International audienceIn this paper, we develop an Isabelle/HOL library of order-theoretic concepts, such as various completeness conditions and fixed-point theorems. We keep our formalization as general as possible: we reprove several well-known results about complete orders, often without any property of ordering, thus complete non-orders. In particular, we generalize the Knaster–Tarski theorem so that we ensure the existence of a quasi-fixed point of monotone maps over complete non-orders, and show that the set of quasi-fixed points is complete under a mild condition – attractivity – which is implied by either antisymmetry or transitivity. This result generalizes and strengthens a result by Stauti and Maaden. Finally, we recover Kleene’s...
This chapter gives an overview how retractions are used to prove fixed point results in ordered sets...
A partially ordered set P is ω-chain complete if every countable chain (including the empty set) in ...
AbstractTarski’s fixed point theorem guarantees the existence of a fixed point of an order-preservin...
In this paper, we develop an Isabelle/HOL library of order-theoretic concepts, such as various compl...
In this paper, we develop an Isabelle/HOL library of order-theoreticfixed-point theorems. We keep ou...
Under suitable conditions, we establish the existence of the greatest and the least fixed points of ...
We prove fixed point theorems for monotone mappings in partially ordered complete metric spaces whic...
For a finite ground set X, this paper investigates properties of the set of orders with the fixed po...
The aim of this paper is to present a fuzzification of Tarski's fixed point theorem without the assu...
[eng] The celebrated Kleene fixed point theorem is crucial in the mathematical modelling of recursiv...
AbstractThis survey exhibits various algorithms to decide the question if a given ordered set P has ...
AbstractThrough a simple extension of Brézis–Browder principle to partially ordered spaces, a very g...
summary:In this paper the notion of weak chain-completeness is introduced for pseudo-ordered sets as...
In this paper, we introduce the concept of order-clustered fixed point of set-valued mappings on pre...
AbstractThis paper presents a simplification and generalisation of Barren's “Fixed point theory of u...
This chapter gives an overview how retractions are used to prove fixed point results in ordered sets...
A partially ordered set P is ω-chain complete if every countable chain (including the empty set) in ...
AbstractTarski’s fixed point theorem guarantees the existence of a fixed point of an order-preservin...
In this paper, we develop an Isabelle/HOL library of order-theoretic concepts, such as various compl...
In this paper, we develop an Isabelle/HOL library of order-theoreticfixed-point theorems. We keep ou...
Under suitable conditions, we establish the existence of the greatest and the least fixed points of ...
We prove fixed point theorems for monotone mappings in partially ordered complete metric spaces whic...
For a finite ground set X, this paper investigates properties of the set of orders with the fixed po...
The aim of this paper is to present a fuzzification of Tarski's fixed point theorem without the assu...
[eng] The celebrated Kleene fixed point theorem is crucial in the mathematical modelling of recursiv...
AbstractThis survey exhibits various algorithms to decide the question if a given ordered set P has ...
AbstractThrough a simple extension of Brézis–Browder principle to partially ordered spaces, a very g...
summary:In this paper the notion of weak chain-completeness is introduced for pseudo-ordered sets as...
In this paper, we introduce the concept of order-clustered fixed point of set-valued mappings on pre...
AbstractThis paper presents a simplification and generalisation of Barren's “Fixed point theory of u...
This chapter gives an overview how retractions are used to prove fixed point results in ordered sets...
A partially ordered set P is ω-chain complete if every countable chain (including the empty set) in ...
AbstractTarski’s fixed point theorem guarantees the existence of a fixed point of an order-preservin...