Breuil's classification of p-divisible groups over regular local rings of arbitrary dimension
Abstract
Let k be a perfect field of characteristic p ≥ 3. We classify p-divisible groups over regular local rings of the form W(k)[[t1,...,tr,u]]/(ue+pbe-1ue-1+...+pb1u+pb0), where b0,...,be-1∈ W(k)[[t1,...,tr]] and b0 is an invertible element. This classification was in the case r = 0 conjectured by Breuil and proved by Kisin.
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