Subexponentials in non-commutative linear logic

Kanovich, Max I.; Kuznetsov, Stepan L.; Nigam, Vivek; Scedrov, Andre

doi:10.1017/s0960129518000117

Cited by 33 publications

(50 citation statements)

References 52 publications

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“…These modalities are called subexponentials. A systematic study of subexponentials in the non-commutative case, under the umbrella of the Lambek calculus and cyclic linear logic, is performed in [26]. We also plan to study systems with (sub)exponentials, built on top of light [27] and soft [28] linear logic.…”

Section: Related Workmentioning

confidence: 99%

Reconciling Lambek’s restriction, cut-elimination and substitution in the presence of exponential modalities

Kanovich

Kuznetsov

Scedrov

2020

Journal of Logic and Computation

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The Lambek calculus can be considered as a version of non-commutative intuitionistic linear logic. One of the interesting features of the Lambek calculus is the so-called "Lambek's restriction," that is, the antecedent of any provable sequent should be non-empty. In this paper we discuss ways of extending the Lambek calculus with the linear logic exponential modality while keeping Lambek's restriction. Interestingly enough, we show that for any system equipped with a reasonable exponential modality the following holds: if the system enjoys cut elimination and substitution to the full extent, then the system necessarily violates Lambek's restriction. Nevertheless, we show that two of the three conditions can be implemented. Namely, we design a system with Lambek's restriction and cut elimination and another system with Lambek's restriction and substitution. For both calculi we prove that they are undecidable, even if we take only one of the two divisions provided by the Lambek calculus. The system with cut elimination and substitution and without Lambek's restriction is folklore and known to be undecidable.

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Section: Related Workmentioning

confidence: 99%

Reconciling Lambek’s restriction, cut-elimination and substitution in the presence of exponential modalities

Kanovich

Kuznetsov

Scedrov

2020

Journal of Logic and Computation

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“…Namely, if we contract the formula A being cut, then after propagation we get two cut applications, one under another. For the lower cut, we fail to maintain the decrease of induction parameters, see Kanovich et al (2019a). The standard strategy, going back to Gentzen (1935) and applied to linear logic with exponentials by Girard (1987) and Lincoln et al (1992), replaces the cut rule with a more general rule called mix.…”

Section: Cut Elimination In Modified Systemsmentioning

confidence: 99%

“…Recall the well-known proof of undecidability for !L * , the Lambek calculus (without brackets) enriched with a full-power exponential modality (Lincoln et al, 1992;Kanazawa, 1999;Kanovich et al, 2019a), via encoding of semi-Thue systems.…”

Section: Undecidabilitymentioning

confidence: 99%

“…In comparison with a series of our papers on the Lambek calculus and non-commutative linear logic with subexponential modalities (Kanovich et al, 2016a(Kanovich et al, , 2020(Kanovich et al, , 2016b(Kanovich et al, , 2019a(Kanovich et al, , 2018, the principal difference of this paper is the presence of brackets and bracket modalities. Contraction rules used by Morrill in the bracketed calculi essentially interact with brackets and become disfunctional in the bracket-free fragment.…”

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confidence: 99%

“…Medial extraction can be handled by adding a subexponential modality (cf. Kanovich et al (2019a)), denoted by !, which allows permutation. In general, the Lambek calculus is non-commutative, thus, the order of the words in a sentence matters.…”

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confidence: 99%

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Undecidability of the Lambek Calculus with Subexponential and Bracket Modalities

Kanovich

Kuznetsov

Scedrov

2017

Fundamentals of Computation Theory

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Abstract. The Lambek calculus is a well-known logical formalism for modelling natural language syntax. The original calculus covered a substantial number of intricate natural language phenomena, but only those restricted to the context-free setting. In order to address more subtle linguistic issues, the Lambek calculus has been extended in various ways. In particular, Morrill and Valentín (2015) introduce an extension with so-called exponential and bracket modalities. Their extension is based on a non-standard contraction rule for the exponential that interacts with the bracket structure in an intricate way. The standard contraction rule is not admissible in this calculus. In this paper we prove undecidability of the derivability problem in their calculus. We also investigate restricted decidable fragments considered by Morrill and Valentin and we show that these fragments belong to the NP class. (CDG, Dikovsky and Dekhtyar [12]), and Lambek categorial grammars. A categorial grammar assigns syntactic categories (types) to words of the language. In the Lambek setting, types are constructed using two division operations, \ and /, and the product, ·. Intuitively, A \ B denotes the type of a syntactic object that lacks something of type A on the left side to become an object of type B; B / A is symmetric; the product stands for concatenation. The Lambek calculus provides a system of rules for reasoning about syntactic types. Linguistic Introduction

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