Skip to content

Sieve Methods, Exponential Sums and Their Applications in Number Theory

Best in textbook rentals since 2012!

ISBN-10: 0521589576

ISBN-13: 9780521589574

Edition: 1997

Authors: G. R. H. Greaves, G. Harman, M. N. Huxley, N. J. Hitchin

Shipping box This item qualifies for FREE shipping.
Blue ribbon 30 day, 100% satisfaction guarantee!
what's this?
Rush Rewards U
Members Receive:
Carrot Coin icon
XP icon
You have reached 400 XP and carrot coins. That is the daily max!


This volume comprises the proceedings of the 1995 Cardiff symposium on sieve methods, exponential sums and their applications in number theory. Analytic number theory is covered by leading international contributors.
Customers also bought

Book details

Copyright year: 1997
Publisher: Cambridge University Press
Publication date: 1/30/1997
Binding: Paperback
Pages: 360
Size: 5.98" wide x 9.02" long x 0.79" tall
Weight: 1.166

Gilbert Harman is Stuart Professor of Philosophy at Princeton University and the author of Explaining Value and Other Essays in Moral Philosophy and Reasoning, Meaning, and Mind.

The exceptional set for Goldbach�s problem in short intervals
On an additive property of stable sets
Squarefree values of polynomials and the abc-conjecture
The values of binary linear forms at prime arguments
Some applications of sieves of dimension exceeding 1
Representations by the determinant and mean values of L-functions
On Montgomery-Hooley asymptotic formula
Franel integrals
Eratosthenes, Legendre, Vinogradov and beyond
On hypothesis K* in Waring�s problem
Moments of differences between square-free numbers
On the ternary additive problem and the sixth moment of the zeta-function
A variant of the circle method
The resemblance of the behaviour of the remainder terms Es(t), D1-2s(x) and R(s+it)
A note on the number of divisors of quadratic polynomials
On the distribution of integer points in the real locus of an affine toric variety
An asymptotic expansion of the square of the Riemann zeta-function
The mean square of Dedekind zeta-functions of quadratic number fields
Artin�s conjecture and elliptic analogues