Add to ORKGWe define game semantics for the constructive $\mu$-calculus and prove its correctness. We use these game semantics to prove that the $\mu$-calculus collapses to modal logic over $\mathsf{CS5}$ frames. Finally, we prove the completeness of $\mathsf{\mu CS5}$ over $\mathsf{CS5}$ frames
We explore the proof theory of the modal μ-calculus with converse, aka the ‘full μ-calculus’. Buildi...
AbstractThis paper extends previous work on the modal logic CK as a reference system, both proof-the...
We present a family of minimal modal logics (namely, modal logics based on minimal propositional log...
International audienceIn this paper we provide the first game semantics for the constructive modal l...
In this paper we investigate the Curry-Howard correspondence for constructive modal logic in light o...
We present two sequent calculi for the modal µ-calculus over S5 and prove their completeness by usin...
We introduce a new game-theoretic semantics (GTS) for the modal mu-calculus. Our so-called bounded G...
The modal µ-calculus has strong expressive power to describe properties of Kripke structures. The se...
We propose a new version of formula size game for modal logic. The game characterizes the equivalenc...
In this paper we provide two new semantics for proofs in the constructive modal logics CK and CD. Th...
Game logic was introduced by Rohit Parikh in the 1980s as a generalisation of propositional dynamic ...
International audienceCombinatorial proofs form a syntax-independent presentation of proofs, origina...
The modal mu-calculus is a very expressive formalism extending basic modal logic with least and grea...
We build on existing work on finitary modular coalgebraic logics [3,4], which we extend with general...
Fixpoint Logic with Chop extends the modal µ-calculus with a sequential com-position operator which ...
We explore the proof theory of the modal μ-calculus with converse, aka the ‘full μ-calculus’. Buildi...
AbstractThis paper extends previous work on the modal logic CK as a reference system, both proof-the...
We present a family of minimal modal logics (namely, modal logics based on minimal propositional log...
International audienceIn this paper we provide the first game semantics for the constructive modal l...
In this paper we investigate the Curry-Howard correspondence for constructive modal logic in light o...
We present two sequent calculi for the modal µ-calculus over S5 and prove their completeness by usin...
We introduce a new game-theoretic semantics (GTS) for the modal mu-calculus. Our so-called bounded G...
The modal µ-calculus has strong expressive power to describe properties of Kripke structures. The se...
We propose a new version of formula size game for modal logic. The game characterizes the equivalenc...
In this paper we provide two new semantics for proofs in the constructive modal logics CK and CD. Th...
Game logic was introduced by Rohit Parikh in the 1980s as a generalisation of propositional dynamic ...
International audienceCombinatorial proofs form a syntax-independent presentation of proofs, origina...
The modal mu-calculus is a very expressive formalism extending basic modal logic with least and grea...
We build on existing work on finitary modular coalgebraic logics [3,4], which we extend with general...
Fixpoint Logic with Chop extends the modal µ-calculus with a sequential com-position operator which ...
We explore the proof theory of the modal μ-calculus with converse, aka the ‘full μ-calculus’. Buildi...
AbstractThis paper extends previous work on the modal logic CK as a reference system, both proof-the...
We present a family of minimal modal logics (namely, modal logics based on minimal propositional log...