An Introduction to Non-Abelian Class Field Theory
Automorphic Forms of Weight 1 and 2-Dimensional Galois Representations
Nonfiction, Science & Nature, Mathematics, Arithmetic, Number Theory
| Author: | Toyokazu Hiramatsu, Seiken Saito | ISBN: | 9789813142282 |
| Publisher: | World Scientific Publishing Company | Publication: | September 13, 2016 |
| Imprint: | WSPC | Language: | English |
| Author: | Toyokazu Hiramatsu, Seiken Saito |
| ISBN: | 9789813142282 |
| Publisher: | World Scientific Publishing Company |
| Publication: | September 13, 2016 |
| Imprint: | WSPC |
| Language: | English |
This monograph provides a brief exposition of automorphic forms of weight 1 and their applications to arithmetic, especially to Galois representations. One of the outstanding problems in arithmetic is a generalization of class field theory to non-abelian Galois extension of number fields. In this volume, we discuss some relations between this problem and cusp forms of weight 1.
Contents:
-
Part I:
- Higher Reciprocity Laws
- Hilbert Class Fields over Imaginary Quadratic Fields
- Indefinite Modular Forms
- Dimension Formulas in the Case of Weight 1
-
Part II:
- 2-Dimensional Galois Representations of Odd Type and Non-Dihedral Cusp Forms of Weight 1
- Maass Cusp Forms of Eigenvalue 1/4
- Selberg's Eigenvalue Conjecture and the Ramanujan–Petersson Conjecture
- Indefinite Theta Series
- Hilbert Modular Forms of Weight 1
- Appendix: Some Dimension Formula and Traces of Hecke Operators for Cusp Forms of Weight 1 — Göttingen talk, 1989. By Toyokazu Hiramatsu
Readership: Advanced undergraduate and graduate students, and researchers in number theory.
Key Features:
- The monograph provides a comprehensive overview of the author's works which include new contributions, such as dimension formulas in the case of weight 1 forms, some relations between higher reciprocity laws of non-abelian polynomials and Langlands' reciprocity laws
This monograph provides a brief exposition of automorphic forms of weight 1 and their applications to arithmetic, especially to Galois representations. One of the outstanding problems in arithmetic is a generalization of class field theory to non-abelian Galois extension of number fields. In this volume, we discuss some relations between this problem and cusp forms of weight 1.
Contents:
-
Part I:
- Higher Reciprocity Laws
- Hilbert Class Fields over Imaginary Quadratic Fields
- Indefinite Modular Forms
- Dimension Formulas in the Case of Weight 1
-
Part II:
- 2-Dimensional Galois Representations of Odd Type and Non-Dihedral Cusp Forms of Weight 1
- Maass Cusp Forms of Eigenvalue 1/4
- Selberg's Eigenvalue Conjecture and the Ramanujan–Petersson Conjecture
- Indefinite Theta Series
- Hilbert Modular Forms of Weight 1
- Appendix: Some Dimension Formula and Traces of Hecke Operators for Cusp Forms of Weight 1 — Göttingen talk, 1989. By Toyokazu Hiramatsu
Readership: Advanced undergraduate and graduate students, and researchers in number theory.
Key Features:
- The monograph provides a comprehensive overview of the author's works which include new contributions, such as dimension formulas in the case of weight 1 forms, some relations between higher reciprocity laws of non-abelian polynomials and Langlands' reciprocity laws
