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arxiv: 2301.04262 · v5 · pith:VK2IGMY4new · submitted 2023-01-11 · 🧮 math.AG

Rational singularities and q-birational morphism

classification 🧮 math.AG
keywords notionrationalsingularitiesbirationalprovedefinitiondualfacts
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In this paper, we generalize the notion of rational singularities for any reflexive sheaf of rank $1$, link our notion of rational singularities with the notion of rational singularities in [Kov11], and prove generalizations of standard facts about rational singularities. Moreover, by using a definition of non-rational locus, we introduce the notion of $(B_{q+1})$ as a dual notion of well-known Serre's notion of $(S_{q+1})$, and prove a theorem about $q$-birational morphisms.

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