Pre-rigid Monoidal Categories
Abstract
Liftable pairs of adjoint functors between braided monoidal categories in the sense of \cite{GV-OnTheDuality} provide auto-adjunctions between the associated categories of bialgebras. Motivated by finding interesting examples of such pairs, we study general pre-rigid monoidal categories. Roughly speaking, these are monoidal categories in which for every object , an object and a nicely behaving evaluation map from to the unit object exist. A prototypical example is the category of vector spaces over a field, where is not a categorical dual if is not finite-dimensional. We explore the connection with related notions such as right closedness, and present meaningful examples. We also study the categorical frameworks for Turaev's Hopf group-(co)algebras in the light of pre-rigidity and closedness, filling some gaps in literature along the way. Finally, we show that braided pre-rigid monoidal categories indeed provide an appropriate setting for liftability in the sense of loc. cit. and we present an application, varying on the theme of vector spaces, showing how -- in favorable cases -- the notion of pre-rigidity allows to construct liftable pairs of adjoint functors when right closedness of the category is not available.
Cite
@article{arxiv.2201.03952,
title = {Pre-rigid Monoidal Categories},
author = {Alessandro Ardizzoni and Isar Goyvaerts and Claudia Menini},
journal= {arXiv preprint arXiv:2201.03952},
year = {2022}
}