On integral local Shimura varieties

Abstract

We give a construction of "integral local Shimura varieties" which are formal schemes that generalize the well-known integral models of the Drinfeld p-adic upper half spaces. The construction applies to all classical groups, at least for odd p. These formal schemes also generalize the formal schemes defined by Rapoport-Zink via moduli of p-divisible groups, and are characterized purely in group-theoretic terms. More precisely, for a local p-adic Shimura datum (G, b, μ) and a quasi-parahoric group scheme G for G, Scholze has defined a functor on perfectoid spaces which parametrizes p-adic shtukas. He conjectured that this functor is representable by a normal formal scheme which is locally formally of finite type and flat over O E. Scholze-Weinstein proved this conjecture when (G, b, μ) is of (P)EL type by using Rapoport-Zink formal schemes. We prove this conjecture for any (G, μ) of abelian type when p≠ 2, and when p=2 and G is of type A or C. We also relate the generic fiber of this formal scheme to the local Shimura variety, a rigid-analytic space attached by Scholze to (G, b, μ, G).