Modular Forms and Special Cycles on Shimura Curves. (AM-161) / / Stephen S. Kudla, Tonghai Yang, Michael Rapoport.
Modular Forms and Special Cycles on Shimura Curves is a thorough study of the generating functions constructed from special cycles, both divisors and zero-cycles, on the arithmetic surface "M" attached to a Shimura curve "M" over the field of rational numbers. These generating fu...
Saved in:
| Superior document: | Title is part of eBook package: De Gruyter Princeton Annals of Mathematics eBook-Package 1940-2020 |
|---|---|
| VerfasserIn: | |
| Place / Publishing House: | Princeton, NJ : : Princeton University Press, , [2006] ©2006 |
| Year of Publication: | 2006 |
| Edition: | Course Book |
| Language: | English |
| Series: | Annals of Mathematics Studies ;
161 |
| Online Access: | |
| Physical Description: | 1 online resource (392 p.) :; 1 line illus. 3 tables. |
| Tags: |
Add Tag
No Tags, Be the first to tag this record!
|
| Other title: | Frontmatter -- Contents -- Acknowledgments -- Chapter 1. Introduction -- Chapter 2. Arithmetic intersection theory on stacks -- Chapter 3. Cycles on Shimura curves -- Chapter 4. An arithmetic theta function -- Chapter 5. The central derivative of a genus two Eisenstein series -- Chapter 6. The generating function for 0-cycles -- Chapter 6 Appendix -- Chapter 7. An inner product formula -- Chapter 8. On the doubling integral -- Chapter 9. Central derivatives of L-functions -- Index |
|---|---|
| Summary: | Modular Forms and Special Cycles on Shimura Curves is a thorough study of the generating functions constructed from special cycles, both divisors and zero-cycles, on the arithmetic surface "M" attached to a Shimura curve "M" over the field of rational numbers. These generating functions are shown to be the q-expansions of modular forms and Siegel modular forms of genus two respectively, valued in the Gillet-Soulé arithmetic Chow groups of "M". The two types of generating functions are related via an arithmetic inner product formula. In addition, an analogue of the classical Siegel-Weil formula identifies the generating function for zero-cycles as the central derivative of a Siegel Eisenstein series. As an application, an arithmetic analogue of the Shimura-Waldspurger correspondence is constructed, carrying holomorphic cusp forms of weight 3/2 to classes in the Mordell-Weil group of "M". In certain cases, the nonvanishing of this correspondence is related to the central derivative of the standard L-function for a modular form of weight 2. These results depend on a novel mixture of modular forms and arithmetic geometry and should provide a paradigm for further investigations. The proofs involve a wide range of techniques, including arithmetic intersection theory, the arithmetic adjunction formula, representation densities of quadratic forms, deformation theory of p-divisible groups, p-adic uniformization, the Weil representation, the local and global theta correspondence, and the doubling integral representation of L-functions. |
| Format: | Mode of access: Internet via World Wide Web. |
| ISBN: | 9781400837168 9783110494914 9783110442502 |
| DOI: | 10.1515/9781400837168 |
| Access: | restricted access |
| Hierarchical level: | Monograph |
| Statement of Responsibility: | Stephen S. Kudla, Tonghai Yang, Michael Rapoport. |