Add to ORKGWe introduce a temporal logic for the polyadic pi-calculus based on fixed point extensions of Hennessy-Milner logic. Features are added to account for parametrisation, generation, and passing of names, including the use, following Milner, of dependent sum and product to account for (unlocalised) input and output, and explicit parametrisation on names using lambda-abstraction and application. The latter provides a single name binding mechanism supporting all parametrisation needed. A proof system and decision procedure is developed based on Stirling and Walker's approach to model checking the modal mu-calculus using constants. One difficulty, for both conceptual and efficiency-based reasons, is to avoid the explicit use of the omega-rule for...
We set up a logical framework for the compositional analysis of finite pi-calculus processes. In par...
We define a finite-control fragment of the ambient calculus, a formalism for describing distributed ...
A psi-calculus is an extension of the pi-calculus with nominal data types for data structures, logic...
We introduce a temporal logic for the polyadic pi-calculus based on fixed point extensions of Hennes...
We introduce a temporal logic for the polyadic pi-calculus based on fixed point extensions of Henne...
AbstractWe introduce a temporal logic for the polyadicπ-calculus based on fixed point extensions of ...
Abstract. Model checking for transition systems specified in pi-calculus has been a difficult proble...
In process algebras, bisimulation equivalence is typically defined directly in terms of the operatio...
We study an extension of Hennessy-Milner logic for the pi-calculus which gives a sound and complete ...
We study the problem of specifying and verifying properties of pi-calculus processes while relying o...
We study the problem of specifying and verifying properties of pi-calculus processes while relying o...
We present an implementation of model checking for probabilistic and stochastic extensions of the pi...
AbstractThe π-calculus is one of the most important mobile process calculi and has been well studied...
The π-calculus is one of the most important mobile process calculi and has been well studied in the ...
A prototype version of a semantic-based verification environment for manipulating and analyzing mob...
We set up a logical framework for the compositional analysis of finite pi-calculus processes. In par...
We define a finite-control fragment of the ambient calculus, a formalism for describing distributed ...
A psi-calculus is an extension of the pi-calculus with nominal data types for data structures, logic...
We introduce a temporal logic for the polyadic pi-calculus based on fixed point extensions of Hennes...
We introduce a temporal logic for the polyadic pi-calculus based on fixed point extensions of Henne...
AbstractWe introduce a temporal logic for the polyadicπ-calculus based on fixed point extensions of ...
Abstract. Model checking for transition systems specified in pi-calculus has been a difficult proble...
In process algebras, bisimulation equivalence is typically defined directly in terms of the operatio...
We study an extension of Hennessy-Milner logic for the pi-calculus which gives a sound and complete ...
We study the problem of specifying and verifying properties of pi-calculus processes while relying o...
We study the problem of specifying and verifying properties of pi-calculus processes while relying o...
We present an implementation of model checking for probabilistic and stochastic extensions of the pi...
AbstractThe π-calculus is one of the most important mobile process calculi and has been well studied...
The π-calculus is one of the most important mobile process calculi and has been well studied in the ...
A prototype version of a semantic-based verification environment for manipulating and analyzing mob...
We set up a logical framework for the compositional analysis of finite pi-calculus processes. In par...
We define a finite-control fragment of the ambient calculus, a formalism for describing distributed ...
A psi-calculus is an extension of the pi-calculus with nominal data types for data structures, logic...