We propose an algorithm for generating a Priority Rewrite System (PRS) for an arbitrary process language in the OSOS format such that rewriting of process terms is sound for bisimulation and head normalising. The algorithm is inspired by a procedure which was developed by Aceto, Bloom and Vaandrager and presented in Turning SOS rules into equa-tions [2]. For a subclass of OSOS process languages representing finite behaviours the PRSs that are generated by our algorithm are strongly normalising (terminating) and confluent, where termination is proved using the dependency pair and dependency graph techniques. Addi-tionally, such PRSs are complete for bisimulation on closed process terms modulo associa-tivity and commutativity of the choice op...
It has long been recognised that standard process algebra has difficulty dealing with actions of dif...
Introducing priorities on rules in rewriting increases their expressive power and helps to limit com...
AbstractThis paper gives an operational semantics of priority term rewriting systems (PRSs) by using...
AbstractWe propose an algorithm for generating a Priority Rewrite System (PRS) for an arbitrary proc...
We study the semantics of term rewriting systems with rule priorities (PRS), as introduced in Baeten...
We study the semantics of term rewriting systems with rule priorities (PRS), as introduced in [1]. T...
AbstractWe study the semantics of term rewriting systems with rule priorities (PRS), as introduced i...
This paper gives an operational semantics of priority term rewriting systems (PRS) by using conditio...
Process algebra represents a mathematically rigorous framework for modeling con-current systems of i...
Priority rewrite systems (PRS) [BBK] are partially ordered finite sets of rewrite rules; in this pap...
AbstractWe propose a uniform framework, based on the Ordered Structural Operational Semantics (OSOS)...
We study the semantics of term rewriting systems with rule priorities (PRS), as introduced in [1]. T...
We study the semantics of term rewriting systems with rule priorities (PRS), as introduced in [1]. ...
Introducing priorities on rules in rewriting increases their expressive power and helps to limit com...
Abstract. It has long been recognised that standard process algebra has difficulty dealing with acti...
It has long been recognised that standard process algebra has difficulty dealing with actions of dif...
Introducing priorities on rules in rewriting increases their expressive power and helps to limit com...
AbstractThis paper gives an operational semantics of priority term rewriting systems (PRSs) by using...
AbstractWe propose an algorithm for generating a Priority Rewrite System (PRS) for an arbitrary proc...
We study the semantics of term rewriting systems with rule priorities (PRS), as introduced in Baeten...
We study the semantics of term rewriting systems with rule priorities (PRS), as introduced in [1]. T...
AbstractWe study the semantics of term rewriting systems with rule priorities (PRS), as introduced i...
This paper gives an operational semantics of priority term rewriting systems (PRS) by using conditio...
Process algebra represents a mathematically rigorous framework for modeling con-current systems of i...
Priority rewrite systems (PRS) [BBK] are partially ordered finite sets of rewrite rules; in this pap...
AbstractWe propose a uniform framework, based on the Ordered Structural Operational Semantics (OSOS)...
We study the semantics of term rewriting systems with rule priorities (PRS), as introduced in [1]. T...
We study the semantics of term rewriting systems with rule priorities (PRS), as introduced in [1]. ...
Introducing priorities on rules in rewriting increases their expressive power and helps to limit com...
Abstract. It has long been recognised that standard process algebra has difficulty dealing with acti...
It has long been recognised that standard process algebra has difficulty dealing with actions of dif...
Introducing priorities on rules in rewriting increases their expressive power and helps to limit com...
AbstractThis paper gives an operational semantics of priority term rewriting systems (PRSs) by using...