In this paper we study the complexity of disjunction property for Intuitionistic Logic, the modal logics S3, S4.1, Grzegorczyk Logic, Godel-Lob Logic and the intuitionistic counterpart of the modal logic K. For S4 we even prove the feasible interpolation theorem and we provide a lower bound for the length of proofs. The techniques we use do not require to prove structural properties of the calculi in hand, such as the Cut-elimination Theorem or the Normalization Theorem. This is a key-point of our approach, since it allows us to treat logics for which only Hilbert-style characterizations are known
International audience—We show an effective cut-free variant of Glivenko's theorem extended to formu...
This thesis presents some new results in structural proof theory for modal, intuitionistic, and intu...
AbstractA problem of recognizing important properties of propositional calculi is considered, and co...
n this article we study the complexity of disjunction property for intuitionistic logic, the modal l...
AbstractThis paper considers the computational complexity of the disjunction and existential propert...
This paper considers the computational complexity of the disjunction and existential properties of i...
In this paper we provide a uniform framework, based on extraction calculi, where to study the comple...
AbstractWe give proofs of the effective monotone interpolation property for the system of modal logi...
We prove Feasible Disjunction Property for modal propositional logics K, K4, K4Grz, GL, T, S4, and S...
The thesis investigates classical and intuitionistic modal logics via proof-theoretic methods for tw...
We explore the proof complexity of intuitionistic propositional logic (IPL). The problem of determin...
A b s t r a c t. Disjunctive rules are known to validate mate-rial implication principles, which may...
Abstract We study implicational formulas in the context of proof complexity of intuitionistic propos...
In this paper we demonstrate decidability for the intuitionistic modal logic S4 first formulated by ...
Possible world semantics underlies many of the applications of modal logic in computer science and p...
International audience—We show an effective cut-free variant of Glivenko's theorem extended to formu...
This thesis presents some new results in structural proof theory for modal, intuitionistic, and intu...
AbstractA problem of recognizing important properties of propositional calculi is considered, and co...
n this article we study the complexity of disjunction property for intuitionistic logic, the modal l...
AbstractThis paper considers the computational complexity of the disjunction and existential propert...
This paper considers the computational complexity of the disjunction and existential properties of i...
In this paper we provide a uniform framework, based on extraction calculi, where to study the comple...
AbstractWe give proofs of the effective monotone interpolation property for the system of modal logi...
We prove Feasible Disjunction Property for modal propositional logics K, K4, K4Grz, GL, T, S4, and S...
The thesis investigates classical and intuitionistic modal logics via proof-theoretic methods for tw...
We explore the proof complexity of intuitionistic propositional logic (IPL). The problem of determin...
A b s t r a c t. Disjunctive rules are known to validate mate-rial implication principles, which may...
Abstract We study implicational formulas in the context of proof complexity of intuitionistic propos...
In this paper we demonstrate decidability for the intuitionistic modal logic S4 first formulated by ...
Possible world semantics underlies many of the applications of modal logic in computer science and p...
International audience—We show an effective cut-free variant of Glivenko's theorem extended to formu...
This thesis presents some new results in structural proof theory for modal, intuitionistic, and intu...
AbstractA problem of recognizing important properties of propositional calculi is considered, and co...