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Type: Article
Nash blowups in prime characteristic
Abstract:
We initiate the study of Nash blowups in prime characteristic. First, we show that a normal variety is non-singular if and only if its Nash blowup is an isomorphism, extending a theorem by A. Nobile. We also study higher Nash blowups, as defined by T. Yasuda. Specifically, we give a characteristic-free proof of a higher version of Nobile’s theorem for quotient varieties and hypersurfaces. We also prove a weaker version for F-pure varieties.
We initiate the study of Nash blowups in prime characteristic. First, we show that a normal variety is non-singular if and only if its Nash blowup is an isomorphism, extending a theorem by A. Nobile. We also study higher Nash blowups, as defined by T. Yasuda. Specifically, we give a characteristic-free proof of a higher version of Nobile’s theorem for quotient varieties and hypersurfaces. We also prove a weaker version for F-pure varieties.
Keywords: Algebraic geometry||Birational geometry||Global theory and resolution of singularities (algebro-geometric aspects)
MSC: 14E15 (14E18 14G17 16S32)
Journal: Revista Matemática Iberoamericana
ISSN: 2235-0616
Year: 2022
Volume: 38
Number: 1
Pages: 257-267
Created: 2025-05-02 11:50:05
Modified: 2025-05-02 11:50:46
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