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Invitation to Number Theory

Author: Øystein Ore

Publisher:

Published: 1967

Total Pages: 152

ISBN-13:

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Discusses and gives examples of various number theories and how they function within the science of mathematics.

Invitation to Number Theory: Second Edition

Author: Oystein Ore

Publisher: American Mathematical Soc.

Published: 2017-12-29

Total Pages: 134

ISBN-13: 0883856530

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Number theory is the branch of mathematics concerned with the counting numbers, 1, 2, 3, … and their multiples and factors. Of particular importance are odd and even numbers, squares and cubes, and prime numbers. But in spite of their simplicity, you will meet a multitude of topics in this book: magic squares, cryptarithms, finding the day of the week for a given date, constructing regular polygons, pythagorean triples, and many more. In this revised edition, John Watkins and Robin Wilson have updated the text to bring it in line with contemporary developments. They have added new material on Fermat's Last Theorem, the role of computers in number theory, and the use of number theory in cryptography, and have made numerous minor changes in the presentation and layout of the text and the exercises.

Elementary Number Theory

Author: Charles Vanden Eynden

Publisher: Waveland Press

Published: 2006-02-15

Total Pages: 278

ISBN-13: 1478639156

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This practical and versatile text evolved from the author’s years of teaching experience and the input of his students. Vanden Eynden strives to alleviate the anxiety that many students experience when approaching any proof-oriented area of mathematics, including number theory. His informal yet straightforward writing style explains the ideas behind the process of proof construction, showing that mathematicians develop theorems and proofs from trial and error and evolutionary improvement, not spontaneous insight. Furthermore, the book includes more computational problems than most other number theory texts to build students’ familiarity and confidence with the theory behind the material. The author has devised the content, organization, and writing style so that information is accessible, students can gain self-confidence with respect to mathematics, and the book can be used in a wide range of courses—from those that emphasize history and type A problems to those that are proof oriented.

An Invitation to Modern Number Theory

Author: Steven J. Miller

Publisher: Princeton University Press

Published: 2020-08-04

Total Pages:

ISBN-13: 0691215979

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In a manner accessible to beginning undergraduates, An Invitation to Modern Number Theory introduces many of the central problems, conjectures, results, and techniques of the field, such as the Riemann Hypothesis, Roth's Theorem, the Circle Method, and Random Matrix Theory. Showing how experiments are used to test conjectures and prove theorems, the book allows students to do original work on such problems, often using little more than calculus (though there are numerous remarks for those with deeper backgrounds). It shows students what number theory theorems are used for and what led to them and suggests problems for further research. Steven Miller and Ramin Takloo-Bighash introduce the problems and the computational skills required to numerically investigate them, providing background material (from probability to statistics to Fourier analysis) whenever necessary. They guide students through a variety of problems, ranging from basic number theory, cryptography, and Goldbach's Problem, to the algebraic structures of numbers and continued fractions, showing connections between these subjects and encouraging students to study them further. In addition, this is the first undergraduate book to explore Random Matrix Theory, which has recently become a powerful tool for predicting answers in number theory. Providing exercises, references to the background literature, and Web links to previous student research projects, An Invitation to Modern Number Theory can be used to teach a research seminar or a lecture class.

An Invitation to Knot Theory

Author: Heather A. Dye

Publisher: CRC Press

Published: 2018-09-03

Total Pages: 256

ISBN-13: 1315360098

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The Only Undergraduate Textbook to Teach Both Classical and Virtual Knot Theory An Invitation to Knot Theory: Virtual and Classical gives advanced undergraduate students a gentle introduction to the field of virtual knot theory and mathematical research. It provides the foundation for students to research knot theory and read journal articles on their own. Each chapter includes numerous examples, problems, projects, and suggested readings from research papers. The proofs are written as simply as possible using combinatorial approaches, equivalence classes, and linear algebra. The text begins with an introduction to virtual knots and counted invariants. It then covers the normalized f-polynomial (Jones polynomial) and other skein invariants before discussing algebraic invariants, such as the quandle and biquandle. The book concludes with two applications of virtual knots: textiles and quantum computation.

Invitation to Number Theory

Author:

Publisher:

Published: 1961

Total Pages: 148

ISBN-13:

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Invitation to Number Theory

Author: Oystein Ore

Publisher:

Published: 2013

Total Pages:

ISBN-13:

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Invitation to Number Theory

Author: Oystein Ore

Publisher: American Mathematical Society

Published: 2018-08-15

Total Pages: 148

ISBN-13: 1470447983

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Elementary Number Theory

Author: Underwood Dudley

Publisher: W H Freeman & Company

Published: 1978

Total Pages: 249

ISBN-13: 9780716700760

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"With almost a thousand imaginative exercises and problems, this book stimulates curiosity about numbers and their properties."

Quadratic Number Theory: An Invitation to Algebraic Methods in the Higher Arithmetic

Author: J. L. Lehman

Publisher: American Mathematical Soc.

Published: 2019-02-13

Total Pages: 394

ISBN-13: 1470447371

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Quadratic Number Theory is an introduction to algebraic number theory for readers with a moderate knowledge of elementary number theory and some familiarity with the terminology of abstract algebra. By restricting attention to questions about squares the author achieves the dual goals of making the presentation accessible to undergraduates and reflecting the historical roots of the subject. The representation of integers by quadratic forms is emphasized throughout the text. Lehman introduces an innovative notation for ideals of a quadratic domain that greatly facilitates computation and he uses this to particular effect. The text has an unusual focus on actual computation. This focus, and this notation, serve the author's historical purpose as well; ideals can be seen as number-like objects, as Kummer and Dedekind conceived of them. The notation can be adapted to quadratic forms and provides insight into the connection between quadratic forms and ideals. The computation of class groups and continued fraction representations are featured—the author's notation makes these computations particularly illuminating. Quadratic Number Theory, with its exceptionally clear prose, hundreds of exercises, and historical motivation, would make an excellent textbook for a second undergraduate course in number theory. The clarity of the exposition would also make it a terrific choice for independent reading. It will be exceptionally useful as a fruitful launching pad for undergraduate research projects in algebraic number theory.