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Spring 2014 Mathematics W4007 section 001 ANALYTIC NUMBER THEORY | |

Call Number | 91146 |

Day & Time Location |
TR 11:40am-12:55pm 407 Mathematics Building |

Points | 3 |

Approvals Required | None |

Instructor | Dorian Goldfeld - e-mail, homepage |

Type | LECTURE |

Course Description | Prerequisites: Math V3007 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 | CourseWorks |

Department | Mathematics |

Enrollment | 5 students (35 max) as of 11:57PM Thursday, July 24, 2014 |

Final Exam Day/Time | May 15 R 4:10pm-7:00pm |

Final Location | 407 Mathematics Building |

Subject | Mathematics |

Number | W4007 |

Section | 001 |

Division | Interfaculty |

Open To | Columbia College, Engineering and Applied Science: Undergraduate, General Studies, School of Continuing Education, Global Programs, Graduate School of Arts and Science, School of the Arts, International and Public Affairs, Barnard, Engineering and Applied Science: Graduate |

Campus | Morningside |

Section key | 20141MATH4007W001 |

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