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Berkeley Lectures on p-adic Geometry(AMS-207)$
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Peter Scholze and Jared Weinstein

Print publication date: 2020

Print ISBN-13: 9780691202082

Published to Princeton Scholarship Online: January 2021

DOI: 10.23943/princeton/9780691202082.001.0001

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Introduction

Introduction

Chapter:
(p.1) Lecture 1 Introduction
Source:
(p.iii) Berkeley Lectures on p-adic Geometry
Author(s):

Peter Scholze

Jared Weinstein

Publisher:
Princeton University Press
DOI:10.23943/princeton/9780691202082.003.0001

This introductory chapter provides an overview of Drinfeld's work on the global Langlands correspondence over function fields. Whereas the global Langlands correspondence is largely open in the case of number fields K, it is a theorem for function fields, due to Drinfeld and L. Lafforgue. The key innovation in this case is Drinfeld's notion of an X-shtuka (or simply shtuka). The Langlands correspondence for X is obtained by studying moduli spaces of shtukas. A large part of this course is about the definition of perfectoid spaces and diamonds. There is an important special case where the moduli spaces of shtukas are classical rigid-analytic spaces. This is the case of local Shimura varieties. Some examples of these are the Rapoport-Zink spaces.

Keywords:   Langlands correspondence, function fields, shtukas, moduli spaces, perfectoid spaces, perfectoid diamonds, local Shimura varieties, Rapoport-Zink spaces

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