The π-calculus is a model of concurrent computation based upon the notion of naming. It is first presented in its simplest and original form, with the help of several illustrative applications. Then it is generalized from monadic to polyadic form. Semantics is done in terms of both a reduction system and a version of labelled transitions called commitment ; the known algebraic axiomatization of strong bisimilarity is given in the new setting, and so also is a characterization in modal logic. Some theorems about the replication operator are proved. Justification for the polyadic form is provided by the concepts of sort and sorting which it supports. Several illustrations of different sortings are given. One example is the presentation of ...
In this paper we discuss final semantics for the \u3c0-calculus, a process algebra which models syst...
AbstractIn this paper we give both operational and abstract concurrent semantics for the π-calculus ...
Formalising the π-calculus is an illuminating test of the expressiveness of logical frameworks and ...
The π-calculus is a model of concurrent computation based upon the notion of naming It is rst prese...
This report was published in F. L. Hamer, W. Brauer and H. Schwichtenberg, editors, Logic and Algebr...
AbstractA type system for terms of the monadic π-calculus is introduced and used to obtain a full-ab...
AbstractWe extend the π-calculus with polyadic synchronisation, a generalisation of the communicatio...
The problem of finding a fully abstract model for the polymorphic π-calculus was stated in Pierce an...
Applied process calculi include advanced programming constructs such as type systems, communication ...
We present a formulation of the polyadic π-calculus featuring a syntactic category for agents, toget...
We introduce a calculus which is a direct extension of both the and the π calculi. We give a simpl...
AbstractThe problem of finding a fully abstract model for the polymorphic π-calculus was stated in P...
AbstractWe introduce a temporal logic for the polyadicπ-calculus based on fixed point extensions of ...
We reconsider work by Bellin and Scott in the 1990s on R. Milner and S. Abramsky's encoding of linea...
AbstractWe present the π-calculus, a calculus of communicating systems in which one can naturally ex...
In this paper we discuss final semantics for the \u3c0-calculus, a process algebra which models syst...
AbstractIn this paper we give both operational and abstract concurrent semantics for the π-calculus ...
Formalising the π-calculus is an illuminating test of the expressiveness of logical frameworks and ...
The π-calculus is a model of concurrent computation based upon the notion of naming It is rst prese...
This report was published in F. L. Hamer, W. Brauer and H. Schwichtenberg, editors, Logic and Algebr...
AbstractA type system for terms of the monadic π-calculus is introduced and used to obtain a full-ab...
AbstractWe extend the π-calculus with polyadic synchronisation, a generalisation of the communicatio...
The problem of finding a fully abstract model for the polymorphic π-calculus was stated in Pierce an...
Applied process calculi include advanced programming constructs such as type systems, communication ...
We present a formulation of the polyadic π-calculus featuring a syntactic category for agents, toget...
We introduce a calculus which is a direct extension of both the and the π calculi. We give a simpl...
AbstractThe problem of finding a fully abstract model for the polymorphic π-calculus was stated in P...
AbstractWe introduce a temporal logic for the polyadicπ-calculus based on fixed point extensions of ...
We reconsider work by Bellin and Scott in the 1990s on R. Milner and S. Abramsky's encoding of linea...
AbstractWe present the π-calculus, a calculus of communicating systems in which one can naturally ex...
In this paper we discuss final semantics for the \u3c0-calculus, a process algebra which models syst...
AbstractIn this paper we give both operational and abstract concurrent semantics for the π-calculus ...
Formalising the π-calculus is an illuminating test of the expressiveness of logical frameworks and ...