Topological fixpoint logics are a family of logics that admits topological models and where the fixpoint operators are defined with respect to the topological interpretations. Here we consider a topological fixpoint logic for relational structures based on Stone spaces, where the fixpoint operators are interpreted via clopen sets. We develop a game-theoretic semantics for this logic. First we introduce games characterising clopen fixpoints of monotone operators on Stone spaces. These fixpoint games allow us to characterise the semantics for our topological fixpoint logic using a two-player graph game. Adequacy of this game is the main result of our paper. Finally, we define bisimulations for the topological structures under consideration an...
Many fixed-point theorems are essentially topological in nature. Among them are the Banach contracti...
We introduce an axiomatization for the coalgebraic fixed point logic which was introduced by Venema ...
Algebraical fixpoint theory is an invaluable instrument for studying semantics of logics. For exampl...
Topological fixpoint logics are a family of logics that admits topological models and where the fixp...
Parikh’s game logic is a PDL-like fixpoint logic interpreted on monotone neighbourhood frames that r...
Parikh’s game logic is a PDL-like fixpoint logic interpreted on monotone neighbourhood frames that r...
Knaster-Tarski's theorem, characterising the greatest fixpoint of a monotonefunction over a complete...
AbstractThis paper generalizes existing connections between automata and logic to a coalgebraic abst...
Many analysis and verifications tasks, such as static program analyses and model-checking for tempor...
Systems of fixpoint equations over complete lattices, consisting of (mixed) least and greatest fixpo...
In recent years several extensions of first-order logic have been investigated in the context of fin...
M.Sc.The aim of the thesis is to develop game-theoretic techniques for dealing with common problems ...
International audienceWe introduce the notion of a topological fixed point in Boolean Networks: a fi...
AbstractThe variety of semantical approaches that have been invented for logic programs is quite bro...
Current methods for solving games embody a form of "procedural rationality" that invites logical ana...
Many fixed-point theorems are essentially topological in nature. Among them are the Banach contracti...
We introduce an axiomatization for the coalgebraic fixed point logic which was introduced by Venema ...
Algebraical fixpoint theory is an invaluable instrument for studying semantics of logics. For exampl...
Topological fixpoint logics are a family of logics that admits topological models and where the fixp...
Parikh’s game logic is a PDL-like fixpoint logic interpreted on monotone neighbourhood frames that r...
Parikh’s game logic is a PDL-like fixpoint logic interpreted on monotone neighbourhood frames that r...
Knaster-Tarski's theorem, characterising the greatest fixpoint of a monotonefunction over a complete...
AbstractThis paper generalizes existing connections between automata and logic to a coalgebraic abst...
Many analysis and verifications tasks, such as static program analyses and model-checking for tempor...
Systems of fixpoint equations over complete lattices, consisting of (mixed) least and greatest fixpo...
In recent years several extensions of first-order logic have been investigated in the context of fin...
M.Sc.The aim of the thesis is to develop game-theoretic techniques for dealing with common problems ...
International audienceWe introduce the notion of a topological fixed point in Boolean Networks: a fi...
AbstractThe variety of semantical approaches that have been invented for logic programs is quite bro...
Current methods for solving games embody a form of "procedural rationality" that invites logical ana...
Many fixed-point theorems are essentially topological in nature. Among them are the Banach contracti...
We introduce an axiomatization for the coalgebraic fixed point logic which was introduced by Venema ...
Algebraical fixpoint theory is an invaluable instrument for studying semantics of logics. For exampl...