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Serre–Tate theory for Calabi–Yau varieties.

Authors :
Achinger, Piotr
Zdanowicz, Maciej
Source :
Journal für die Reine und Angewandte Mathematik. Nov2021, Vol. 2021 Issue 780, p139-196. 58p.
Publication Year :
2021

Abstract

Classical Serre–Tate theory describes deformations of ordinary abelian varieties. It implies that every such variety has a canonical lift to characteristic zero and equips the base of its universal deformation with a Frobenius lifting and canonical multiplicative coordinates. A variant of this theory has been obtained for ordinary K3 surfaces by Nygaard and Ogus. In this paper, we construct canonical liftings modulo p 2 {p^{2}} of varieties with trivial canonical class which are ordinary in the weak sense that the Frobenius acts bijectively on the top cohomology of the structure sheaf. Consequently, we obtain a Frobenius lifting on the moduli space of such varieties. The quite explicit construction uses Frobenius splittings and a relative version of Witt vectors of length two. If the variety has unobstructed deformations and bijective first higher Hasse–Witt operation, the Frobenius lifting gives rise to canonical coordinates. One of the key features of our liftings is that the crystalline Frobenius preserves the Hodge filtration. We also extend Nygaard's approach from K3 surfaces to higher dimensions, and show that no non-trivial families of such varieties exist over simply connected bases with no global one-forms. [ABSTRACT FROM AUTHOR]

Details

Language :
English
ISSN :
00754102
Volume :
2021
Issue :
780
Database :
Academic Search Index
Journal :
Journal für die Reine und Angewandte Mathematik
Publication Type :
Academic Journal
Accession number :
153419039
Full Text :
https://doi.org/10.1515/crelle-2021-0041