Numerous formalisms exist to specify delay-insensitive computations and their implementations. It is not always straightforward to compare specifications in the different formalisms. One way of comparing specifications is transforming them to automata in which nodes are annotated with progress requirement. In this paper we present an alogorithm that transforms DI-algebra recursive process expressions into finite automata. In doing so we develop an operational semantics for DI-algebra. The algorithm has been proven correct, and we highlight the most interesting aspects of that proof. The algorithm has been implemented and turns out to be very valuable in the process of getting a specification right
This chapter presents a new algorithm for incrementally building minimal acyclic deterministic finit...
We prove that testing preorder of De Nicola and Hennessy is preserved by all De Simone process opera...
The equivalence of finite automata and regular expressions dates back to the seminal paper of Kleene...
Numerous formalisms exist to specify delay-insensitive computations and their implementations. It is...
In [7], an algebra for timed automata has been introduced. In this article, we introduce a syntactic...
Abst rac t. In [7], an algebra for timed automata has been introduced. In this article, we introduce...
This paper presents a taxonomy of finite automata construction algorithms. Each algorithm is classif...
DI-algebra is a process algebra for delay-insensitive processes. Like in most process algebras, a no...
The author, who died in 1984, is well-known both as a person and through his research in mathematica...
In this article practical, experimental and theoretical results of the conducted research are presen...
The notion of delays arises naturally in many computational models, such as, in the design of circui...
Input/output automata are a widely used formalism for the specification and verification of concurre...
AbstractInput/output automata are a widely used formalism for the specification and verification of ...
This paper aims at introducing finite automata theory, the different ways to describe regular langua...
AbstractWe prove that testing preorder of De Nicola and Hennessy is preserved by all operators of De...
This chapter presents a new algorithm for incrementally building minimal acyclic deterministic finit...
We prove that testing preorder of De Nicola and Hennessy is preserved by all De Simone process opera...
The equivalence of finite automata and regular expressions dates back to the seminal paper of Kleene...
Numerous formalisms exist to specify delay-insensitive computations and their implementations. It is...
In [7], an algebra for timed automata has been introduced. In this article, we introduce a syntactic...
Abst rac t. In [7], an algebra for timed automata has been introduced. In this article, we introduce...
This paper presents a taxonomy of finite automata construction algorithms. Each algorithm is classif...
DI-algebra is a process algebra for delay-insensitive processes. Like in most process algebras, a no...
The author, who died in 1984, is well-known both as a person and through his research in mathematica...
In this article practical, experimental and theoretical results of the conducted research are presen...
The notion of delays arises naturally in many computational models, such as, in the design of circui...
Input/output automata are a widely used formalism for the specification and verification of concurre...
AbstractInput/output automata are a widely used formalism for the specification and verification of ...
This paper aims at introducing finite automata theory, the different ways to describe regular langua...
AbstractWe prove that testing preorder of De Nicola and Hennessy is preserved by all operators of De...
This chapter presents a new algorithm for incrementally building minimal acyclic deterministic finit...
We prove that testing preorder of De Nicola and Hennessy is preserved by all De Simone process opera...
The equivalence of finite automata and regular expressions dates back to the seminal paper of Kleene...