Monoidal categories enriched in braided monoidal categories
Abstract
We introduce the notion of a monoidal category enriched in a braided monoidal category . We set up the basic theory, and prove a classification result in terms of braided oplax monoidal functors to the Drinfeld center of some monoidal category . Even the basic theory is interesting; it shares many characteristics with the theory of monoidal categories enriched in a symmetric monoidal category, but lacks some features. Of particular note, there is no cartesian product of braided-enriched categories, and the natural transformations do not form a 2-category, but rather satisfy a braided interchange relation. Strikingly, our classification is slightly more general than what one might have anticipated in terms of strong monoidal functors . We would like to understand this further; in a future paper we show that the functor is strong if and only if the enriched category is `complete' in a certain sense. Nevertheless it remains to understand what non-complete enriched categories may look like. One should think of our construction as a generalization of de-equivariantization, which takes a strong monoidal functor for some finite group and a monoidal category , and produces a new monoidal category . In our setting, given any braided oplax monoidal functor , for any braided , we produce : this is not usually an `honest' monoidal category, but is instead -enriched. If has a braided lax monoidal functor to , we can use this to reduce the enrichment to , and this recovers de-equivariantization as a special case.
Cite
@article{arxiv.1701.00567,
title = {Monoidal categories enriched in braided monoidal categories},
author = {Scott Morrison and David Penneys},
journal= {arXiv preprint arXiv:1701.00567},
year = {2017}
}
Comments
38 pages