This book is an introduction to algebraic number theory via the famous problem of "Fermat's Last Theorem." The exposition follows the historical development of the problem, beginning with the work of Fermat and ending with Kummer's theory of "ideal" factorization, by means of which the theorem is proved for all prime exponents less than 37. The more elementary topics, such as Euler's proof of the impossibilty of x+y=z, are treated in an elementary way, and new concepts and techniques are introduced only after having been motivated by specific problems. The book also covers in detail the application of Kummer's ideal theory to quadratic integers and relates this theory to Gauss' theory of binary quadratic forms, an interesting and important connection that is not explored in any other book.
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This book is an introduction to algebraic number theory via the famous problem of "Fermat's Last Theorem." The book also covers in detail the application of Kummer's ideal theory to quadratic integers and relates this theory to Gauss' theory of binary quadratic forms, an interesting and important connection that is not explored in any other book.
Les mer
1 Fermat.- 2 Euler.- 3 From Euler to Kummer.- 4 Kummer’s theory of ideal factors.- 5 Fermat’s Last Theorem for regular primes.- 6 Determination of the class number.- 7 Divisor theory for quadratic integers.- 8 Gauss’s theory of binary quadratic forms.- 9 Dirichlet’s class number formula.- Appendix: The natural numbers.- Answers to exercises.
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Produktdetaljer
ISBN
9780387902302
Publisert
1977-07-18
Utgiver
Vendor
Springer-Verlag New York Inc.
Høyde
235 mm
Bredde
155 mm
Aldersnivå
Graduate, UU, 05
Språk
Product language
Engelsk
Format
Product format
Innbundet
Forfatter