Diamonds Are Forever: Theoretical and Empirical Support for a Dependency-Enhanced Type Logic

Publication date

2023

Authors

Moortgat, MichaelORCID 0000-0003-3568-9920ISNI 0000000084059771
Kogkalidis, KonstantinosISNI 000000049283049X
Wijnholds, GijsORCID 0000-0002-7198-1024ISNI 0000000493556883

Editors

Loukanova, Roussanka
Lumsdaine, Peter LeFanu
Muskens, Reinhard

Advisors

Supervisors

Document Type

Part of book
Open Access logo

License

taverne

Abstract

Extended Lambek calculi enlarge the type language with adjoint pairs of unary modalities. In previous work, modalities have been used as licensors for controlled forms of restructuring, reordering and copying. Here, we study a complementary use of the modalities as dependency features coding for grammatical roles. The result is a multidimensional type logic simultaneously inducing dependency and function argument structure on the linguistic material. We discuss the new perspective on constituent structure suggested by the dependency-enhanced type logic, and we experimentally evaluate how well a neural language model like BERT can deal with the subtle interplay between logical and structural reasoning that this type logic gives rise to.

Keywords

Dependency modalities, Lambek calculus, Neural language models, Probing, Typelogical grammar, Taverne, Artificial Intelligence

Citation

Moortgat, M, Kogkalidis, K & Wijnholds, G 2023, Diamonds Are Forever : Theoretical and Empirical Support for a Dependency-Enhanced Type Logic. in R Loukanova, P L Lumsdaine & R Muskens (eds), Logic and Algorithms in Computational Linguistics, LACompLing 2021. Studies in Computational Intelligence, vol. 1081, Springer Science and Business Media Deutschland GmbH, pp. 57-87, Symposium on Logic and Algorithms in Computational Linguistics, LACompLing 2021, Virtual, Online, 13/12/21. https://doi.org/10.1007/978-3-031-21780-7_3, conference