model structure on dg-categories


Model category theory

model category, model \infty -category



Universal constructions


Producing new model structures

Presentation of (,1)(\infty,1)-categories

Model structures

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for ∞-groupoids

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for rational \infty-groupoids

for rational equivariant \infty-groupoids

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for stable/spectrum objects

for (,1)(\infty,1)-categories

for stable (,1)(\infty,1)-categories

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The model structure on enriched categories gives in particular a model structure on dg-categories, called the Dwyer-Kan model structure, which is analogous to the usual model structure on sSet-categories which models (infinity,1)-categories.

There are interesting left Bousfield localizations of this model structure, called the quasi-equiconic and Morita model structures. Here the fibrant objects are the pretriangulated dg-categories, resp. idempotent complete pretriangulated dg-categories. In characteristic zero, the Morita model structure is known to present the (infinity,1)-category of linear stable (infinity,1)-categories (Cohn 13).


With Dwyer-Kan weak equivalences


Let kk be a commutative ring. Write dgCat kdgCat_k for the category of small dg-categories over kk.

There is the structure of a cofibrantly generated model category on dgCat kdgCat_k where a dg-functor F:ABF : A \to B is

  • a weak equivalence if

    1. for all objects x,yAx,y \in A the component F x,y:A(x,y)B(F(x),F(y))F_{x,y} : A(x,y) \to B(F(x), F(y)) is a quasi-isomorphism of chain complexes;

    2. the induced functor on homotopy categories H 0(F)H^0(F) (obtained by taking degree 0 chain homology in each hom-object) is an equivalence of categories.

  • a fibration if

    1. for all objects x,yAx,y \in A the component F x,yF_{x,y} is a degreewise surjection of chain complexes;

    2. for each isomorphism F(x)ZF(x) \to Z in H 0(B)H^0(B) there is a lift to an isomorphism in H 0(A)H^0(A).

This is due to (Tabuada).


The definition is entirely analogous to the model structure on sSet-categories. Both are special cases of the model structure on enriched categories.

With Morita equivalences

There is another model category structure with more weak equivalences, the Morita equivalences (Tabuada 05). This is in fact the left Bousfield localization of the above model structure with respect to the Morita equivalences, i.e. functors F:CDF: C \to D whose induced restriction of scalars functor Lf *:D(D)D(C)\mathbf Lf^* : \mathbf D(D) \to \mathbf D(C) is an equivalence of categories.

The fibrant objects with respect to this model structure are the dg-categories A for which the canonical inclusion H 0(A)D(A)H^0(A) \hookrightarrow \mathbf D(A) has its essential image stable under cones, suspensions, and direct sums. Hence the homotopy category with respect to this model structure is identified with the full subcategory of Ho(DGCat), the homotopy category of the Dwyer-Kan model structure, spanned by dg-categories of this form.

This model structure is a presentation of the (∞,1)-category of stable (∞,1)-categories (Cohn 13).

The pretriangulated envelope of Bondal-Kapranov is a fibrant replacement functor for the Morita model structure. The DG quotient? of Drinfeld is a model for the homotopy cofibre with respect to the Morita model structure.


The model structure on dg-categories is due to

It is reproduced as theorem 4.1 in

Discussion of internal homs of dg-categories in terms of refined Fourier-Mukai transforms is in

Discussion of internal homs of dg-categories using (just) the structure of a category of fibrant objects is in

The derived internal Hom in the homotopy category of DG-categories is equivalent to the dg-category of A_infty-functors.

A proof that the internal hom of Ho(DGCat) constructed by Toën is in fact the right derived functor of the internal hom of DGCat is in

There is also

The model structure with Morita equivalences as weak equivalences is discussed in

That the Morita model structure on dg-categories presents the homotopy theory of kk-linear stable (infinity,1)-categories was shown in

See also