AbstractIt is common practice in both theoretical computer science and theoretical physics to describe the (static) logic of a system by means of a complete lattice. When formalizing the dynamics of such a system, the updates of that system organize themselves quite naturally in a quantale, or more generally, a quantaloid. In fact, we are lead to consider cocomplete quantaloid-enriched categories as fundamental mathematical structure for a dynamic logic common to both computer science and physics. Here we explain the theory of totally continuous cocomplete categories as generalization of the well-known theory of totally continuous suplattices. That is to say, we undertake some first steps towards a theory of “dynamic domains”
There exists a KZ-doctrine on the 2-category of the locally small categories whose algebras are exac...
This thesis consists of two parts: a synthesis of the theory of categories enriched in a quantaloid;...
AbstractThe simple connection of completeness and cocompleteness of lattices grows in categories int...
AbstractIt is common practice in both theoretical computer science and theoretical physics to descri...
AbstractIt is common practice in both theoretical computer science and theoretical physics to descri...
It is common practice in both theoretical computer science and theoretical physics to describe the (...
AbstractOur work is a foundational study of the notion of approximation in Q-categories and in (U,Q)...
Abstract. A quantaloid is a sup-lattice-enriched category; our subject is that of categories, functo...
AbstractWe describe a duality for quantale-enriched categories that extends the Lawson duality for c...
We study some particular examples of quantaloids and corresponding morphisms, originating from primi...
AbstractWe address two areas in which quantales have been used. One is of a topological nature, wher...
While the study of quantale-like structures goes back up to the 1930’s (notwithstanding that the ter...
There have been developed several approaches to a quantale-valued quantitative domain theory. If the...
AbstractLet Ω be a commutative, unital quantale. Complete and directed complete Ω-categories are the...
summary:The paper considers a fuzzification of the notion of quantaloid of K. I. Rosenthal, which re...
There exists a KZ-doctrine on the 2-category of the locally small categories whose algebras are exac...
This thesis consists of two parts: a synthesis of the theory of categories enriched in a quantaloid;...
AbstractThe simple connection of completeness and cocompleteness of lattices grows in categories int...
AbstractIt is common practice in both theoretical computer science and theoretical physics to descri...
AbstractIt is common practice in both theoretical computer science and theoretical physics to descri...
It is common practice in both theoretical computer science and theoretical physics to describe the (...
AbstractOur work is a foundational study of the notion of approximation in Q-categories and in (U,Q)...
Abstract. A quantaloid is a sup-lattice-enriched category; our subject is that of categories, functo...
AbstractWe describe a duality for quantale-enriched categories that extends the Lawson duality for c...
We study some particular examples of quantaloids and corresponding morphisms, originating from primi...
AbstractWe address two areas in which quantales have been used. One is of a topological nature, wher...
While the study of quantale-like structures goes back up to the 1930’s (notwithstanding that the ter...
There have been developed several approaches to a quantale-valued quantitative domain theory. If the...
AbstractLet Ω be a commutative, unital quantale. Complete and directed complete Ω-categories are the...
summary:The paper considers a fuzzification of the notion of quantaloid of K. I. Rosenthal, which re...
There exists a KZ-doctrine on the 2-category of the locally small categories whose algebras are exac...
This thesis consists of two parts: a synthesis of the theory of categories enriched in a quantaloid;...
AbstractThe simple connection of completeness and cocompleteness of lattices grows in categories int...