Ian Stewart, David Tall

Algebraic Number Theory and Fermat's Last Theorem (eBook, PDF)

• Format: PDF

Produktbeschreibung

This text introduces fundamental ideas of algebraic numbers and explores one of the most intriguing stories in the history of mathematics-the quest for a proof of Fermat's Last Theorem. The authors use this celebrated theorem to motivate a general study of the theory of algebraic numbers from a relatively concrete point of view. Along with several recent developments, this fourth edition provides up-to-date information on unique prime factorization for real quadratic number fields and presents Mihailescu's proof of the Catalan conjecture.

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Produktdetails

• Verlag: Taylor & Francis
• Seitenzahl: 342
• Erscheinungstermin: 14. Oktober 2015
• Englisch
• ISBN-13: 9781498738408
• Artikelnr.: 57076607

Autorenporträt

Ian Stewart is an emeritus professor of mathematics at the University of Warwick and a fellow of the Royal Society. Dr. Stewart has been a recipient of many honors, including the Royal Society's Faraday Medal, the IMA Gold Medal, the AAAS Public Understanding of Science and Technology Award, and the LMS/IMA Zeeman Medal. He has published more than 180 scientific papers and numerous books, including several bestsellers co-authored with Terry Pratchett and Jack Cohen that combine fantasy with nonfiction.

David Tall is an emeritus professor of mathematical thinking at the University of Warwick. Dr. Tall has published numerous mathematics textbooks and more than 200 papers on mathematics and mathematics education. His research interests include cognitive theory, algebra, visualization, mathematical thinking, and mathematics education.

Inhaltsangabe

I. Algebraic Methods. 1. Algebraic Background. 2. Algebraic Numbers. 3.
Quadratic and Cyclotomic Fields. 4. Pell's Equation. 5. Factorisation into
Irreducibles. 6. Ideals. II. Geometric Methods. 7. Lattices. 8. Minkowski's
Theorem. 9. Geometric Representation of Algebraic Numbers. 10. Dirichlet's
Units Theorem. 11. Class-Group and Class-Number. III. Number-Theoretic
Applications. 12. Computational Methods. 13. Kummer's Special Case of
Fermat's Last Theorem. IV. Elliptic Curves and Elliptic Functions. 14.
Elliptic Curves. 15. Elliptic Functions. V. Wiles's Proof of Fermat's Last
Theorem. 16. The Path to the Final Breakthrough. 17. Wiles's Strategy and
Subsequent Developments. VI. Galois Theory and Other Topics. 18. Extensions
and Galois Theory. 19. Cyclotomic and Cubic Fields. 20. Prime Ideals
Revisited. 21. Ramification Theory. 22. Quadratic Reciprocity. 23.
Valuations and p-adic Numbers.

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Algebraic Methods: Algebraic Background. Algebraic Numbers. Quadratic and Cylclotomic Fields. Factorization into Irreducibles. Ideals. Geometric Methods: Lattices. Minkowski's Theorem. Geometric Representation of Algebraic Numbers. Class-Group and Class-Number. Number-Theoretic Applications: Computational Methods. Kummer's Special Case of Fermat's Last Theorem. The Path to the Final Breakthrough. Elliptic Curves. Elliptic Functions. Wiles's Strategy and Recent Developments. Appendices: Quadratic Residues. Dirichlet's Units Theorems.

Rezensionen

"It is the discussion of [Fermat's Last Theorem], I think, that sets this book apart from others - there are a number of other texts that introduce algebraic number theory, but I don't know of any others that combine that material with the kind of detailed exposition of FLT that is found here...To summarize and conclude: this is an interesting and attractive book. It would make an attractive text for an early graduate course on algebraic number theory, as well as a nice source of information for people interested in FLT, and especially its connections with algebraic numbers."
-Dr. Mark Hunacek, MAA Reviews, June 2016

Praise for Previous Editions
"The book remains, as before, an extremely attractive introduction to algebraic number theory from the ideal-theoretic perspective."
-Andrew Bremner, Mathematical Reviews, February 2003