| 非正规子群都是q群的有限群 |
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| 引用本文: | 汪婧,曾泽建,石化国.非正规子群都是q群的有限群[J].西华师范大学学报(哲学社会科学版),2009(4):435-436. |
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| 作者姓名: | 汪婧 曾泽建 石化国 |
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| 作者单位: | 四川职业技术学院,四川遂宁629000 |
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| 摘 要: | 得到非正规子群都是q群的完全分类,即证明了如下结论:设q是一个素数,有限群C不是Dedekind群,则G的非正规子群都是q群的充要条件是G为非交换q群且不同构于Q8×E,其中Q8是8阶四元数群,E为初等阿贝尔2-群,或G=PQ,其中P为G的P阶正规子群,Q为G的非正规q群,Q为Dedekind群且p=1(mod q).
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| 关 键 词: | 有限群 非正规子群 Dedekind群 |
Non-normal Subgroup Are Finite Groups of q-Groups |
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| WANG Jing,ZENG Ze-jian,SHI Hua-guo.Non-normal Subgroup Are Finite Groups of q-Groups[J].Journal of China West Normal University:Natural Science Edition,2009(4):435-436. |
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| Authors: | WANG Jing ZENG Ze-jian SHI Hua-guo |
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| Institution: | (Sichuan Vocational and Technical College, Suining 629000, China) |
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| Abstract: | In this paper we had discussed that all non-normal subgroups are finite groups of q-groups. And we proved the following theorem:Let q be a prime,finite group G is not a Dedekind group. Then all non-normal subgroups if G are q-groups if and only if G is a non abelian q-group and G is not ismorphic to Q8× E,where Q8 is a quaternion group of order 8,E is an elementary 2 - group or G = PQ,where P is a normal subgroup of G with order p,Q is a non-normal Sylow q-subgroup of G,Q is a Dedekind group and q=1(mod p). |
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| Keywords: | finite group non-normal subgroup Dedekind group |
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