MINIMAL NONABELIAN AND MAXIMAL SUBGROUPS OF A FINITE p-GROUP

被引:2
作者
Berkovich, Yakov [1 ]
机构
[1] Univ Haifa, Dept Math, IL-31905 Haifa, Israel
来源
GLASNIK MATEMATICKI | 2008年 / 43卷 / 01期
关键词
Metacyclic p-groups; p-groups of maximal class; minimal non-abelian p-groups; absolutely regular p-groups; abelian maximal subgroups; maximal abelian normal subgroups;
D O I
10.3336/gm.43.1.07
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
The p-groups all of whose nonabelian maximal subgroups are either absolutely regular or of maximal class, are classified (Theorem 2.1). For the main result of [CP] and [ZAX] classifying the p-groups all of whose proper nonabelian subgroups are metacyclic, we offer a proof which is shorter and not so involved. In conclusion we study, in some detail, the p-groups containing an abelian maximal subgroup.
引用
收藏
页码:97 / 109
页数:13
相关论文
共 49 条
  • [31] Finite p-Groups all ofWhose Subgroups of Index p(3) are Abelian
    Zhang, Qinhai
    Zhao, Libo
    Li, Miaomiao
    Shen, Yiqun
    COMMUNICATIONS IN MATHEMATICS AND STATISTICS, 2015, 3 (01) : 69 - 162
  • [32] Finite p-groups Which Have Many Normal Subgroups
    Guo, Xiaoqiang
    Liu, Qiumei
    Zheng, Shiqiu
    Feng, Lichao
    INFORMATION COMPUTING AND APPLICATIONS, PT 1, 2010, 105 : 480 - 487
  • [33] Some finite p-groups whose normal subgroups are characteristic
    Kowsari, Zeinab
    Fouladi, Shirin
    Orfi, Reza
    COMMUNICATIONS IN ALGEBRA, 2022, 50 (11) : 4577 - 4583
  • [34] The number of conjugacy classes of nonnormal subgroups of finite p-groups
    Li, Lili
    Qu, Haipeng
    JOURNAL OF ALGEBRA, 2016, 466 : 44 - 62
  • [35] Finite p-groups with few orders of non-normal subgroups
    He, Lijuan
    Lv, Heng
    JOURNAL OF ALGEBRA AND ITS APPLICATIONS, 2025,
  • [36] Finite p-groups with a minimal non-abelian subgroup of index p(Ⅱ)
    AN LiJian
    LI LiLi
    QU HaiPeng
    ZHANG QinHai
    ScienceChina(Mathematics), 2014, 57 (04) : 737 - 753
  • [37] A COMPLETE CLASSIFICATION OF FINITE p-GROUPS ALL OF WHOSE NONCYCLIC SUBGROUPS ARE NORMAL
    Bozikov, Zdravka
    Janko, Zvonimir
    GLASNIK MATEMATICKI, 2009, 44 (01) : 177 - 185
  • [38] A CLASSIFICATION OF FINITE p-GROUPS WHOSE PROPER SUBGROUPS ARE OF CLASS ≤ 2 (I)
    Li, Pujin
    JOURNAL OF ALGEBRA AND ITS APPLICATIONS, 2013, 12 (03)
  • [39] Finite p-Groups in Which the Number of Subgroups of Possible Order Is Less Than or Equal to p~3
    Haipeng QU
    Chinese Annals of Mathematics(Series B), 2010, 31 (04) : 497 - 506
  • [40] Finite p-groups with a minimal non-abelian subgroup of index p (IV)
    An, Lijian
    Hu, Ruifang
    Zhang, Qinhai
    JOURNAL OF ALGEBRA AND ITS APPLICATIONS, 2015, 14 (02)
12345