Add to ORKGThe (in)equational properties of the least fixed point operation on(omega-)continuous functions on (omega-)complete partially ordered sets arecaptured by the axioms of (ordered) iteration algebras, or iterationtheories. We show that the inequational laws of the sum operation inconjunction with the least fixed point operation in continuous additivealgebras have a finite axiomatization over the inequations of orderediteration algebras. As a byproduct of this relative axiomatizability result, we obtain complete infinite inequational and finite implicationalaxiomatizations. Along the way of proving these results, we give a concrete description of the free algebras in the corresponding variety ofordered iteration algebras. This description uses ...
AbstractWe show that a finite set of equation schemes together with the least fixed point rule gives...
We study equational axiomatizations of bisimulation equivalence for the language obtained by extendi...
This paper contributes to the study of the equational theory of the semantics in van Glabbeek's line...
AbstractWe show that three fixed point structures equipped with (sequential) composition, a sum oper...
Van Glabbeek (1990) presented the linear time-branching time spectrum of behavioral equivalences for...
AbstractThe (in)equational properties of iteration, i.e., least (pre-)fixed point solutions over cpo...
AbstractWe prove the following completeness theorem: If the fixed point operation over a category is...
We prove the following completeness theorem: If the fixed point operation over a category is defined...
Prefix iteration is a variation on the original binary version of the Kleene star operation P*Q, obt...
AbstractIteration theories provide a sound and complete axiomatization of the equational properties ...
We review the rudiments of the equational logic of (least) fixed points and provide some of its appl...
Prefix iteration is a variation on the original binary version of theKleene star operation P*Q, obta...
We give an axiomatic treatment of fixed-point operators in categories. A notion of iteration operato...
AbstractWe show that for several classes of idempotent semirings the least fixed-point of a polynomi...
AbstractWe study equational axiomatizations of bisimulation equivalence for the language obtained by...
AbstractWe show that a finite set of equation schemes together with the least fixed point rule gives...
We study equational axiomatizations of bisimulation equivalence for the language obtained by extendi...
This paper contributes to the study of the equational theory of the semantics in van Glabbeek's line...
AbstractWe show that three fixed point structures equipped with (sequential) composition, a sum oper...
Van Glabbeek (1990) presented the linear time-branching time spectrum of behavioral equivalences for...
AbstractThe (in)equational properties of iteration, i.e., least (pre-)fixed point solutions over cpo...
AbstractWe prove the following completeness theorem: If the fixed point operation over a category is...
We prove the following completeness theorem: If the fixed point operation over a category is defined...
Prefix iteration is a variation on the original binary version of the Kleene star operation P*Q, obt...
AbstractIteration theories provide a sound and complete axiomatization of the equational properties ...
We review the rudiments of the equational logic of (least) fixed points and provide some of its appl...
Prefix iteration is a variation on the original binary version of theKleene star operation P*Q, obta...
We give an axiomatic treatment of fixed-point operators in categories. A notion of iteration operato...
AbstractWe show that for several classes of idempotent semirings the least fixed-point of a polynomi...
AbstractWe study equational axiomatizations of bisimulation equivalence for the language obtained by...
AbstractWe show that a finite set of equation schemes together with the least fixed point rule gives...
We study equational axiomatizations of bisimulation equivalence for the language obtained by extendi...
This paper contributes to the study of the equational theory of the semantics in van Glabbeek's line...