Marc-Hubert Nicole, Adrian Vasiu
Published 2006-06-30, updated 2007-07-06Version 2
Let k be an algebraically closed field of characteristic p>0. Let H be a supersingular p-divisible group over k of height 2d. We show that H is uniquely determined up to isomorphism by its truncation of level d (i.e., by H[p^d]). This proves Traverso's truncation conjecture for supersingular p-divisible groups. If H has a principal quasi-polarization \lambda, we show that (H,\lambda) is also uniquely determined up to isomorphism by its principally quasi-polarized truncated Barsotti--Tate group of level d (i.e., by (H[p^d],\lambda[p^d])).
Comments: 9 pages, LaTex; to appear in Indiana Univ. Math. J
Journal: Indiana Univ. Math. J. {\bf 56} (2007), no. 6, pp. 2887-2897
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