Ebook: Number Theory: An Introduction to Mathematics: Part B
Author: William A. Coppel (auth.)
- Tags: Number Theory, Linear and Multilinear Algebras Matrix Theory, Special Functions
- Year: 2006
- Publisher: Springer US
- Language: English
- pdf
Undergraduate courses in mathematics are commonly of two types. On the one hand are courses in subjects—such as linear algebra or real analysis—with which it is considered that every student of mathematics should be acquainted. On the other hand are courses given by lecturers in their own areas of specialization, which are intended to serve as a preparation for research. But after taking courses of only these two types, students might not perceive the sometimes surprising interrelationships and analogies between different branches of mathematics, and students who do not go on to become professional mathematicians might never gain a clear understanding of the nature and extent of mathematics. The two-volume Number Theory: An Introduction to Mathematics attempts to provide such an understanding of the nature and extent of mathematics. It is a modern introduction to the theory of numbers, emphasizing its connections with other branches of mathematics. Part A, which should be accessible to a first-year undergraduate, deals with elementary number theory. Part B is more advanced than the first and should give the reader some idea of the scope of mathematics today. The connecting theme is the theory of numbers. By exploring its many connections with other branches, we may obtain a broad picture.
Audience
This book is intended for undergraduate students in mathematics and engineering.
Undergraduate courses in mathematics are commonly of two types. On the one hand are courses in subjects—such as linear algebra or real analysis—with which it is considered that every student of mathematics should be acquainted. On the other hand are courses given by lecturers in their own areas of specialization, which are intended to serve as a preparation for research. But after taking courses of only these two types, students might not perceive the sometimes surprising interrelationships and analogies between different branches of mathematics, and students who do not go on to become professional mathematicians might never gain a clear understanding of the nature and extent of mathematics. The two-volume Number Theory: An Introduction to Mathematics attempts to provide such an understanding of the nature and extent of mathematics. It is a modern introduction to the theory of numbers, emphasizing its connections with other branches of mathematics. Part A, which should be accessible to a first-year undergraduate, deals with elementary number theory. Part B is more advanced than the first and should give the reader some idea of the scope of mathematics today. The connecting theme is the theory of numbers. By exploring its many connections with other branches, we may obtain a broad picture.
Audience
This book is intended for undergraduate students in mathematics and engineering.
Undergraduate courses in mathematics are commonly of two types. On the one hand are courses in subjects—such as linear algebra or real analysis—with which it is considered that every student of mathematics should be acquainted. On the other hand are courses given by lecturers in their own areas of specialization, which are intended to serve as a preparation for research. But after taking courses of only these two types, students might not perceive the sometimes surprising interrelationships and analogies between different branches of mathematics, and students who do not go on to become professional mathematicians might never gain a clear understanding of the nature and extent of mathematics. The two-volume Number Theory: An Introduction to Mathematics attempts to provide such an understanding of the nature and extent of mathematics. It is a modern introduction to the theory of numbers, emphasizing its connections with other branches of mathematics. Part A, which should be accessible to a first-year undergraduate, deals with elementary number theory. Part B is more advanced than the first and should give the reader some idea of the scope of mathematics today. The connecting theme is the theory of numbers. By exploring its many connections with other branches, we may obtain a broad picture.
Audience
This book is intended for undergraduate students in mathematics and engineering.
Content:
Front Matter....Pages i-ix
The arithmetic of quadratic forms....Pages 341-383
The geometry of numbers....Pages 385-426
The number of prime numbers....Pages 427-464
A character study....Pages 465-518
Uniform distribution and ergodic theory....Pages 519-568
Elliptic functions....Pages 569-619
Connections with number theory....Pages 621-672
Back Matter....Pages 1-28
Undergraduate courses in mathematics are commonly of two types. On the one hand are courses in subjects—such as linear algebra or real analysis—with which it is considered that every student of mathematics should be acquainted. On the other hand are courses given by lecturers in their own areas of specialization, which are intended to serve as a preparation for research. But after taking courses of only these two types, students might not perceive the sometimes surprising interrelationships and analogies between different branches of mathematics, and students who do not go on to become professional mathematicians might never gain a clear understanding of the nature and extent of mathematics. The two-volume Number Theory: An Introduction to Mathematics attempts to provide such an understanding of the nature and extent of mathematics. It is a modern introduction to the theory of numbers, emphasizing its connections with other branches of mathematics. Part A, which should be accessible to a first-year undergraduate, deals with elementary number theory. Part B is more advanced than the first and should give the reader some idea of the scope of mathematics today. The connecting theme is the theory of numbers. By exploring its many connections with other branches, we may obtain a broad picture.
Audience
This book is intended for undergraduate students in mathematics and engineering.
Content:
Front Matter....Pages i-ix
The arithmetic of quadratic forms....Pages 341-383
The geometry of numbers....Pages 385-426
The number of prime numbers....Pages 427-464
A character study....Pages 465-518
Uniform distribution and ergodic theory....Pages 519-568
Elliptic functions....Pages 569-619
Connections with number theory....Pages 621-672
Back Matter....Pages 1-28
....