bokomslag Diophantine Equations and Inequalities in Algebraic Number Fields
Vetenskap & teknik

Diophantine Equations and Inequalities in Algebraic Number Fields

Yuan Wang

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  • 170 sidor
  • 2012
The circle method has its genesis in a paper of Hardy and Ramanujan (see [Hardy 1])in 1918concernedwiththepartitionfunction andtheproblemofrep- resenting numbers as sums ofsquares. Later, in a series of papers beginning in 1920entitled "some problems of'partitio numerorum", Hardy and Littlewood (see [Hardy 1]) created and developed systematically a new analytic method, the circle method in additive number theory. The most famous problems in ad- ditive number theory, namely Waring's problem and Goldbach's problem, are treated in their papers. The circle method is also called the Hardy-Littlewood method. Waring's problem may be described as follows: For every integer k 2 2, there is a number s= s( k) such that every positive integer N is representable as (1) where Xi arenon-negative integers. This assertion wasfirst proved by Hilbert [1] in 1909. Using their powerful circle method, Hardy and Littlewood obtained a deeper result on Waring's problem. They established an asymptotic formula for rs(N), the number of representations of N in the form (1), namely k 1 provided that 8 2 (k - 2)2 - +5. Here
  • Författare: Yuan Wang
  • Format: Pocket/Paperback
  • ISBN: 9783642634895
  • Språk: Engelska
  • Antal sidor: 170
  • Utgivningsdatum: 2012-10-18
  • Förlag: Springer-Verlag Berlin and Heidelberg GmbH & Co. K