Derived categories of N-complexes
Abstract
We study the homotopy category KN(B) of N-complexes of an additive category B and the derived category DN(A) of an abelian category A. First we show that both KN(B) and DN(A) have natural structures of triangulated categories. Then we establish a theory of projective (resp., injective) resolutions and derived functors. Finally, under some conditions of an abelian category A, we show that DN(A) is triangle equivalent to the ordinary derived category D(MorphN-2(A)) where MorphN-2(A) is the category of sequential N-2 morphisms of A.
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