| Neither G9(Q) nor G11(Q) Is a Subgroup of K2(Q) |
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| 引用本文: | 徐克舰.Neither G9(Q) nor G11(Q) Is a Subgroup of K2(Q)[J].东北数学,2002,18(1):59-62. |
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| 作者姓名: | 徐克舰 |
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| 作者单位: | Institute of Mathematics,Academy of Mathematics and Systems Science,Chinese Academy of Sciences,Beijing,100080; Department of Mathematics,Qingdao University,Qingdao,266071 |
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| 摘 要: | It is proved that neither G9(Q) nor G11(Q) is a subgroup of K2(Q)
which confirms two special cases of a conjecture proposed by Browkin, J. (Lecture
Notes in Math., 966, Springer-Verlag, New York, Heidelberg, Berlin, 1982, 1-6).
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| 关 键 词: | 域 子群 环 K2群 驯顺特征 Diophantine方程 素数 |
Neither G_9(Q) nor G_(11)(Q) Is a Subgroup of K_2(Q) |
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| XU Kejian.Neither G_9(Q) nor G_(11)(Q) Is a Subgroup of K_2(Q)[J].Northeastern Mathematical Journal,2002,18(1):59-62. |
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| Authors: | XU Kejian |
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| Institution: | InstituteofMathematics,AcademyofMathematicsandSystemsScience,ChineseAcademyofSciences,Beijing,100080 |
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| Abstract: | It is proved that neither G9(Q) nor G11(Q) is a subgroup of K2(Q),which confirms two special cases of a conjecture proposed by Browkin,J.(Lecture Notes in Math.,966,Springer-Verlag,New York,Heidelberg,Berlin,1982,1-6). |
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| Keywords: | K2 group tame symbol Diophantine equation |
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