Number fields / Daniel A. Marcus
Material type: TextPublication details: New York : Springer Verlag, 1977Edition: 2nd edDescription: 203 pISBN:- 9783319902326 (pbk)
- 512.74 M3341
Contents:
1. A special case of Fermat’s conjecture
2. Number fields, and number rings
3. Prime decomposition in number rings
4. Galois Theory applied to prime decomposition
5. The ideal class group and the unit group
6. The distribution of ideals in a number ring
7. The dedeking zeta function and the class number formula
8. The distribution of primes and an introduction to class field theory
Item type | Current library | Call number | Status | Date due | Barcode | |
---|---|---|---|---|---|---|
Books | UE-Central Library | 512.74 M3341 (Browse shelf(Opens below)) | Available | T16188 | ||
Books | UE-Central Library | 512.74 M3341 (Browse shelf(Opens below)) | Available | T16189 | ||
Books | UE-Central Library | 512.74 M3341 (Browse shelf(Opens below)) | Available | T16190 |
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512.74 F588 Fixed Points Results in Split Quaternion Algebras Over Prime Fields | 512.74 H84 Fields and Galois theory / | 512.74 M3341 Number fields | 512.74 M3341 Number fields | 512.74 M3341 Number fields | 512.8 L2691 Algebra. | 512.8 S2852 Numerical mathematical analysis, |
1. A special case of Fermat’s conjecture
2. Number fields, and number rings
3. Prime decomposition in number rings
4. Galois Theory applied to prime decomposition
5. The ideal class group and the unit group
6. The distribution of ideals in a number ring
7. The dedeking zeta function and the class number formula
8. The distribution of primes and an introduction to class field theory
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