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| COMPUTATION OF K2Z[1+(-35的平根号)/2 ] | |
| 引用本文: | Qin Hourong. COMPUTATION OF K2Z[1+(-35的平根号)/2 ][J]. 数学年刊B辑(英文版), 1996, 17(1): 63-72 |
| 作者姓名: | Qin Hourong |
| 摘 要: | The author shows that K2Z[1+(-35的平根号)/2 ]?A ≈Z/2Z. The method of proof is a generalization of the Tate‘s method. |
| 关 键 词: | K2Z[1+(-35的平根号)/2] 计算方法 塔特法 证明方法 |
| 收稿时间: | 1993-12-30 |
COMPUTATION OF K2Z[(1+sqrt(-35))/2] |
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| Qin Hourong. COMPUTATION OF K2Z[(1+sqrt(-35))/2][J]. Chinese Annals of Mathematics,Series B, 1996, 17(1): 63-72 | |
| Authors: | Qin Hourong |
| Affiliation: | DepartmentofMathematics,NamingUniversity,NaBjing210093,China. |
| Abstract: | The author shows that $K_2Zbigl[frac{1+sqrt{-35}}2bigr]cong Z/2Z.$ Themethod of proof is a generalization of the Tate's method. |
| Keywords: | $K_2$ group Tate's method Imaginary quadratic field |
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