[eng] The celebrated Kleene fixed point theorem is crucial in the mathematical modelling of recursive specifications in Denotational Semantics. In this paper we discuss whether the hypothesis of the aforementioned result can be weakened. An affirmative answer to the aforesaid inquiry is provided so that a characterization of those properties that a self-mapping must satisfied in order to guarantee that its set of fixed points is non-empty when no notion of completeness are assumed to be satisfied by the partially ordered set. Moreover, the case in which the partially ordered set is coming from a quasi-metric space is treated in depth. Finally, an application of the exposed theory is obtained. Concretely, a mathematical method to discuss the...
International audienceIn this paper, we develop an Isabelle/HOL library of order-theoretic concepts,...
In this paper we present a new fixed point theorem applicable for a countable system of recursive eq...
This chapter gives an overview how retractions are used to prove fixed point results in ordered sets...
The celebrated Kleene fixed point theorem is crucial in the mathematical modelling of recursive spec...
The class of partial orders is shown to have Ol laws for first-order logic and for inductive fixed-p...
AbstractThe class of partial orders is shown to have 0–1 laws for first-order logic and for inductiv...
Schellekens [The Smyth completion: A common foundation for denotational semantics and complexity ana...
Abstract In 1972, D.S. Scott developed a qualitative mathematical technique for modeling the meanin...
The study of the dual complexity space, introduced by S. Romaguera and M. P. Schellekens [Quasi-metr...
AbstractWell-founded (partial) orders form an important and convenient mathematical basis for provin...
The proofs of major results of Computability Theory like Rice, Rice-Shapiro or Kleene's fixed point ...
AbstractThis survey exhibits various algorithms to decide the question if a given ordered set P has ...
AbstractThe Smyth completion ([15], [16], [18] and [19]) provides a topological foundation for Denot...
The extensions of first-order logic with a least fixed point operators (FO + LFP) and with a partial...
In 1970, a qualitative xed point technique useful to model the recursive specications in denotation...
International audienceIn this paper, we develop an Isabelle/HOL library of order-theoretic concepts,...
In this paper we present a new fixed point theorem applicable for a countable system of recursive eq...
This chapter gives an overview how retractions are used to prove fixed point results in ordered sets...
The celebrated Kleene fixed point theorem is crucial in the mathematical modelling of recursive spec...
The class of partial orders is shown to have Ol laws for first-order logic and for inductive fixed-p...
AbstractThe class of partial orders is shown to have 0–1 laws for first-order logic and for inductiv...
Schellekens [The Smyth completion: A common foundation for denotational semantics and complexity ana...
Abstract In 1972, D.S. Scott developed a qualitative mathematical technique for modeling the meanin...
The study of the dual complexity space, introduced by S. Romaguera and M. P. Schellekens [Quasi-metr...
AbstractWell-founded (partial) orders form an important and convenient mathematical basis for provin...
The proofs of major results of Computability Theory like Rice, Rice-Shapiro or Kleene's fixed point ...
AbstractThis survey exhibits various algorithms to decide the question if a given ordered set P has ...
AbstractThe Smyth completion ([15], [16], [18] and [19]) provides a topological foundation for Denot...
The extensions of first-order logic with a least fixed point operators (FO + LFP) and with a partial...
In 1970, a qualitative xed point technique useful to model the recursive specications in denotation...
International audienceIn this paper, we develop an Isabelle/HOL library of order-theoretic concepts,...
In this paper we present a new fixed point theorem applicable for a countable system of recursive eq...
This chapter gives an overview how retractions are used to prove fixed point results in ordered sets...