Math 587: Introduction to Analytic Number Theory.
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Contents
Catalog Information
Title
Introduction to Analytic Number Theory.
Credit Hours
(3:3:0)
Offered
F
Prerequisite
(Math 352) or equivalent; instructor's consent.
Description
Arithmetical functions; distribution of primes; Dirichlet characters; Dirichlet's theorem; Gauss sums; primitive roots; Dirichlet L-functions; Riemann zeta-function; prime number theorem; partitions.
Desired Learning Outcomes
Students should gain a familiarity with the problems and tools of analytic number theory at beginning graduate level.
Prerequisites
A knowledge of complex analysis at the level of a first course such as Math 352 should suffice.
Minimal learning outcomes
Students should be familiar with the following concepts. They should know the technical terms, and be able to implement the methods taught in the course to work associated problems, including proving simple results.
- Arithmetic functions
- convolution of arithmetic functions
- Möobius inversion
- Elementary theorems on distribution of prime numbers