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Type: Article
Nash blowups of 2-generic determinantal varieties in positive characteristic
Abstract:
We show that the Nash blowup of 2-generic determinantal varieties over fields of positive characteristic is non-singular. We prove this in two steps. Firstly, we explicitly describe the toric structure of such varieties. Secondly, we show that in this case the combinatorics of Nash blowups are free of characteristic. The result then follows from the analogous result in characteristic zero proved by W. Ebeling and S. M. Gusein-Zade.
We show that the Nash blowup of 2-generic determinantal varieties over fields of positive characteristic is non-singular. We prove this in two steps. Firstly, we explicitly describe the toric structure of such varieties. Secondly, we show that in this case the combinatorics of Nash blowups are free of characteristic. The result then follows from the analogous result in characteristic zero proved by W. Ebeling and S. M. Gusein-Zade.
Keywords: Nash blowup||Generic determinantal variety||Toric variety||Positive characteristic fields
MSC: 14E15 14M12 14M25
Journal: Pure and Applied Mathematics Quarterly
ISSN: 1558-8602
Year: 2025
Volume: 21
Number: 4
Pages: 1557-1575
MR Number: 4886028
Revision: 1
Created: 2025-05-02 12:40:03
Modified: 2025-07-31 12:29:25
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