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　　Since the publication of the first edition， several remarkable developments have taken place. The work of Thaine， Kolyvagin， and Rubin has produced fairly elementary proofs of Ribet's converse of Herbrand's theorem and of the Main Conjecture. The original proofs of both of these results used delicate techniques from algebraic geometry and were inaccessible to many readers. Also， Sinnott discovered a beautiful proof of the vanishing of Iwasawa's u-invariant that is much simpler than the one given in Chapter 7. Finally， Fermat's Last Theorem was proved by Wiles， using work of Frey， Ribet， Serre， Mazur， Langlands-Tunnell， Taylor-Wiles， and others. Although the proof， which is based on modular forms and elliptic curves， is much different from the cyclotomic approaches described in this book， several of the ingredients were inspired by ideas from cyclotomic fields and Iwasawa theory.

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前言/序言

割圓域導論（第2版） 下載 mobi epub pdf txt 電子書

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數論方麵的書

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好

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現代數論方麵的專著！

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好書，要不是活動價買不到這麼便宜的

評分☆☆☆☆☆

好書，要不是活動價買不到這麼便宜的

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好

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Introduction to Cyclotomic Fields

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Introduction to Cyclotomic Fields

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Introduction to Cyclotomic Fields

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