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A model structure on the category of equivariant A-modules over a Hopf algebra
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Let H be a finite dimensional Hopf algebra over a field k and A an H-module algebra over k. Khovanov and Qi defined acyclic objects and quasi-isomorphisms by using null-homotopy and contractible objects. They also defined the cofibrant objects, the derived category of A#H-modules, and showed properties of compact generators. On the other hand, a model structure on the category of A#H-modules are not mentioned yet. In this paper, we check that the category of A#H-modules admits a model structure, where the cofibrant objects and the derived category are just those defined by Qi. We also show that the model structure is cofibrantly generated.
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Cited by 1 Pith paper
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Hopfological algebra, revisited
Authors develop an ∞-categorical approach to Hopfological algebra that refines Khovanov-Qi foundations and generalizes to arbitrary rigidly-compactly generated symmetric monoidal stable ∞-categories.
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