Knaster-Tarski's theorem, characterising the greatest fixpoint of a monotone function over a complete lattice as the largest post-fixpoint, naturally leads to the so-called coinduction proof principle for showing that some element is below the greatest fixpoint (e.g., for providing bisimilarity witnesses). The dual principle, used for showing that an element is above the least fixpoint, is related to inductive invariants. In this paper we provide proof rules which are similar in spirit but for showing that an element is above the greatest fixpoint or, dually, below the least fixpoint. The theory is developed for non-expansive monotone functions on suitable lattices of the form $\mathbb{M}^Y$, where $Y$ is a finite set and $\mathbb{M}$ an MV...
I try to come up with general techniques for approximating least fixpoints from below and greatest fix...
summary:A constructively valid counterpart to Bourbaki's Fixpoint Lemma for chain-complete partially...
AbstractGiven an instance of the maximum satisfiability problem involving n logical variables, truth...
Knaster-Tarski's theorem, characterising the greatest fixpoint of a monotonefunction over a complete...
Many analysis and verifications tasks, such as static program analyses and model-checking for tempor...
Given is an ordered set in which every chain has an upper bound and every pair of elements has a gre...
AbstractGiven is an ordered set in which every chain has an upper bound and every pair of elements h...
Systems of fixpoint equations over complete lattices, consisting of (mixed) least and greatest fixpo...
Topological fixpoint logics are a family of logics that admits topological models and where the fixp...
Least fixpoints of monotone functions are an important concept in computer science which can be gene...
We present {\em Approximation theory}, an extension of Tarski's least fixpoint theory for nonmonoton...
AbstractIt is shown that the least fixed point and greatest fixed point operations of an increasing ...
Given a non-empty strictly inductive poset X, that is, a non-empty partially ordered set such that e...
We propose a method to characterize the fixed points described in Tarski's theorem for complete latt...
I give short and constructive proofs of Tarski’s fixed-point theorem, and of Zhou’s extension of Tar...
I try to come up with general techniques for approximating least fixpoints from below and greatest fix...
summary:A constructively valid counterpart to Bourbaki's Fixpoint Lemma for chain-complete partially...
AbstractGiven an instance of the maximum satisfiability problem involving n logical variables, truth...
Knaster-Tarski's theorem, characterising the greatest fixpoint of a monotonefunction over a complete...
Many analysis and verifications tasks, such as static program analyses and model-checking for tempor...
Given is an ordered set in which every chain has an upper bound and every pair of elements has a gre...
AbstractGiven is an ordered set in which every chain has an upper bound and every pair of elements h...
Systems of fixpoint equations over complete lattices, consisting of (mixed) least and greatest fixpo...
Topological fixpoint logics are a family of logics that admits topological models and where the fixp...
Least fixpoints of monotone functions are an important concept in computer science which can be gene...
We present {\em Approximation theory}, an extension of Tarski's least fixpoint theory for nonmonoton...
AbstractIt is shown that the least fixed point and greatest fixed point operations of an increasing ...
Given a non-empty strictly inductive poset X, that is, a non-empty partially ordered set such that e...
We propose a method to characterize the fixed points described in Tarski's theorem for complete latt...
I give short and constructive proofs of Tarski’s fixed-point theorem, and of Zhou’s extension of Tar...
I try to come up with general techniques for approximating least fixpoints from below and greatest fix...
summary:A constructively valid counterpart to Bourbaki's Fixpoint Lemma for chain-complete partially...
AbstractGiven an instance of the maximum satisfiability problem involving n logical variables, truth...