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Search: MSC category 16D90 ( Module categories [See also 16Gxx, 16S90]; module theory in a category-theoretic context; Morita equivalence and duality )

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1. CJM 2014 (vol 67 pp. 28)

 Bounded Derived Categories of Infinite Quivers: Grothendieck Duality, Reflection Functor We study bounded derived categories of the category of representations of infinite quivers over a ring $R$. In case $R$ is a commutative noetherian ring with a dualising complex, we investigate an equivalence similar to Grothendieck duality for these categories, while a notion of dualising complex does not apply to them. The quivers we consider are left, resp. right, rooted quivers that are either noetherian or their opposite are noetherian. We also consider reflection functor and generalize a result of Happel to noetherian rings of finite global dimension, instead of fields. Keywords:derived category, Grothendieck duality, representation of quivers, reflection functorCategories:18E30, 16G20, 18E40, 16D90, 18A40

2. CJM 2006 (vol 58 pp. 180)

Reiten, Idun; Ringel, Claus Michael
 Infinite Dimensional Representations of Canonical Algebras The aim of this paper is to extend the structure theory for infinitely generated modules over tame hereditary algebras to the more general case of modules over concealed canonical algebras. Using tilting, we may assume that we deal with canonical algebras. The investigation is centered around the generic and the Pr\"{u}fer modules, and how other modules are determined by these modules. Categories:16D70, 16D90, 16G20, 16G60, 16G70
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