Domain-theoretic categories are axiomatised by means of categorical non-order-theoretic requirements on a cartesian closed category equipped with a commutative monad. In this paper we prove an enrichment theorem showing that every axiomatic domain-theoretic category can be endowed with an intensional notion of approximation, the path relation, with respect to which the category Cpo-enriches. Our analysis suggests more liberal notions of domains. In particular, we present a category where the path order is not [omega]-complete, but in which the constructions of domain theory (such as, for example, the existence of uniform fixed-point operators and the solution of domain equations) are available
In this note continuous directed-complete partial orders with least element (domains) are enriched b...
AbstractIn this paper we show how the natural duality between the category CPOU of cpos and continuo...
We propose acategory of topological spaces that promises to be convenient for the purposes of domain...
. We relate certain models of Axiomatic Domain Theory (ADT) and Synthetic Domain Theory (SDT). On th...
Infinite contexts and their corresponding lattices are of theoretical and practical interest since t...
We motivate and define a category of "topological domains", whose objects are certain topological sp...
Grant ARG 2281/14/6This thesis is an investigation into axiomatic categorical domain theory as neede...
Categorical models of the metalanguage FPC (a type theory with sums, products, exponentials and re...
AbstractWe motivate and define a category of topological domains, whose objects are certain topologi...
Recursive specifications of domains plays a crucial role in denotational semantics as developed by S...
We study the enrichment of models of axiomatic domain theory. To this end, we introduce a new and br...
We study the enrichment of models of axiomatic do- main theory. To this end, we introduce a new and...
In this paper, we tailor-make new approximation operators inspired by roughset theory and specially ...
We relate certain models of Axiomatic Domain Theory (ADT) and Synthetic Domain Theory (SDT). On the...
We give various internal descriptions of the category !-Cpo of !-complete posets and !-continuous f...
In this note continuous directed-complete partial orders with least element (domains) are enriched b...
AbstractIn this paper we show how the natural duality between the category CPOU of cpos and continuo...
We propose acategory of topological spaces that promises to be convenient for the purposes of domain...
. We relate certain models of Axiomatic Domain Theory (ADT) and Synthetic Domain Theory (SDT). On th...
Infinite contexts and their corresponding lattices are of theoretical and practical interest since t...
We motivate and define a category of "topological domains", whose objects are certain topological sp...
Grant ARG 2281/14/6This thesis is an investigation into axiomatic categorical domain theory as neede...
Categorical models of the metalanguage FPC (a type theory with sums, products, exponentials and re...
AbstractWe motivate and define a category of topological domains, whose objects are certain topologi...
Recursive specifications of domains plays a crucial role in denotational semantics as developed by S...
We study the enrichment of models of axiomatic domain theory. To this end, we introduce a new and br...
We study the enrichment of models of axiomatic do- main theory. To this end, we introduce a new and...
In this paper, we tailor-make new approximation operators inspired by roughset theory and specially ...
We relate certain models of Axiomatic Domain Theory (ADT) and Synthetic Domain Theory (SDT). On the...
We give various internal descriptions of the category !-Cpo of !-complete posets and !-continuous f...
In this note continuous directed-complete partial orders with least element (domains) are enriched b...
AbstractIn this paper we show how the natural duality between the category CPOU of cpos and continuo...
We propose acategory of topological spaces that promises to be convenient for the purposes of domain...