(Contravariant) Koszul duality for DG algebras
Abstract
A DG algebras A over a field k with H(A) connected and H<0(A)=0 has a unique up to isomorphism DG module K with H(K) k. It is proved that if H(A) is degreewise finite, then RHomA(?,K): Ddf+(A)op Ddf+(RHomA(K,K)) is an exact equivalence of derived categories of DG modules with degreewise finite-dimensional homology. It induces an equivalences of Ddfb(A)op and the category of perfect DG RHomA(K,K)-modules, and vice-versa. Corresponding statements are proved also when H(A) is simply connected and H<0(A)=0.
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