An introduction to two more technical previous preprints.International audienceThis paper investigates the use of symmetric monoidal closed (SMC) structure for representing syntax with variable binding, in particular for languages with linear aspects. In our setting, one first specifies an SMC theory T, which may express binding operations, in a way reminiscent from higher-order abstract syntax. This theory generates an SMC category S(T) whose morphisms are, in a sense, terms in the desired syntax. We apply our approach to Jensen and Milner's (abstract binding) bigraphs, which are linear w.r.t. processes. This leads to an alternative category of bigraphs, which we compare to the original
This is a report on aspects of the theory and use of monoidal categories. The first section introduc...
AbstractVarious situations in computer science call for categories that support both cartesian close...
AbstractThe suspension-loop construction is used to define a process in a symmetric monoidal categor...
An introduction to two more technical previous preprints.International audienceThis paper investigat...
En se fondant sur les travaux de Trimble et al., puis Hughes, on donne une notion de théorie symétri...
17 pages, uses Paul Taylor's diagrams.Milner's bigraphs are a general framework for reasoning about ...
En se fondant sur les travaux de Trimble et al., puis Hughes, on donne une notion de théorie symétri...
Abstract. We define a notion of symmetric monoidal closed (smc) theory, consisting of a smc signatur...
Uses Paul Taylor's diagrams.We define a notion of symmetric monoidal closed (SMC) theory, consisting...
I investigate and develop theory for term languages for a variant of bigraphs with binding, thus bui...
We generalise Fiore et al's account of variable binding for untyped cartesian contexts and Tana...
This paper develops a formal string diagram language for monoidal closed categories. Previous work h...
String diagrams are a powerful and intuitive graphical syntax for terms of symmetric monoidal catego...
We introduce regular languages of morphisms in free monoidal categories, with their associated gramm...
Compositional graph models for global computing systems must account for two relevant dimensions, ...
This is a report on aspects of the theory and use of monoidal categories. The first section introduc...
AbstractVarious situations in computer science call for categories that support both cartesian close...
AbstractThe suspension-loop construction is used to define a process in a symmetric monoidal categor...
An introduction to two more technical previous preprints.International audienceThis paper investigat...
En se fondant sur les travaux de Trimble et al., puis Hughes, on donne une notion de théorie symétri...
17 pages, uses Paul Taylor's diagrams.Milner's bigraphs are a general framework for reasoning about ...
En se fondant sur les travaux de Trimble et al., puis Hughes, on donne une notion de théorie symétri...
Abstract. We define a notion of symmetric monoidal closed (smc) theory, consisting of a smc signatur...
Uses Paul Taylor's diagrams.We define a notion of symmetric monoidal closed (SMC) theory, consisting...
I investigate and develop theory for term languages for a variant of bigraphs with binding, thus bui...
We generalise Fiore et al's account of variable binding for untyped cartesian contexts and Tana...
This paper develops a formal string diagram language for monoidal closed categories. Previous work h...
String diagrams are a powerful and intuitive graphical syntax for terms of symmetric monoidal catego...
We introduce regular languages of morphisms in free monoidal categories, with their associated gramm...
Compositional graph models for global computing systems must account for two relevant dimensions, ...
This is a report on aspects of the theory and use of monoidal categories. The first section introduc...
AbstractVarious situations in computer science call for categories that support both cartesian close...
AbstractThe suspension-loop construction is used to define a process in a symmetric monoidal categor...