Modular Forms (MAGIC049) |
GeneralDescription
Modular forms (and automorphic forms/representations) play an increasingly
central role in modern number theory, but also in other branches of mathematics
and even in physics. This course gives an introduction to the subject.
Here is a sample of topics we plan to cover:
Prerequisites: Good command of complex analysis and algebra. Occasionally, some knowledge of algebraic number theory and Riemann surface theory would be helpful. SemesterAutumn 2020 (Monday, October 5 to Friday, December 11) Hours
Timetable
PrerequisitesGood command of complex analysis and algebra. Occasionally,
some knowledge of algebraic number theory and Riemann surface theory would be
helpful.
Syllabus(1) Modular curves, also as Riemann surfaces and as moduli space of elliptic curves (over C) (2) Modular functions and forms, basic properties, Eisenstein series, eta-function (3) Theta series, arithmetic applications (4) Modular forms and Dirichlet series, functional equation (5) Hecke operators, Petersson scalar product Bibliography
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