In category theory, monoidal functors are functors between monoidal categories which preserve the monoidal structure. More specifically, a monoidal functor between two monoidal categories consists of a functor between the categories, along with two coherence maps—a natural transformation and a morphism that preserve monoidal multiplication and unit, respectively. Mathematicians require these coherence maps to satisfy additional properties depending on how strictly they want to preserve the monoidal structure; each of these properties gives rise to a slightly different definition of monoidal functors
- The coherence maps of lax monoidal functors satisfy no additional properties; they are not necessarily invertible.
- The coherence maps of strong monoidal functors are invertible.
- The coherence maps of strict monoidal functors are identity maps.
Although we distinguish between these different definitions here, authors may call any one of these simply monoidal functors.
Definition
editLet and be monoidal categories. A lax monoidal functor from to (which may also just be called a monoidal functor) consists of a functor together with a natural transformation
between functors and a morphism
- ,
called the coherence maps or structure morphisms, which are such that for every three objects , and of the diagrams
commute in the category . Above, the various natural transformations denoted using are parts of the monoidal structure on and .[1]
Variants
edit- The dual of a monoidal functor is a comonoidal functor; it is a monoidal functor whose coherence maps are reversed. Comonoidal functors may also be called opmonoidal, colax monoidal, or oplax monoidal functors.
- A strong monoidal functor is a monoidal functor whose coherence maps are invertible.
- A strict monoidal functor is a monoidal functor whose coherence maps are identities.
- A braided monoidal functor is a monoidal functor between braided monoidal categories (with braidings denoted ) such that the following diagram commutes for every pair of objects A, B in :
- A symmetric monoidal functor is a braided monoidal functor whose domain and codomain are symmetric monoidal categories.
Examples
edit- The underlying functor from the category of abelian groups to the category of sets. In this case, the map sends (a, b) to ; the map sends to 1.
- If is a (commutative) ring, then the free functor extends to a strongly monoidal functor (and also if is commutative).
- If is a homomorphism of commutative rings, then the restriction functor is monoidal and the induction functor is strongly monoidal.
- An important example of a symmetric monoidal functor is the mathematical model of topological quantum field theory. Let be the category of cobordisms of n-1,n-dimensional manifolds with tensor product given by disjoint union, and unit the empty manifold. A topological quantum field theory in dimension n is a symmetric monoidal functor
- The homology functor is monoidal as via the map .
Alternate notions
editIf and are closed monoidal categories with internal hom-functors (we drop the subscripts for readability), there is an alternative formulation
- ψAB : F(A ⇒ B) → FA ⇒ FB
of φAB commonly used in functional programming. The relation between ψAB and φAB is illustrated in the following commutative diagrams:
Properties
edit- If is a monoid object in , then is a monoid object in .[2]
Monoidal functors and adjunctions
editSuppose that a functor is left adjoint to a monoidal . Then has a comonoidal structure induced by , defined by
and
- .
If the induced structure on is strong, then the unit and counit of the adjunction are monoidal natural transformations, and the adjunction is said to be a monoidal adjunction; conversely, the left adjoint of a monoidal adjunction is always a strong monoidal functor.
Similarly, a right adjoint to a comonoidal functor is monoidal, and the right adjoint of a comonoidal adjunction is a strong monoidal functor.
See also
editInline citations
edit- ^ Perrone (2024), pp. 360–364
- ^ Perrone (2024), pp. 367–368
References
edit- Kelly, G. Max (1974). "Doctrinal adjunction". Category Seminar. Lecture Notes in Mathematics. Vol. 420. Springer. pp. 257–280. doi:10.1007/BFb0063105. ISBN 978-3-540-37270-7.
- Perrone, Paolo (2024). Starting Category Theory. World Scientific. doi:10.1142/9789811286018_0005. ISBN 978-981-12-8600-1.