DI-algebra is a process algebra for delay-insensitive processes. Like in most process algebras, a normal form for finite expressions can be defined. Unlike most process algebras, however we show that we can also define a normal form for recursive expressions. This is done by first eliminating operators using the laws of the algebra and then minimizing cycles in a state graph.</p
In [7], an algebra for timed automata has been introduced. In this article, we introduce a syntactic...
We consider a generic process algebra of which the standard process algebras ACP, CCS and CSP are ...
AbstractRefining techniques of previous works, we obtain a normal form arithmetical representation f...
DI-algebra is a process algebra for delay-insensitive processes. Like in most process algebras, a no...
A process algebra is given for specifying delay-insensitive processes. We show in two steps that exp...
A process algebra is given for specifying delay-insensitive processes. We show in two steps that exp...
Numerous formalisms exist to specify delay-insensitive computations and their implementations. It is...
We develop a (co)algebraic framework to study a family of process calculi with monadic branching str...
A classical while-program normal-form theorem is derived in demonic refinement algebra. In contrast ...
© 2018 Association for Computing Machinery. Recursive programs can now be expressed as normal forms ...
AbstractA classical while-program normal-form theorem is derived in demonic refinement algebra. In c...
Recently there has been a growing interest towards algebraic structures that are able to express for...
The methods of constructing normal forms in the class of algebras are considered. Formulas of algebr...
We provide rules for calculating with invariants in process algebra with data, and illustrate these ...
Process algebra is a device for analysing sequential processes, and has been studied in Amsterdam si...
In [7], an algebra for timed automata has been introduced. In this article, we introduce a syntactic...
We consider a generic process algebra of which the standard process algebras ACP, CCS and CSP are ...
AbstractRefining techniques of previous works, we obtain a normal form arithmetical representation f...
DI-algebra is a process algebra for delay-insensitive processes. Like in most process algebras, a no...
A process algebra is given for specifying delay-insensitive processes. We show in two steps that exp...
A process algebra is given for specifying delay-insensitive processes. We show in two steps that exp...
Numerous formalisms exist to specify delay-insensitive computations and their implementations. It is...
We develop a (co)algebraic framework to study a family of process calculi with monadic branching str...
A classical while-program normal-form theorem is derived in demonic refinement algebra. In contrast ...
© 2018 Association for Computing Machinery. Recursive programs can now be expressed as normal forms ...
AbstractA classical while-program normal-form theorem is derived in demonic refinement algebra. In c...
Recently there has been a growing interest towards algebraic structures that are able to express for...
The methods of constructing normal forms in the class of algebras are considered. Formulas of algebr...
We provide rules for calculating with invariants in process algebra with data, and illustrate these ...
Process algebra is a device for analysing sequential processes, and has been studied in Amsterdam si...
In [7], an algebra for timed automata has been introduced. In this article, we introduce a syntactic...
We consider a generic process algebra of which the standard process algebras ACP, CCS and CSP are ...
AbstractRefining techniques of previous works, we obtain a normal form arithmetical representation f...