In [5] we study Nonassociative Lambek Calculus (NL) augmented with De Morgan negation, satisfying the double negation and contraposition laws. This logic, introduced by de Grooté and Lamarche [10], is called Classical Non-Associative Lambek Calculus (CNL). Here we study a weaker logic InNL, i.e. NL with two involutive negations. We present a one-sided sequent system for InNL, admitting cut elimination. We also prove that InNL is PTIME
Non-wellfounded and circular proofs have been recognised over the past decade as a valuable tool to ...
International audienceWe review the relationship between abstract machines for (call-by-name or call...
"Non-monotonic" logical systems are logics in which the introduction of new axioms can invalidate ...
In [5] we study Nonassociative Lambek Calculus (NL) augmented with De Morgan negation, satisfying th...
Bilinear Logic of Lambek amounts to Noncommutative MALL of Abrusci. Lambek proves the cut–eliminatio...
Capítol de llibre d'homenatge "Categories and Types in Logic, Language, and Physics. Essays Dedicate...
In this thesis I study several deductive systems for linear logic, its fragments, and some noncommut...
Colloque avec actes et comité de lecture.We prove, by introducing a new kind of sequent calculus, th...
In this paper we do not want to give a detailed overview of the various formalizations of nonmonoton...
We study Nonassociative Lambek Calculus with additives ∧,∨, sat-isfying the distributive law (Full N...
We introduce a sequent calculus FL', which has at most one formula on the right side of sequent, and...
Gentzen's sequent calculi LK and LJ are landmark proof systems. They identify the structural rules o...
We present a sequent calculus for intuitionistic non-commutative linear logic (IN-CLL), show that it...
Abstract. We study Nonassociative Lambek Calculus with additives ∧,∨, satisfying the distributive la...
In this article, we consider LK, a cut-free sequent calculus able to faithfully characterize classic...
Non-wellfounded and circular proofs have been recognised over the past decade as a valuable tool to ...
International audienceWe review the relationship between abstract machines for (call-by-name or call...
"Non-monotonic" logical systems are logics in which the introduction of new axioms can invalidate ...
In [5] we study Nonassociative Lambek Calculus (NL) augmented with De Morgan negation, satisfying th...
Bilinear Logic of Lambek amounts to Noncommutative MALL of Abrusci. Lambek proves the cut–eliminatio...
Capítol de llibre d'homenatge "Categories and Types in Logic, Language, and Physics. Essays Dedicate...
In this thesis I study several deductive systems for linear logic, its fragments, and some noncommut...
Colloque avec actes et comité de lecture.We prove, by introducing a new kind of sequent calculus, th...
In this paper we do not want to give a detailed overview of the various formalizations of nonmonoton...
We study Nonassociative Lambek Calculus with additives ∧,∨, sat-isfying the distributive law (Full N...
We introduce a sequent calculus FL', which has at most one formula on the right side of sequent, and...
Gentzen's sequent calculi LK and LJ are landmark proof systems. They identify the structural rules o...
We present a sequent calculus for intuitionistic non-commutative linear logic (IN-CLL), show that it...
Abstract. We study Nonassociative Lambek Calculus with additives ∧,∨, satisfying the distributive la...
In this article, we consider LK, a cut-free sequent calculus able to faithfully characterize classic...
Non-wellfounded and circular proofs have been recognised over the past decade as a valuable tool to ...
International audienceWe review the relationship between abstract machines for (call-by-name or call...
"Non-monotonic" logical systems are logics in which the introduction of new axioms can invalidate ...