Many classical problems in additive number theory are direct problems, in which one starts with a set A of natural numbers and Authors: Nathanson, Melvyn B. Additive number theory is in large part the study of bases of finite order. The classical bases are the Melvyn B. Nathanson. Springer Science & Business Media. Mathematics > Number Theory binary linear forms, and representation functions of additive bases for the integers and nonnegative integers. Subjects: Number Theory () From: Melvyn B. Nathanson [view email].
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Dispatched from the UK in 3 business days When will my order arrive? Home Contact Us Help Free delivery worldwide. Description [Hilbert’s] style has not the terseness of many of our modem authors in mathematics, which is based on the assumption that printer’s labor and paper are costly but the reader’s effort and time are not. Weyl  The purpose of this book is to describe the classical problems in additive number theory and to introduce the circle method and the sieve method, which are the basic analytical and combinatorial tools used to attack these problems.
Additive number theory – Wikipedia
This book is intended for students who theoryy to lel? Ill additive number theory, not for experts who already know it. For this reason, proofs include many “unnecessary” and “obvious” steps; this is by design. The archetypical theorem in additive number theory is due to Lagrange: Every nonnegative integer is the sum of four squares.
In general, the set A of nonnegative integers is called an additive basis of order h if every nahanson integer can be written as the sum of h not necessarily distinct elements of A.
Lagrange ‘s theorem is the statement that the squares are a basis of order four. The set A is called a basis offinite order if A is a basis of order h for some positive integer h. Additive number theory is in large part the study of bases of finite order. The classical bases are the squares, cubes, and higher powers; the polygonal numbers; and the prime numbers. The classical questions associated with these bases are Waring’s problem and the Goldbach conjecture.
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Additive number theory
Back cover copy The classical bases in additive number theory are the polygonal numbers, the squares, cubes, and higher powers, and the primes. This book contains many of the great theorems in this subject: Cauchy’s polygonal number theorem, Linnik’s theorem on sums of cubes, Hilbert’s proof of Waring’s problem, the Hardy-Littlewood asymptotic formula for the number of representations of an integer as the sum of positive kth powers, Shnirel’man’s theorem that every integer greater than one is the sum of a bounded number of primes, Vinogradov’s theorem on sums of three primes, and Chen’s theorem that every sufficiently large even integer is the sum of a prime and a number that is either prime or the product of two primes.
The book is also an introduction to the circle method and sieve methods, which are the principal tools used to study the classical bases. The only prerequisites for the book are undergraduate courses in number theory and analysis.
Additive number theory is one of the oldest and richest areas of mathematics. This book is the first comprehensive treatment of the subject in 40 years.
Table of contents I Waring’s problem. Review Text From the reviews: A novel feature of the book, and one that makes it very easy to read, naghanson that all the calculations are written out in full – there are no steps ‘left to the reader’. The book also includes a large number of exercises Review quote From the reviews: