AbstractThis paper describes general theory underpinning the operational semantics and the denotational Petri net semantics of the box algebra including recursion. For the operational semantics, inductive rules for process expressions are given. For the net semantics, a general mechanism of refinement and relabelling is introduced, using which the connectives of the algebra are defined. The paper also describes a denotational approach to the Petri net semantics of recursive expressions. A domain of nets is identified such that the solution of a given recursive equation can be found by fixpoint approximation from some suitable starting point. The consistency of the two semantics is demonstrated. The theory is generic for a wide class of alge...
International audienceBy focusing on two specific formalisms, viz. Box Algebra and Interval Temporal...
New generalised definitions are given for the refinement and recursion operators in the calculus of ...
In [9] a unifying framework was given for operational and denotational semantics. It uses bialgebras...
The paper outlines a Petri net as well as a structural operational semantics for an algebra of proce...
The paper outlines a Petri net as well as a structural operational semantics for an algebra of proce...
AbstractThe paper describes a Petri net as well as a structural operational semantics for an algebra...
The paper describes a Petri net as well as a structural operational semantics for an algebra of proc...
This paper presents an approach to giving a formal meaning to Petri nets defined using recursive equ...
This paper presents an approach to giving a formal meaning to Petri nets defined using recursive equ...
This chapter addresses a range of issues that arise when process algebras and Petri nets are combine...
The Petri Box algebra defines a linear notation to express a structured class of Petri nets which ca...
International audienceWe define an algebraic framework based on non-safe Petri nets, which allows on...
We define an algebraic framework based on non-safe Petri nets, which allows one to express operation...
The algebra of A-nets, a high level class of labelled Petri nets introduced in the Petri Box Calculu...
This paper discusses issues that arise when process algebras and Petri nets are linked; in particula...
International audienceBy focusing on two specific formalisms, viz. Box Algebra and Interval Temporal...
New generalised definitions are given for the refinement and recursion operators in the calculus of ...
In [9] a unifying framework was given for operational and denotational semantics. It uses bialgebras...
The paper outlines a Petri net as well as a structural operational semantics for an algebra of proce...
The paper outlines a Petri net as well as a structural operational semantics for an algebra of proce...
AbstractThe paper describes a Petri net as well as a structural operational semantics for an algebra...
The paper describes a Petri net as well as a structural operational semantics for an algebra of proc...
This paper presents an approach to giving a formal meaning to Petri nets defined using recursive equ...
This paper presents an approach to giving a formal meaning to Petri nets defined using recursive equ...
This chapter addresses a range of issues that arise when process algebras and Petri nets are combine...
The Petri Box algebra defines a linear notation to express a structured class of Petri nets which ca...
International audienceWe define an algebraic framework based on non-safe Petri nets, which allows on...
We define an algebraic framework based on non-safe Petri nets, which allows one to express operation...
The algebra of A-nets, a high level class of labelled Petri nets introduced in the Petri Box Calculu...
This paper discusses issues that arise when process algebras and Petri nets are linked; in particula...
International audienceBy focusing on two specific formalisms, viz. Box Algebra and Interval Temporal...
New generalised definitions are given for the refinement and recursion operators in the calculus of ...
In [9] a unifying framework was given for operational and denotational semantics. It uses bialgebras...