Differential graded category

In mathematics, especially homological algebra, a differential graded category or DG category for short, is a category whose morphism sets are endowed with the additional structure of a differential graded Z-module.

In detail, this means that Hom(A,B), the morphisms from any object A to another object B of the category is a direct sum \oplus_{n \in \mathbf Z}Hom_n(A,B) and there is a differential d on this graded group, i.e. for all n a linear map d: Hom_n(A,B) \rightarrow Hom_{n+1}(A,B), which has to satisfy d \circ d = 0. This is equivalent to saying that Hom(A,B) is a cochain complex. Furthermore, the composition of morphisms Hom(A,B) \otimes Hom(B,C) \rightarrow Hom(A,C) is required to be a map of complexes, and for all objects A of the category, one requires d(id_A) = 0.

See also

Examples

Further properties

The category of small dg-categories can be endowed with a model category structure such that weak equivalences are those functors that induce an equivalence of derived categories.[1]

Given a dg-category C over some ring R, there is a notion of smoothness and properness of C that reduces to the usual notions of smooth and proper morphisms in case C is the category of quasi-coherent sheaves on some scheme X over R.

References

  1. Tabuada, Gonçalo (2005), "Invariants additifs de DG-catégories", International Mathematics Research Notices (53): 3309–3339, doi:10.1155/IMRN.2005.3309, ISSN 1073-7928

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