Introduction to Modular Forms

I. Classical Theory.- I. Modular Forms.-
1. The Modular Group.-
2. Modular Forms.-
3. The Modular Function j.-
4. Estimates for Cusp Forms.-
5. The Mellin Transform.- II. Hecke Operators.-
1. Definitions and Basic Relations.-
2. Euler Products.- III. Petersson Scalar Product.-
1. The Riemann Surface ??.-
2. Congruence Subgroups.-
3. Differential Forms and Modular Forms.-
4. The Petersson Scalar Product.- Appendix by D. Zagier. The Eichler-Selberg Trace Formula on SL2(Z).- II. Periods of Cusp Forms.- IV. Modular Symbols.-
1. Basic Properties.-
2. The Manin-Drinfeld Theorem.-
3. Hecke Operators and Distributions.- V. Coefficients and Periods of Cusp Forms on SL2(Z).-
1. The Periods and Their Integral Relations.-
2. The Manin Relations.-
3. Action of the Hecke Operators on the Periods.-
4. The Homogeneity Theorem.- VI. The Eichler-Shimura Isomorphism on SL2(Z).-
1. The Polynomial Representation.-
2. The Shimura Product on Differential Forms.-
3. The Image of the Period Mapping.-
4. Computation of Dimensions.-
5. The Map into Cohomology.- III. Modular Forms for Congruence Subgroups.- VII. Higher Levels.-
1. The Modular Set and Modular Forms.-
2. Hecke Operators.-
3. Hecke Operators on q-Expansions.-
4. The Matrix Operation.-
5. Petersson Product.-
6. The Involution.- VIII. Atkin-Lehner Theory.-
1. Changing Levels.-
2. Characterization of Primitive Forms.-
3. The Structure Theorem.-
4. Proof of the Main Theorem.- IX. The Dedekind Formalism.-
1. The Transformation Formalism.-
2. Evaluation of the Dedekind Symbol.- IV. Congruence Properties and Galois Representations.- X. Congruences and Reduction mod p.-
1. Kummer Congruences.-
2. Von Staudt Congruences.-
3. q-Expansions.-
4. Modular Forms over Z[1/2, 1/3].-
5. Derivatives of Modular Forms.-
6. Reduction mod p.-
7. Modular Forms mod p, p?5.-
8. The Operation of ? on M?.- XI. Galois Representations.-
1. Simplicity.-
2. Subgroups of GL2.-
3. Applications to Congruences of the