G-displays of Hodge type and formal p-divisible groups

Abstract

Let G be a reductive group scheme over the p-adic integers, and let μ be a minuscule cocharacter for G. In the Hodge-type case, we construct a functor from nilpotent (G,μ)-displays over p-nilpotent rings R to formal p-divisible groups over R equipped with crystalline Tate tensors. When R/pR has a p-basis \'etale locally, we show that this defines an equivalence between the two categories. The definition of the functor relies on the construction of a G-crystal associated with any adjoint nilpotent (G,μ)-display, which extends the construction of the Dieudonn\'e crystal associated with a nilpotent Zink display. As an application, we obtain an explicit comparison between the Rapoport-Zink functors of Hodge type defined by Kim and by B\"ultel and Pappas.