We give an axiomatic treatment of fixed-point operators in categories. A notion of iteration operator is defined, embodying the equational properties of iteration theories. We prove a general completeness theorem for iteration operators, relying on a new, purely syntactic characterisation of the free iteration theory. We then show how iteration operators arise in axiomatic domain theory. One result derives them from the existence of sufficiently many bifree algebras (exploiting the universal property Freyd introduced in his notion of algebraic compactness) . Another result shows that, in the presence of a parameterized natural numbers object and an equational lifting monad, any uniform fixed-point operator is necessarily an iteration opera...
We introduce a notion of category with feedback-with-delay, closely related to the notion of traced ...
AbstractIterative monads of Calvin Elgot were introduced to treat the semantics of recursive equatio...
AbstractThis paper continues the study of the general theory, begun in [4], of semantic domains base...
We prove the following completeness theorem: If the fixed point operation over a category is defined...
AbstractWe prove the following completeness theorem: If the fixed point operation over a category is...
“In the setting of algebraic theories enriched with an external fixed-point operation, the no-tion o...
The #-calculus features both variables and names, together with their binding mechanisms. This means...
AbstractThe (in)equational properties of iteration, i.e., least (pre-)fixed point solutions over cpo...
AbstractThe concept of iteration theory of Bloom and Ésik summarizes all equational properties that ...
AbstractIteration theories provide a sound and complete axiomatization of the equational properties ...
In this paper closure theory is applied in order to obtain a uniform semantical treatment of both pr...
Deficiency in expressive power of the first-order logic has led to developing its numerous extension...
We associate an identity with every finite automaton and show that a set of equations consiting of s...
International audienceWe study the logical properties of the (parametric) well-founded fixed point o...
AbstractThe equational class generated by rational algebraic theories was characterized in Esik, Com...
We introduce a notion of category with feedback-with-delay, closely related to the notion of traced ...
AbstractIterative monads of Calvin Elgot were introduced to treat the semantics of recursive equatio...
AbstractThis paper continues the study of the general theory, begun in [4], of semantic domains base...
We prove the following completeness theorem: If the fixed point operation over a category is defined...
AbstractWe prove the following completeness theorem: If the fixed point operation over a category is...
“In the setting of algebraic theories enriched with an external fixed-point operation, the no-tion o...
The #-calculus features both variables and names, together with their binding mechanisms. This means...
AbstractThe (in)equational properties of iteration, i.e., least (pre-)fixed point solutions over cpo...
AbstractThe concept of iteration theory of Bloom and Ésik summarizes all equational properties that ...
AbstractIteration theories provide a sound and complete axiomatization of the equational properties ...
In this paper closure theory is applied in order to obtain a uniform semantical treatment of both pr...
Deficiency in expressive power of the first-order logic has led to developing its numerous extension...
We associate an identity with every finite automaton and show that a set of equations consiting of s...
International audienceWe study the logical properties of the (parametric) well-founded fixed point o...
AbstractThe equational class generated by rational algebraic theories was characterized in Esik, Com...
We introduce a notion of category with feedback-with-delay, closely related to the notion of traced ...
AbstractIterative monads of Calvin Elgot were introduced to treat the semantics of recursive equatio...
AbstractThis paper continues the study of the general theory, begun in [4], of semantic domains base...