Minimal semiinjective resolutions in the Q-shaped derived category

Abstract

Injective resolutions of modules are key objects of homological algebra, which are used for the computation of derived functors. Semiinjective resolutions of chain complexes are more general objects, which are used for the computation of Hom spaces in the derived category D( A ) of a ring A. Minimal semiinjective resolutions have the additional property of being unique. The Q-shaped derived category DQ( A ) consists of Q-shaped diagrams for a suitable preadditive category Q, and it generalises D( A ). Some special cases of DQ( A ) are the derived categories of differential modules, m-periodic chain complexes, and N-complexes, and there are many other possibilities. The category DQ( A ) shares some key properties of D( A ); for instance, it is triangulated and compactly generated. This paper establishes a theory of minimal semiinjective resolutions in DQ( A ). As a sample application, it generalises a theorem by Ringel--Zhang on differential modules.

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