In this paper we show how Rate Transition Systems (RTSs) can be used as a unifying framework for the definition of the semantics of stochastic process algebras. RTSs facilitate the compositional definition of such semantics exploiting operators on the next state functions which are the functional counterpart of classical process algebra operators. We apply this framework to representative fragments of major stochastic process calculi namely TIPP, PEPA and IML and show how they solve the issue of transition multiplicity in a simple and elegant way. We, moreover, show how RTSs help describing different languages, their differences and their similarities. For each calculus, we also show the formal correspondence between the RTSs semantics and ...
Abstract Labeled state-to-function transition systems, FuTS for short, admit multiple transition sch...
AbstractThis paper introduces (pronounce spades), a stochastic process algebra for discrete event sy...
This paper introduces (pronounce spades), a stochastic process algebra for discrete-event systems, t...
In this paper we show how Rate Transition Systems (RTSs) can be used as a unifying framework for the...
In this paper we show how Rate Transition Systems (RTSs) can be used as a unifying framework for the...
Abstract. A variant of Rate Transition Systems (RTS), proposed by Klin and Sassone, is introduced an...
We introduce a unifying framework to provide the semantics of process algebras, including their quan...
Rate transition systems (RTS) are a special kind of transition systems introduced for defining the s...
Rate transition systems (RTS) are a special kind of transition systems introduced for defining the s...
Labeled state-to-function transition systems, FuTS for short, admit multiple transition schemes fro...
The stochastic process algebra MTIPP has emerged from research in the field of process descriptions ...
Despite its relatively short history, a wealth of formalisms exist for algebraic specification of st...
We introduce a framework to study stochastic systems, i.e. systems in which the time of occurrence o...
Abstract Labeled state-to-function transition systems, FuTS for short, admit multiple transition sch...
AbstractThis paper introduces (pronounce spades), a stochastic process algebra for discrete event sy...
This paper introduces (pronounce spades), a stochastic process algebra for discrete-event systems, t...
In this paper we show how Rate Transition Systems (RTSs) can be used as a unifying framework for the...
In this paper we show how Rate Transition Systems (RTSs) can be used as a unifying framework for the...
Abstract. A variant of Rate Transition Systems (RTS), proposed by Klin and Sassone, is introduced an...
We introduce a unifying framework to provide the semantics of process algebras, including their quan...
Rate transition systems (RTS) are a special kind of transition systems introduced for defining the s...
Rate transition systems (RTS) are a special kind of transition systems introduced for defining the s...
Labeled state-to-function transition systems, FuTS for short, admit multiple transition schemes fro...
The stochastic process algebra MTIPP has emerged from research in the field of process descriptions ...
Despite its relatively short history, a wealth of formalisms exist for algebraic specification of st...
We introduce a framework to study stochastic systems, i.e. systems in which the time of occurrence o...
Abstract Labeled state-to-function transition systems, FuTS for short, admit multiple transition sch...
AbstractThis paper introduces (pronounce spades), a stochastic process algebra for discrete event sy...
This paper introduces (pronounce spades), a stochastic process algebra for discrete-event systems, t...