We develop a (co)algebraic framework to study a family of process calculi with monadic branching structures and recursion operators. Our framework features a uniform semantics of process terms and a complete axiomatisation of semantic equivalence. We show that there are uniformly defined fragments of our calculi that capture well-known examples from the literature like regular expressions modulo bisimilarity and guarded Kleene algebra with tests. We also derive new calculi for probabilistic and convex processes with an analogue of Kleene star
In this paper a process is viewed as a labeled graph modulo bisimulation equivalence. Three topics a...
We develop a theory of syntax with bindings, focusing on:- methodological issues concerning the conv...
Markov processes are a fundamental model of probabilistic transition systems and are the underlying ...
We develop a (co)algebraic framework to study a family of process calculi with monadic branching str...
AbstractThis paper introduces a general framework of probabilistic and nondeterministic recursive pr...
While different algebraic structures have been proposed for the treatment of concurrency, finding so...
Algebraic Theory of Processes provides the first general and systematic introduction to the semantic...
AbstractNondeterminism is a direct outcome of interactions and is, therefore a central ingredient fo...
Every day we witness the fast development of the hardware and software technology. This, of course, ...
Process algebras with abstraction have been widely used for the specification and verification of no...
We study a process algebra which combines both nondeterministic and probabilistic behavior in the st...
AbstractThis talk offers a survey of negative results on the existence of finite equational axiomati...
AbstractWe present a couple of programs (over C and Mathematica) which allow to generate the syntact...
This thesis is concerned with the algebraic theory of finite state processes. The processes we focus...
AbstractThis paper presents an equational axiomatization of bisimulation equivalence over the langua...
In this paper a process is viewed as a labeled graph modulo bisimulation equivalence. Three topics a...
We develop a theory of syntax with bindings, focusing on:- methodological issues concerning the conv...
Markov processes are a fundamental model of probabilistic transition systems and are the underlying ...
We develop a (co)algebraic framework to study a family of process calculi with monadic branching str...
AbstractThis paper introduces a general framework of probabilistic and nondeterministic recursive pr...
While different algebraic structures have been proposed for the treatment of concurrency, finding so...
Algebraic Theory of Processes provides the first general and systematic introduction to the semantic...
AbstractNondeterminism is a direct outcome of interactions and is, therefore a central ingredient fo...
Every day we witness the fast development of the hardware and software technology. This, of course, ...
Process algebras with abstraction have been widely used for the specification and verification of no...
We study a process algebra which combines both nondeterministic and probabilistic behavior in the st...
AbstractThis talk offers a survey of negative results on the existence of finite equational axiomati...
AbstractWe present a couple of programs (over C and Mathematica) which allow to generate the syntact...
This thesis is concerned with the algebraic theory of finite state processes. The processes we focus...
AbstractThis paper presents an equational axiomatization of bisimulation equivalence over the langua...
In this paper a process is viewed as a labeled graph modulo bisimulation equivalence. Three topics a...
We develop a theory of syntax with bindings, focusing on:- methodological issues concerning the conv...
Markov processes are a fundamental model of probabilistic transition systems and are the underlying ...