Add to ORKGThis thesis presents Topological Domain Theory as a powerful and flexible framework for denotational semantics. Topological Domain Theory models a wide range of type constructions and can interpret many computational features. Furthermore, it has close connections to established frameworks for denotational semantics, as well as to well-studied mathematical theories, such as topology and computable analysis.We begin by describing the categories of Topological Domain Theory, and their categorical structure. In particular, we recover the basic constructions of domain theory, such as products, function spaces, fixed points and recursive types, in the context of Topological Domain Theory.As a central contribution, we give a detailed account of h...
In this paper, we survey the use of order-theoretic topology in theoretical computer science, with a...
AbstractAlex Simpson has suggested to use an observationally-induced approach towards modelling comp...
Almost all of the categories normally used as a mathematical foundation for denotational semantics s...
AbstractWe compare how computational effects are modelled in Classical Domain Theory and Topological...
AbstractWe motivate and define a category of topological domains, whose objects are certain topologi...
AbstractThis paper contributes towards establishing the category QCB, of topological quotients of co...
We compare how computational effects are modelled in Classical Domain Theory and Topological Domain ...
We motivate and define a category of "topological domains", whose objects are certain topological sp...
This paper contributes towards establishing the category QCB, of topological quotients of count-ably...
We propose acategory of topological spaces that promises to be convenient for the purposes of domain...
AbstractWe investigate the observationally-induced free algebra approach for constructing computatio...
The theme of this paper is the relation between formal topology and the theory of domains. On one ha...
AbstractThe theme of this paper is the relation between formal topology and the theory of domains. O...
AbstractIn this paper, we survey the use of order-theoretic topology in theoretical computer science...
AbstractAlex Simpson has suggested an observationally-induced approach towards obtaining monads for ...
In this paper, we survey the use of order-theoretic topology in theoretical computer science, with a...
AbstractAlex Simpson has suggested to use an observationally-induced approach towards modelling comp...
Almost all of the categories normally used as a mathematical foundation for denotational semantics s...
AbstractWe compare how computational effects are modelled in Classical Domain Theory and Topological...
AbstractWe motivate and define a category of topological domains, whose objects are certain topologi...
AbstractThis paper contributes towards establishing the category QCB, of topological quotients of co...
We compare how computational effects are modelled in Classical Domain Theory and Topological Domain ...
We motivate and define a category of "topological domains", whose objects are certain topological sp...
This paper contributes towards establishing the category QCB, of topological quotients of count-ably...
We propose acategory of topological spaces that promises to be convenient for the purposes of domain...
AbstractWe investigate the observationally-induced free algebra approach for constructing computatio...
The theme of this paper is the relation between formal topology and the theory of domains. On one ha...
AbstractThe theme of this paper is the relation between formal topology and the theory of domains. O...
AbstractIn this paper, we survey the use of order-theoretic topology in theoretical computer science...
AbstractAlex Simpson has suggested an observationally-induced approach towards obtaining monads for ...
In this paper, we survey the use of order-theoretic topology in theoretical computer science, with a...
AbstractAlex Simpson has suggested to use an observationally-induced approach towards modelling comp...
Almost all of the categories normally used as a mathematical foundation for denotational semantics s...