of non-empty Π10 subsets of 2ω, and let Ew den...
Abstract. We give an algorithm for deciding whether an embedding of a finite partial order P into th...
A basic resul t of intui t ive recursion theory is that a set (of natural numbers) is decidable (rec...
AbstractSeveral problems in recursion theory on admissible ordinals (α-recursion theory) and recursi...
Several problems in recursion theory on admissible o¡dinals (a-recursion theory) and recursion theor...
'We int¡oduce recursively invariant p-recursion theory as a new approach towards recursion theo...
AbstractWe introduce recursively invariant β-recursion theory as a new approach towards recursion th...
AbstractA certain lattice with eight elements is shown to be not embeddable as a lattice in the recu...
In Recursion Theory (Computability Theory), we study Turing degrees in terms of their degree-theoret...
Several new features arise in the generalization of recursion theory on crl to recursion theory on a...
AbstractThe consistency strength of the ∑2 (Sacks finite injury) priority method is I∑2, yet classic...
AbstractWe show that the elementary theory of the recursively enumerable tt-degrees has the same com...
This monograph presents recursion theory from a generalized and largely global point of view. A majo...
SETS, MODELS, AND PROOFS: TOPICS IN THE THEORY OF RECURSIVE FUNCTIONS David Roger Belanger, Ph.D. Co...
Priority arguments are applied to three problems in the theory of rce. classes. Chapter I: A conject...
AbstractLet Es denote the lattice of Medvedev degrees of non-empty Π10 subsets of 2ω, and let Ew den...
Abstract. We give an algorithm for deciding whether an embedding of a finite partial order P into th...
A basic resul t of intui t ive recursion theory is that a set (of natural numbers) is decidable (rec...