Drinfeld Moduli Schemes and Automorphic Forms

1. Front Matter

   Pages i-v

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2. Introduction

   • Yuval Z. Flicker

   Pages 1-8

3. Elliptic Moduli

   1. Front Matter

      Pages 9-9

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4. Elliptic moduli

   1. Elliptic Modules: Analytic Definition

      • Yuval Z. Flicker

      Pages 11-15

   2. Elliptic Modules: Algebraic Definition

      • Yuval Z. Flicker

      Pages 17-25

   3. Elliptic Modules: Geometric Definition

      • Yuval Z. Flicker

      Pages 27-36

   4. Covering Schemes

      • Yuval Z. Flicker

      Pages 37-42

5. Hecke Correspondences

   1. Front Matter

      Pages 43-43

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6. Hecke correspondences

   1. Deligne’s Conjecture and Congruence Relations

      • Yuval Z. Flicker

      Pages 45-63

7. Trace Formulae

   1. Front Matter

      Pages 65-65

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8. Trace formulae

   1. Isogeny Classes

      • Yuval Z. Flicker

      Pages 67-72

   2. Counting Points

      • Yuval Z. Flicker

      Pages 73-78

   3. Spherical Functions

      • Yuval Z. Flicker

      Pages 79-90

9. Higher Reciprocity Laws

   1. Front Matter

      Pages 91-91

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   2. Purity Theorem

      • Yuval Z. Flicker

      Pages 93-103

   3. Existence Theorem

      • Yuval Z. Flicker

      Pages 105-111

   4. Representations of a Weil Group

      • Yuval Z. Flicker

      Pages 113-137

   5. Simple Converse Theorem

      • Yuval Z. Flicker

      Pages 139-148

10. Back Matter

    Pages 149-154

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Drinfeld Moduli Schemes and Automorphic Forms: The Theory of Elliptic Modules with Applications is based on the author’s original work establishing the correspondence between ell-adic rank r Galois representations and automorphic representations of GL(r) over a function field, in the local case, and, in the global case, under a restriction at a single place. It develops Drinfeld’s theory of elliptic modules, their moduli schemes and covering schemes, the simple trace formula, the fixed point formula, as well as the congruence relations and a "simple" converse theorem, not yet published anywhere. This version, based on a recent course taught by the author at The Ohio State University, is updated with references to research that has extended and developed the original work. The use of the theory of elliptic modules in the present work makes it accessible to graduate students, and it will serve as a valuable resource to facilitate an entrance to this fascinating area of mathematics.

• Drinfield modules
• Galois representations
• Ramanujan conjecture
• cuspidal representations
• elliptic modules
• function fields

• , Department of Mathematics, The Ohio State University, Columbus, USA

  Yuval Z. Flicker

n/a

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