| 書目名稱 | Classical Theory of Algebraic Numbers | | 編輯 | Paulo Ribenboim | | 視頻video | http://file.papertrans.cn/228/227139/227139.mp4 | | 叢書名稱 | Universitext | | 圖書封面 |  | | 描述 | Gauss created the theory of binary quadratic forms in "Disquisitiones Arithmeticae" and Kummer invented ideals and the theory of cyclotomic fields in his attempt to prove Fermat‘s Last Theorem. These were the starting points for the theory of algebraic numbers, developed in the classical papers of Dedekind, Dirichlet, Eisenstein, Hermite and many others. This theory, enriched with more recent contributions, is of basic importance in the study of diophantine equations and arithmetic algebraic geometry, including methods in cryptography. This book has a clear and thorough exposition of the classical theory of algebraic numbers, and contains a large number of exercises as well as worked out numerical examples. The Introduction is a recapitulation of results about principal ideal domains, unique factorization domains and commutative fields. Part One is devoted to residue classes and quadratic residues. In Part Two one finds the study of algebraic integers, ideals, units, class numbers, the theory of decomposition, inertia and ramification of ideals. Part Three is devoted to Kummer‘s theory of cyclomatic fields, and includes Bernoulli numbers and the proof of Fermat‘s Last Theorem for r | | 出版日期 | Textbook 2001Latest edition | | 關(guān)鍵詞 | algebra; algebraic geometry; automorphism; cryptography; diophantine equation; field; prime number; quadrat | | 版次 | 2 | | doi | https://doi.org/10.1007/978-0-387-21690-4 | | isbn_softcover | 978-1-4419-2870-2 | | isbn_ebook | 978-0-387-21690-4Series ISSN 0172-5939 Series E-ISSN 2191-6675 | | issn_series | 0172-5939 | | copyright | Springer Science+Business Media New York 2001 |
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