nLab braided monoidal functor

Contents

Context

Monoidal categories

Contents

Idea
Properties
Related concepts
References

Idea

A braided monoidal functor is a functor $F : C \to D$ between braided monoidal categories that is a monoidal functor which respects the braiding on both sides, i.e. satisfies the law:

where $\beta$ is braiding on $C$ , $\beta'$ is braiding on $D$ , and $\mu$ is the lax monoidal structure on $F$ .

Properties

Between symmetric monoidal categories a braided monoidal functor is the same as a symmetric monoidal functor.

Related concepts

References

An exposition is in

John Baez, Some definitions everyone should know.

Last revised on April 30, 2024 at 06:57:25. See the history of this page for a list of all contributions to it.