Graded category

If ${\mathcal {A}}$ is a category, then a ${\mathcal {A}}$ -graded category is a category ${\mathcal {C}}$ together with a functor $F\colon {\mathcal {C}}\rightarrow {\mathcal {A}}$ .

Monoids and groups can be thought of as categories with a single element. A monoid-graded or group-graded category is therefore one in which to each morphism is attached an element of a given monoid (resp. group), its grade. This must be compatible with composition, in the sense that compositions have the product grade.

Definition

There are various different definitions of a graded category, up to the most abstract one given above. A more concrete definition of a graded Abelian category is as follows:[1]

Let ${\mathcal {C}}$ be an Abelian category and $\mathbb {G}$ a monoid. Let ${\mathcal {S}}=\{S_{g}:g\in G\}$ be a set of functors from ${\mathcal {C}}$ to itself. If

$S_{1}$ is the identity functor on ${\mathcal {C}}$ ,
$S_{g}S_{h}=S_{gh}$ for all $g,h\in \mathbb {G}$ and
$S_{g}$ is a full and faithful functor for every $g\in \mathbb {G}$

we say that $({\mathcal {C}},{\mathcal {S}})$ is a $\mathbb {G}$ -graded category.

References

Zhang, James J. (1 March 1996). "Twisted graded algebras and equivalences of graded categories" (PDF). Proceedings of the London Mathematical Society. s3-72 (2): 281–311. doi:10.1112/plms/s3-72.2.281. MR 1367080.

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[1] Zhang, James J. (1 March 1996). "Twisted graded algebras and equivalences of graded categories" (PDF). Proceedings of the London Mathematical Society. s3-72 (2): 281–311. doi:10.1112/plms/s3-72.2.281. MR 1367080.

Graded category

Definition

See also

References