BIBLIO is the largest independent book marketplace in the world, with over 100 million books.

Skip to content

Van Der Corput's Method of Exponential Sums

Van Der Corput's Method of Exponential Sums

Van Der Corput's Method of Exponential Sums
Stock photo: cover may vary

Van Der Corput's Method of Exponential Sums Papeback -

by G. Kolesnik S. W. Graham Grigori Kolesnik

Add to wish list
  • New
New

Description

Cambridge University Press CUP , pp. 132 . Papeback. New.
Ask the seller a question Add to wish list
A$197.90
A$5.82 Delivery within USA
Standard delivery: 9 to 14 days
More delivery options
Ships from Cold Books (New York, United States)

Details

  • Title Van Der Corput's Method of Exponential Sums
  • Author G. Kolesnik S. W. Graham Grigori Kolesnik
  • Binding Papeback
  • Condition New
  • Pages 132
  • Volumes 1
  • Language ENG
  • Publisher Cambridge University Press CUP
  • Publication date pp. 132
  • Features Bibliography, Index
  • Bookseller's Inventory # 6414457
  • ISBN 9780521339278 / 0521339278
  • Weight 0.45 lbs (0.20 kg)
  • Dimensions 9 x 6 x 0.31 in (22.86 x 15.24 x 0.79 cm)
  • Category Mathematics
  • Library of Congress subjects Exponential sums
  • Library of Congress Catalogue Number 91146734
  • Dewey Decimal Code 512.73
  • Quantity available 4

About Cold Books New York, United States

Biblio member since 2012

Terms of Sale: 30 day return guarantee, with full refund including shipping costs for up to 30 days after delivery if an item arrives misdescribed or damaged.

Browse books from Cold Books

Reader reviews for Van Der Corput's Method of Exponential Sums

From the publisher

This book is a self-contained account of the one- and two-dimensional van der Corput method and its use in estimating exponential sums. These arise in many problems in analytic number theory. It is the first cohesive account of much of this material and will be welcomed by graduates and professionals in analytic number theory. The authors show how the method can be applied to problems such as upper bounds for the Riemann-Zeta function. the Dirichlet divisor problem, the distribution of square free numbers, and the Piatetski-Shapiro prime number theorem.
tracking-