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ENTCS
2008
2008
A Categorical Model of the Fusion Calculus
We provide a categorical presentation of the Fusion calculus. Working in a suitable category of presheaves, we describe the syntax as initial algebra of a signature endofunctor, and the semantics as coalgebras of a "behaviour" endofunctor. To this end, we first give a new, congruence-free presentation of the Fusion calculus; then, the behaviour endofunctor is constructed by adding in a systematic way a notion of "state" to the intuitive endofunctor induced by the LTS. Coalgebras can be given a concrete presentation as "stateful indexed labelled transition systems"; the bisimilarity over these systems is a congruence, and corresponds equivalence. Then, we model the labelled transition system of Fusion by as abstract categorical rules. As a consequence, we get a semantics for the Fusion calculus which is both compositional and fully : two processes have the same semantics iff they are bisimilar, that is, hyperequivalent.
Real-time Traffic| Added | 10 Dec 2010 |
| Updated | 10 Dec 2010 |
| Type | Journal |
| Year | 2008 |
| Where | ENTCS |
| Authors | Marino Miculan |
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