Dimensions of group schemes of automorphisms of truncated Barsotti--Tate groups

Abstract

Let D be a p-divisible group over an algebraically closed field k of characteristic p>0. Let nD be the smallest non-negative integer such that D is determined by D[pnD] within the class of p-divisible groups over k of the same codimension c and dimension d as D. We study nD, lifts of D[pm] to truncated Barsotti--Tate groups of level m+1 over k, and the numbers γD(i):=(Aut(D[pi])). We show that nD cd, (γD(i+1)-γD(i))i∈ N is a decreasing sequence in N, for cd>0 we have γD(1)<γD(2)<...<γD(nD), and for m∈\1,...,nD-1\ there exists an infinite set of truncated Barsotti--Tate groups of level m+1 which are pairwise non-isomorphic and lift D[pm]. Different generalizations to p-divisible groups with a smooth integral group scheme in the crystalline context are also proved.