Sequent calculi for normal and non-normal deontic logics are introduced. For these calculi we prove that weakening and contraction are height-preserving admissible, and we give a syntactic proof of the admissibility of cut. This yields that the subformula property holds for them and that they are decidable. Then we show that our calculi are equivalent to the axiomatic ones, and therefore that they are sound and complete w.r.t. neighborhood semantics. This is a major step in the development of the proof theory of deontic logics since our calculi allow for a systematic root-first proof search of formal derivations
This paper provides a proof-theoretic study of quantified non-normal modal logics. It introduces l...
Abstract. In this paper we investigate, for intuitionistic implicational logic, the relationship bet...
In the context of intuitionistic implicational logic, we achieve a perfect correspondence (technical...
Sequent calculi for normal and non-normal deontic logics are introduced. For these calculi we prove ...
G3-style sequent calculi for the logics in the cube of non-normal modal logics and for their deontic...
1 Introduction Sequent calculi provide a rigorous basis for meta-theoretic studies of logics. The ce...
International audienceIn this paper we present labelled sequent calculi and labelled natural deducti...
In the previous chapter we developed linear logic in the form of natural deduction, which is appropr...
Abstract. Starting with the deontic principles in Mı̄mām. sa ̄ texts we introduce a new deontic log...
A sequent calculus with the subformula property has long been recognised as a highly favourable star...
This thesis offers a study of the Curry-Howard correspondence for a certain fragment (the canonical ...
Arbeit an der Bibliothek noch nicht eingelangt - Daten nicht geprüftAbweichender Titel nach Übersetz...
In this thesis I study several deductive systems for linear logic, its fragments, and some noncommut...
In this thesis we consider generic tools and techniques for the proof-theoretic investigation of not...
International audienceWe present some hypersequent calculi for all systems of the classical cube and...
This paper provides a proof-theoretic study of quantified non-normal modal logics. It introduces l...
Abstract. In this paper we investigate, for intuitionistic implicational logic, the relationship bet...
In the context of intuitionistic implicational logic, we achieve a perfect correspondence (technical...
Sequent calculi for normal and non-normal deontic logics are introduced. For these calculi we prove ...
G3-style sequent calculi for the logics in the cube of non-normal modal logics and for their deontic...
1 Introduction Sequent calculi provide a rigorous basis for meta-theoretic studies of logics. The ce...
International audienceIn this paper we present labelled sequent calculi and labelled natural deducti...
In the previous chapter we developed linear logic in the form of natural deduction, which is appropr...
Abstract. Starting with the deontic principles in Mı̄mām. sa ̄ texts we introduce a new deontic log...
A sequent calculus with the subformula property has long been recognised as a highly favourable star...
This thesis offers a study of the Curry-Howard correspondence for a certain fragment (the canonical ...
Arbeit an der Bibliothek noch nicht eingelangt - Daten nicht geprüftAbweichender Titel nach Übersetz...
In this thesis I study several deductive systems for linear logic, its fragments, and some noncommut...
In this thesis we consider generic tools and techniques for the proof-theoretic investigation of not...
International audienceWe present some hypersequent calculi for all systems of the classical cube and...
This paper provides a proof-theoretic study of quantified non-normal modal logics. It introduces l...
Abstract. In this paper we investigate, for intuitionistic implicational logic, the relationship bet...
In the context of intuitionistic implicational logic, we achieve a perfect correspondence (technical...