Litcius/Paper detail

Lax monoidal adjunctions, two‐variable fibrations and the calculus of mates

Rune Haugseng, Fabian Hebestreit, Sil Linskens, Joost Nuiten

2023Proceedings of the London Mathematical Society25 citationsDOIOpen Access PDF

Abstract

Abstract We provide a calculus of mates for functors to the ‐category of ‐categories and extend Lurie's unstraightening equivalences to show that (op)lax natural transformations correspond to maps of (co)cartesian fibrations that do not necessarily preserve (co)cartesian edges. As a sample application, we obtain an equivalence between lax symmetric monoidal structures on right adjoint functors and oplax symmetric monoidal structures on the left adjoint functors between symmetric monoidal ‐categories that is compatible with both horizontal and vertical composition of such structures. As the technical heart of the paper, we study various new types of fibrations over a product of two ‐categories. In particular, we show how they can be dualised over one of the two factors and how they encode functors out of the Gray tensor product of ‐categories.

Topics & Concepts

MathematicsFunctorPure mathematicsTensor productSymmetric monoidal categoryHigher category theoryCartesian closed categoryAdjoint functorsEquivalence (formal languages)Cartesian productEnriched categoryAlgebra over a fieldDiscrete mathematicsHomotopy and Cohomology in Algebraic TopologyAlgebraic structures and combinatorial modelsAdvanced Topics in Algebra