Exact sequences of rt-categories

Abstract

Our aim is to consider what the exact sequence for rt-categories is. For this, we introduce the notion of exact sequence of rt-categories, modeled on exact sequences of finite tensor categories. Our central result explores the relationship of exactness at different levels. Specifically, let H1fH2gH3 be a sequence of finite-dimensional Hopf algebras. We prove that H1fH2gH3 is strictly exact if and only if H1-comodf*H2-comod g*H3-comod is an exact sequence of finite tensor categories and g* admits an exact left adjoint, if and only if DbH1-comod(H2-comod) Db(H2-comod) Db(H3-comod) is an exact sequence of rt-categories and f* is fully faithful.

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