Bilinear Logic of Lambek amounts to Noncommutative MALL of Abrusci. Lambek proves the cut–elimination theorem for a one-sided (in fact, left-sided) sequent system for this logic. Here we prove an analogous result for the nonassociative version of this logic. Like Lambek, we consider a left-sided system, but the result also holds for its right-sided version, by a natural symmetry. The treatment of nonassociative sequent systems involves some subtleties, not appearing in associative logics. We also prove the PTime complexity of the multiplicative fragment of NBL
Given a logic presented in a sequent calculus, a natural question is that ofequivalence of proofs: t...
AbstractSystem NEL is a conservative extension of multiplicative exponential linear logic (extended ...
Besides the cut rule, Gentzen’s sequent calculus LJ for propositional intuitionistic logic contains ...
In [5] we study Nonassociative Lambek Calculus (NL) augmented with De Morgan negation, satisfying th...
We introduce a sequent calculus FL', which has at most one formula on the right side of sequent, and...
Adding multi-modalities (called subexponentials) to linear logic enhances its power as a logical fra...
In a previous work we introduced a non-associative non-commutative logic extended by multimodalities...
A b s t r a c t. The present paper is concerned with the cut eliminability for some sequent systems ...
AbstractWe carry out a unified investigation of two prominent topics in proof theory and order algeb...
We introduce a sequent calculus with a simple restriction of Lambek\u27s product rules that precisel...
In this thesis I study several deductive systems for linear logic, its fragments, and some noncommut...
Non-wellfounded and circular proofs have been recognised over the past decade as a valuable tool to ...
AbstractThe decision problem is studied for the nonmodal or multiplicative-additive fragment of firs...
We study a system, called NEL, which is the mixed commutative/non-commutative linear logic BV augmen...
AbstractSystem BV is an extension of multiplicative linear logic (MLL) with the rules mix, nullary m...
Given a logic presented in a sequent calculus, a natural question is that ofequivalence of proofs: t...
AbstractSystem NEL is a conservative extension of multiplicative exponential linear logic (extended ...
Besides the cut rule, Gentzen’s sequent calculus LJ for propositional intuitionistic logic contains ...
In [5] we study Nonassociative Lambek Calculus (NL) augmented with De Morgan negation, satisfying th...
We introduce a sequent calculus FL', which has at most one formula on the right side of sequent, and...
Adding multi-modalities (called subexponentials) to linear logic enhances its power as a logical fra...
In a previous work we introduced a non-associative non-commutative logic extended by multimodalities...
A b s t r a c t. The present paper is concerned with the cut eliminability for some sequent systems ...
AbstractWe carry out a unified investigation of two prominent topics in proof theory and order algeb...
We introduce a sequent calculus with a simple restriction of Lambek\u27s product rules that precisel...
In this thesis I study several deductive systems for linear logic, its fragments, and some noncommut...
Non-wellfounded and circular proofs have been recognised over the past decade as a valuable tool to ...
AbstractThe decision problem is studied for the nonmodal or multiplicative-additive fragment of firs...
We study a system, called NEL, which is the mixed commutative/non-commutative linear logic BV augmen...
AbstractSystem BV is an extension of multiplicative linear logic (MLL) with the rules mix, nullary m...
Given a logic presented in a sequent calculus, a natural question is that ofequivalence of proofs: t...
AbstractSystem NEL is a conservative extension of multiplicative exponential linear logic (extended ...
Besides the cut rule, Gentzen’s sequent calculus LJ for propositional intuitionistic logic contains ...