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具有冪零局部子群的有限群一文的注記
A finite group G is called PN-group if G is not nilpotent and for every p-subgroup P of G, there holds that either P is normal in G or P C Z∞(G) or NG(P) is nilpotent, p ∈π(G).In this paper, we prove that PN-group is meta-nilpotent, especially, PN-group is solvable. In addition, we give an elementary, intuitionistie, compact proof of the structure theorem of PN-group.
作 者: 李樣明 LI Yang Ming 作者單位: Department of Mathematics, Guangdong College of Education, Guangdong 510310, China 刊 名: 數(shù)學(xué)研究與評(píng)論 ISTIC PKU 英文刊名: JOURNAL OF MATHEMATICAL RESEARCH AND EXPOSITION 年,卷(期): 2008 28(3) 分類號(hào): O152.1 關(guān)鍵詞: PN-group meta-nilpotent group structure theorem【具有冪零局部子群的有限群一文的注記】相關(guān)文章:
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