AbstractFor a class K of structures, closed under isomorphism, the index set is the set I(K) of all indices for computable members of K in a universal computable numbering of all computable structures for a fixed computable language. We study the complexity of the index set of class of structures with decidable theories. We first prove the result for the class of all structures in an arbitrary finite nontrivial language. After the complexity is found, we prove similar results for some well-known classes of structures, such as directed graphs, undirected graphs, partial orders and lattices
AbstractA Π01 class is an effectively closed set of reals. We study properties of these classes dete...
We show that the index set complexity of the computably categorical structures is Π11-complete, demo...
Fried and Kollár constructed a fully faithful functor from the category of graphs to the category of...
Let K be a family of structures, closed under isomorphism, in a fixed computable language. We consid...
Ph.D. University of Hawaii at Manoa 2014.Includes bibliographical references.We analyze computable a...
Abstract. We classify the computability-theoretic complexity of two index sets of classes of first-o...
We show that the index set complexity of the computably categorical structures is View the MathML so...
Classification is an important goal in many branches of mathematics. The idea is to describe the mem...
AbstractWhenever a structure with a particularly interesting computability-theoretic property is fou...
AbstractWe exploit properties of certain directed graphs, obtained from the families of sets with sp...
AbstractThe spectrum of a relation R on a computable structure is the set of Turing degrees of the i...
We prove various results about the complexity of countable structures, both computable and arbitrary...
Let $\le_{c}$ be computable reducibility on computably enumerable equivalence relations (or ceers). ...
AbstractWe investigate effective categoricity of computable equivalence structures A. We show that A...
AbstractThis paper draws close connections between the ease of presenting a given complexity class b...
AbstractA Π01 class is an effectively closed set of reals. We study properties of these classes dete...
We show that the index set complexity of the computably categorical structures is Π11-complete, demo...
Fried and Kollár constructed a fully faithful functor from the category of graphs to the category of...
Let K be a family of structures, closed under isomorphism, in a fixed computable language. We consid...
Ph.D. University of Hawaii at Manoa 2014.Includes bibliographical references.We analyze computable a...
Abstract. We classify the computability-theoretic complexity of two index sets of classes of first-o...
We show that the index set complexity of the computably categorical structures is View the MathML so...
Classification is an important goal in many branches of mathematics. The idea is to describe the mem...
AbstractWhenever a structure with a particularly interesting computability-theoretic property is fou...
AbstractWe exploit properties of certain directed graphs, obtained from the families of sets with sp...
AbstractThe spectrum of a relation R on a computable structure is the set of Turing degrees of the i...
We prove various results about the complexity of countable structures, both computable and arbitrary...
Let $\le_{c}$ be computable reducibility on computably enumerable equivalence relations (or ceers). ...
AbstractWe investigate effective categoricity of computable equivalence structures A. We show that A...
AbstractThis paper draws close connections between the ease of presenting a given complexity class b...
AbstractA Π01 class is an effectively closed set of reals. We study properties of these classes dete...
We show that the index set complexity of the computably categorical structures is Π11-complete, demo...
Fried and Kollár constructed a fully faithful functor from the category of graphs to the category of...