Reduction modulo p of the Noether problem

Publikation: Arbeitspapier/PreprintPreprint

Autoren

  • Emiliano Ambrosi
  • Domenico Valloni

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OriginalspracheEnglisch
PublikationsstatusElektronisch veröffentlicht (E-Pub) - 8 Feb. 2023

Abstract

Let \(k\) be an algebraically closed field of characteristic \(p \geq 0\) and \(V\) be a faithful \(k\)-rational representation of a finite \(\ell\)-group \(G\), where \(\ell\) is a prime number. The Noether problem asks whether \(V/G\) is a stably rational variety. While if \(\ell=p\) it is well-known that \(V/G\) is always rational, when \(\ell\neq p\), Saltman and then Bogomolov constructed \(\ell\)-groups for which \(V/G\) is not stably rational. Hence, the geometry of \(V/G\) depends heavily on the characteristic of the field. We show that for all the groups \(G\) constructed by Saltman and Bogomolov, one cannot interpolate between the Noether problem in characteristic \(0\) and \(p\). More precisely, we show that it does not exist a complete valuation ring \(R\) of mixed characteristic \((0,p)\) and a smooth proper \(R\)-scheme \(X\rightarrow \mathrm{Spec}(R)\) whose special fiber and generic fiber are both stably birational to \(V/G\). The proof combines the integral \(p\)-adic Hodge theoretic results of Bhatt-Morrow-Scholze with the study of indefinitely closed differential forms in positive characteristic.

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Reduction modulo p of the Noether problem. / Ambrosi, Emiliano; Valloni, Domenico.
2023.

Publikation: Arbeitspapier/PreprintPreprint

Ambrosi, E & Valloni, D 2023 'Reduction modulo p of the Noether problem'.
Ambrosi, E., & Valloni, D. (2023). Reduction modulo p of the Noether problem. Vorabveröffentlichung online.
Ambrosi E, Valloni D. Reduction modulo p of the Noether problem. 2023 Feb 8. Epub 2023 Feb 8.
Ambrosi, Emiliano ; Valloni, Domenico. / Reduction modulo p of the Noether problem. 2023.
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N2 - Let \(k\) be an algebraically closed field of characteristic \(p \geq 0\) and \(V\) be a faithful \(k\)-rational representation of a finite \(\ell\)-group \(G\), where \(\ell\) is a prime number. The Noether problem asks whether \(V/G\) is a stably rational variety. While if \(\ell=p\) it is well-known that \(V/G\) is always rational, when \(\ell\neq p\), Saltman and then Bogomolov constructed \(\ell\)-groups for which \(V/G\) is not stably rational. Hence, the geometry of \(V/G\) depends heavily on the characteristic of the field. We show that for all the groups \(G\) constructed by Saltman and Bogomolov, one cannot interpolate between the Noether problem in characteristic \(0\) and \(p\). More precisely, we show that it does not exist a complete valuation ring \(R\) of mixed characteristic \((0,p)\) and a smooth proper \(R\)-scheme \(X\rightarrow \mathrm{Spec}(R)\) whose special fiber and generic fiber are both stably birational to \(V/G\). The proof combines the integral \(p\)-adic Hodge theoretic results of Bhatt-Morrow-Scholze with the study of indefinitely closed differential forms in positive characteristic.

AB - Let \(k\) be an algebraically closed field of characteristic \(p \geq 0\) and \(V\) be a faithful \(k\)-rational representation of a finite \(\ell\)-group \(G\), where \(\ell\) is a prime number. The Noether problem asks whether \(V/G\) is a stably rational variety. While if \(\ell=p\) it is well-known that \(V/G\) is always rational, when \(\ell\neq p\), Saltman and then Bogomolov constructed \(\ell\)-groups for which \(V/G\) is not stably rational. Hence, the geometry of \(V/G\) depends heavily on the characteristic of the field. We show that for all the groups \(G\) constructed by Saltman and Bogomolov, one cannot interpolate between the Noether problem in characteristic \(0\) and \(p\). More precisely, we show that it does not exist a complete valuation ring \(R\) of mixed characteristic \((0,p)\) and a smooth proper \(R\)-scheme \(X\rightarrow \mathrm{Spec}(R)\) whose special fiber and generic fiber are both stably birational to \(V/G\). The proof combines the integral \(p\)-adic Hodge theoretic results of Bhatt-Morrow-Scholze with the study of indefinitely closed differential forms in positive characteristic.

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