- Title Pages
- Foreword
-
Lecture 1 Introduction -
Lecture 2 Adic spaces -
Lecture 3 Adic spaces II -
Lecture 4 Examples of adic spaces -
Lecture 5 Complements on adic spaces -
Lecture 6 Perfectoid rings -
Lecture 7 Perfectoid spaces -
Lecture 8 Diamonds -
Lecture 9 Diamonds II -
Lecture 10 Diamonds associated with adic spaces -
Lecture 11 Mixed-characteristic shtukas -
Lecture 12 Shtukas with one leg -
Lecture 13 Shtukas with one leg II -
Lecture 14 Shtukas with one leg III -
Lecture 15 Examples of diamonds -
Lecture 16 Drinfeld’s lemma for diamonds -
Lecture 17 The v-topology -
Lecture 18 v-sheaves associated with perfect and formal schemes -
Lecture 19 The -affine Grassmannian -
Lecture 20 Families of affine Grassmannians -
Lecture 21 Affine flag varieties -
Lecture 22 Vector bundles and G-torsors on the relative Fargues-Fontaine curve -
Lecture 23 Moduli spaces of shtukas -
Lecture 24 Local Shimura varieties -
Lecture 25 Integral models of local Shimura varieties - Bibliography
- Index
Local Shimura varieties
Local Shimura varieties
- Chapter:
- (p.225) Lecture 24 Local Shimura varieties
- Source:
- Berkeley Lectures on p-adic Geometry
- Author(s):
Peter Scholze
Jared Weinstein
- Publisher:
- Princeton University Press
This chapter specializes the theory back to the case of local Shimura varieties, and explains the relation with Rapoport-Zink spaces. It begins with a local Shimura datum. A local Shimura datum is a triple (G, b, µ) consisting of a reductive group G over Qp, a conjugacy class µ of minuscule cocharacters. Rapoport-Zink spaces are moduli of deformations of a fixed p-divisible group. After reviewing these, the chapter shows that the diamond associated with the generic fiber of a Rapoport-Zink space is isomorphic to a moduli space of shtukas of the form with µ minuscule. It then extends the results to general EL and PEL data.
Keywords: local Shimura varieties, Rapoport-Zink spaces, local Shimura datum, minuscule cocharacters, p-divisible group, diamond, moduli space, shtukas, El data, PEL data
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- Title Pages
- Foreword
-
Lecture 1 Introduction -
Lecture 2 Adic spaces -
Lecture 3 Adic spaces II -
Lecture 4 Examples of adic spaces -
Lecture 5 Complements on adic spaces -
Lecture 6 Perfectoid rings -
Lecture 7 Perfectoid spaces -
Lecture 8 Diamonds -
Lecture 9 Diamonds II -
Lecture 10 Diamonds associated with adic spaces -
Lecture 11 Mixed-characteristic shtukas -
Lecture 12 Shtukas with one leg -
Lecture 13 Shtukas with one leg II -
Lecture 14 Shtukas with one leg III -
Lecture 15 Examples of diamonds -
Lecture 16 Drinfeld’s lemma for diamonds -
Lecture 17 The v-topology -
Lecture 18 v-sheaves associated with perfect and formal schemes -
Lecture 19 The -affine Grassmannian -
Lecture 20 Families of affine Grassmannians -
Lecture 21 Affine flag varieties -
Lecture 22 Vector bundles and G-torsors on the relative Fargues-Fontaine curve -
Lecture 23 Moduli spaces of shtukas -
Lecture 24 Local Shimura varieties -
Lecture 25 Integral models of local Shimura varieties - Bibliography
- Index
