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The Hardy-Littlewood Method [Hardcover]

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  • Category: Books (Mathematics)
  • Author:  Vaughan, R. C.
  • Author:  Vaughan, R. C.
  • ISBN-10:  0521573475
  • ISBN-10:  0521573475
  • ISBN-13:  9780521573474
  • ISBN-13:  9780521573474
  • Publisher:  Cambridge University Press
  • Publisher:  Cambridge University Press
  • Pages:  248
  • Pages:  248
  • Binding:  Hardcover
  • Binding:  Hardcover
  • Pub Date:  01-May-1997
  • Pub Date:  01-May-1997
  • SKU:  0521573475-11-MPOD
  • SKU:  0521573475-11-MPOD
  • Item ID: 100909227
  • Seller: ShopSpell
  • Ships in: 2 business days
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  • Delivery by: Jul 09 to Jul 11
  • Notes: Brand New Book. Order Now.
This second edition covers recent developments on Hardy-Littlewood method.This introduction to the HardySHLittlewood method deals with its classical forms and outlines some of the more recent developments. Now in its second edition it has been fully updated, and covers recent developments in detail. The reader is expected to be familiar with elementary number theory and postgraduate students working in this area should find it of great use as an advanced textbook. It will also be indispensible to all lecturers and research workers interested in number theory and is the standard reference on the HardySHLittlewood method.This introduction to the HardySHLittlewood method deals with its classical forms and outlines some of the more recent developments. Now in its second edition it has been fully updated, and covers recent developments in detail. The reader is expected to be familiar with elementary number theory and postgraduate students working in this area should find it of great use as an advanced textbook. It will also be indispensible to all lecturers and research workers interested in number theory and is the standard reference on the HardySHLittlewood method.The Hardy-Littlewood method is a means of estimating the number of integer solutions of equations and was first applied to Waring's problem on representations of integers by sums of powers. This introduction to the method deals with its classical forms and outlines some of the more recent developments. Now in its second edition it has been fully updated; the author has made extensive revisions and added a new chapter to take account of major advances by Vaughan and Wooley. The reader is expected to be familiar with elementary number theory and postgraduate students should find it of great use as an advanced textbook. It will also be indispensable to all lecturers and research workers interested in number theory.1. Introduction and historical background; 2. The simplest upper bound for G(k); 3. Goldbach's probl.
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