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On Enriques surfaces in characteristic \(p\). I. (English) Zbl 0575.14032

The author proves the basic results on Enriques surfaces in positive characteristic, well known in the classical case, including characteristic 2 where special phenomena occur. The main results are: the rank of the Néron-Severi group is 10, the surface admits an elliptic or quasi-elliptic pencil and it is, except when it is non-classical which is possible only in characteristic 2, birational to a sextic which is the specialization of a sextic passing doubly through the edges of a tetrahedron.
Reviewer: T.Ekedahl

MSC:

14J10 Families, moduli, classification: algebraic theory
14G15 Finite ground fields in algebraic geometry
14J25 Special surfaces
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