Freely adjoining monoidal duals
Abstract
Given a monoidal category with an object , we construct a monoidal category by freely adjoining a right dual to . We show that the canonical strong monoidal functor provides the unit for a biadjunction with the forgetful 2-functor from the 2-category of monoidal categories with a distinguished dual pair to the 2-category of monoidal categories with a distinguished object. We show that is fully faithful and provide coend formulas for homs of the form and for and . If denotes the free strict monoidal category on a single generating object then is the free monoidal category containing a dual pair of objects. As we have the monoidal pseudopushout , it is of interest to have an explicit model of : we provide both geometric and combinatorial models. We show that the (algebraist's) simplicial category is a monoidal full subcategory of and explain the relationship with the free 2-category containing an adjunction. We describe a generalization of which includes, for example, a combinatorial model for the free monoidal category containing a duality sequence of objects. Actually, is a monoidal full subcategory of .
Cite
@article{arxiv.2004.09697,
title = {Freely adjoining monoidal duals},
author = {Kevin Coulembier and Ross Street and Michel van den Bergh},
journal= {arXiv preprint arXiv:2004.09697},
year = {2023}
}
Comments
27 pages