Abstract
Process algebras and Petri nets are two well known formal methods. In the literature, several mappings from process algebras to Petri nets have been proposed to provide a truly concurrent semantic framework to concurrent programming languages. From an applicative point of view, such mappings facilitate the integration and the cross fertilization between the two formalisms, making it possible the development of a multiparadigm methodology for the modeling and analysis of concurrent systems since the early stages of their design. This is especially important since the two formalisms are characterized by complementary strengths and weaknesses. In this paper we define a new Petri net semantics for process algebras and we demonstrate that it improves the previous proposals with respect to the size of the resulting nets. Additionally, we illustrate the usefulness of the net semantics by showing how to reinterpret at the process algebra level results efficiently obtainable at the Petri net level.
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