Serre–Tate theorem
From HandWiki
In algebraic geometry, the Serre–Tate theorem says that an abelian scheme and its p-divisible group have the same infinitesimal deformation theory. This was first proved by Jean-Pierre Serre when the reduction of the abelian variety is ordinary, using the Greenberg functor; then John Tate gave a proof in the general case by a different method. Their proofs were not published, but they were summarized in the notes of the Lubin–Serre–Tate seminar (Woods Hole, 1964). Other proofs were published by Messing (1962) and Drinfeld (1976).
References
- Colmez, Pierre; Serre, Jean-Pierre, Correspondance Serre–Tate, SMF 2015 : see, vol.2, p. 854, comments on Tate's letter from Jan.10, 1964.
- Katz, Nicholas (1981). Giraud, Jean; Illusie, Luc; Raynaud, Michel. eds. "Serre-Tate Local Moduli" (in fr). Surfaces Algébriques. Lecture Notes in Mathematics (Berlin, Heidelberg: Springer) 868: 138–202. doi:10.1007/BFb0090648. ISBN 978-3-540-38742-8. https://link.springer.com/chapter/10.1007/BFb0090648.
Original source: https://en.wikipedia.org/wiki/Serre–Tate theorem.
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