Relative Higher Homology and Representation Theory

Abstract

Higher homological algebra, basically done in the framework of an n-cluster tilting subcategory M of an abelian category A, has been the topic of several recent researches. In this paper, we study a relative version, in the sense of Auslander-Solberg, of the higher homological algebra. To this end, we consider an additive sub-bifunctor F of ExtnM( -,-) as the basis of our relative theory. This, in turn, specifies a collection of n-exact sequences in M, which allows us to delve into the relative higher homological algebra. Our results include a proof of the relative n-Auslander-Reiten duality formula, as well as an exploration of relative Grothendieck groups, among other results. As an application, we provide necessary and sufficient conditions for M to be of finite type.

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