Call Number | 12361 |
---|---|
Day & Time Location |
TR 2:40pm-3:55pm 307 Mathematics Building |
Points | 3 |
Grading Mode | Standard |
Approvals Required | None |
Instructor | Dorian Goldfeld - e-mail, homepage |
Type | LECTURE |
Method of Instruction | In-Person |
Course Description | Prerequisites: MATH UN3007 A one semeser course covering the theory of modular forms, zeta functions, L -functions, and the Riemann hypothesis. Particular topics covered include the Riemann zeta function, the prime number theorem, Dirichlet characters, Dirichlet L-functions, Siegel zeros, prime number theorem for arithmetic progressions, SL (2, Z) and subgroups, quotients of the upper half-plane and cusps, modular forms, Fourier expansions of modular forms, Hecke operators, L-functions of modular forms. |
Web Site | Vergil |
Department | Mathematics |
Enrollment | 8 students (19 max) as of 2:06PM Sunday, December 8, 2024 |
Subject | Mathematics |
Number | GU4007 |
Section | 001 |
Division | Interfaculty |
Section key | 20241MATH4007W001 |