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arxiv: 2412.19625 · v1 · pith:OIYJBGMOnew · submitted 2024-12-27 · 🧮 math.RT · math.AC· math.CT· math.RA

Reflexive modules and Auslander-type conditions

classification 🧮 math.RT math.ACmath.CTmath.RA
keywords lambdacategorymodulesreflexiveauslander-typemathopmathrmquasi-abelian
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We study the category $\mathop{\mathrm{ref}}\Lambda$ of reflexive modules over a two-sided Noetherian ring $\Lambda$. We show that the category $\mathop{\mathrm{ref}}\Lambda$ is quasi-abelian if and only if $\Lambda$ satisfies certain Auslander-type condition on the minimal injective resolution of the ring itself. Furthermore, we establish a Morita theorem which characterizes the category of reflexive modules among quasi-abelian categories in terms of generator-cogenerators.

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  1. Spherical modules and the Auslander--Gorenstein condition for Auslander--Yoneda algebras

    math.RT 2026-06 unverdicted novelty 6.0

    Introduces spherical algebras (all indecomposables spherical) and proves the Auslander-Yoneda algebra is Auslander-Gorenstein iff all indecomposables are spherical, with characterizations via split torsion pairs, dire...