Systems of fixpoint equations over complete lattices, consisting of (mixed) least and greatest fixpoint equations, allow one to express many verification tasks such as model-checking of various kinds of specification logics or the check of coinductive behavioural equivalences. In this paper we develop a theory of approximation for systems of fixpoint equations in the style of abstract interpretation: a system over some concrete domain is abstracted to a system in a suitable abstract domain, with conditions ensuring that the abstract solution represents a sound/complete overapproximation of the concrete solution. Interestingly, up-to techniques, a classical approach used in coinductive settings to obtain easier or feasible proofs, can be int...
Topological fixpoint logics are a family of logics that admits topological models and where the fixp...
A naive way to solve the model-checking problem of the mu-calculus uses fixpoint iteration. Traditio...
Algebraical fixpoint theory is an invaluable instrument for studying semantics of logics. For exampl...
Systems of fixpoint equations over complete lattices, consisting of (mixed) least and greatest fixpo...
Many analysis and verifications tasks, such as static program analyses and model-checking for tempor...
AbstractMany automated finite-state verification procedures can be viewed as fixpoint computations o...
We present a theory of abstraction for the framework of parameterised Boolean equation systems, a fi...
AbstractMuch of the earlier development of abstract interpretation, and its application to imperativ...
Knaster-Tarski's theorem, characterising the greatest fixpoint of a monotonefunction over a complete...
interpretation is a method to automatically find invariants of programs or pieces of code whose sema...
Many automated finite-state verification procedures can be viewed as fixpoint computations over a fi...
It is well understood that solving parity games is equivalent, up to polynomial time, to model check...
This paper shows that several propositional satisfiability algorithms compute approximations of fixe...
Many practical problems where the environment is not in the system's control such as service orchest...
Approximation Fixpoint Theory was developed as a fixpoint theory of lattice operators that provides ...
Topological fixpoint logics are a family of logics that admits topological models and where the fixp...
A naive way to solve the model-checking problem of the mu-calculus uses fixpoint iteration. Traditio...
Algebraical fixpoint theory is an invaluable instrument for studying semantics of logics. For exampl...
Systems of fixpoint equations over complete lattices, consisting of (mixed) least and greatest fixpo...
Many analysis and verifications tasks, such as static program analyses and model-checking for tempor...
AbstractMany automated finite-state verification procedures can be viewed as fixpoint computations o...
We present a theory of abstraction for the framework of parameterised Boolean equation systems, a fi...
AbstractMuch of the earlier development of abstract interpretation, and its application to imperativ...
Knaster-Tarski's theorem, characterising the greatest fixpoint of a monotonefunction over a complete...
interpretation is a method to automatically find invariants of programs or pieces of code whose sema...
Many automated finite-state verification procedures can be viewed as fixpoint computations over a fi...
It is well understood that solving parity games is equivalent, up to polynomial time, to model check...
This paper shows that several propositional satisfiability algorithms compute approximations of fixe...
Many practical problems where the environment is not in the system's control such as service orchest...
Approximation Fixpoint Theory was developed as a fixpoint theory of lattice operators that provides ...
Topological fixpoint logics are a family of logics that admits topological models and where the fixp...
A naive way to solve the model-checking problem of the mu-calculus uses fixpoint iteration. Traditio...
Algebraical fixpoint theory is an invaluable instrument for studying semantics of logics. For exampl...