Additive Theory of Prime Numbers
Time: the third semester
Course Classification: elective course
Credit: 3 hours
Period: 54 hours
Previous courses: Complex Analysis, Basic Analytic Number Theory
Syllabus:
(1) The Riemann zeta-function and Dirichlet L-functions
(2) Sums of two squares, and sums of two squares of primes
(3) Exponential sums over primes: elementary method
(4) The circle method in the Warning-Goldbach problem
(5) The large sieve
(6) The major arcs, I
(7) Exponential sums over primes: analytic method, I
(8) Sums of squares of primes
(9) The major arcs, I
(10) Introduction to sieve methods
(11) Exponential sums over primes: analytic method, II
(12) Mean-value theorems for exponential sums
(13) Sums of cubes of primes
(14) Sums of forth powers of primes
(15) Sums of fifth and seventh powers of primes
References:
(1) J. Y. Liu and T. Zhan, New development in the Additive theory of Prime Numbers, World Scientific Press, 2011.
(2) L. K. Hua, Additive Theory of Prime Numbers, American Mathematical Society, 2009.
(3) R. C. Vaughan, The Hardy-Littlewood Method, Cambridge University Press.
