In this paper, we model fresh names in the π-calculus using abstractions with respect to a new binding operator 6. Both the theory and the metatheory of the π-calculus benefit from this simple extension. The operational semantics of this new calculus is finitely branching. Bisimulation can be given without mentioning any constraint on names, thus allowing for a straightforward definition of a coalgebraic semantics, within a category of coalgebras over permutation algebras. Following previous work by Montanari and Pistore, we present also a finite representation for finitary processes and a finite state verification procedure for bisimilarity, based on the new notion of θ-automaton.
Modeling fresh names in the π-calculus using abstractions
HONSELL, Furio;LENISA, Marina;MICULAN, Marino
2004-01-01
Abstract
In this paper, we model fresh names in the π-calculus using abstractions with respect to a new binding operator 6. Both the theory and the metatheory of the π-calculus benefit from this simple extension. The operational semantics of this new calculus is finitely branching. Bisimulation can be given without mentioning any constraint on names, thus allowing for a straightforward definition of a coalgebraic semantics, within a category of coalgebras over permutation algebras. Following previous work by Montanari and Pistore, we present also a finite representation for finitary processes and a finite state verification procedure for bisimilarity, based on the new notion of θ-automaton.| File | Dimensione | Formato | |
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