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| 关于广义超特殊p-群的自同构群 | |
| 引用本文: | 王玉雷,刘合国. 关于广义超特殊p-群的自同构群[J]. 中国科学:数学, 2011, 41(2): 125-134. DOI: 10.1360/012010-306 |
| 作者姓名: | 王玉雷 刘合国 |
| 作者单位: | 河南工业大学数学系, 郑州450001; 湖北大学数学系, 武汉430062 |
| 基金项目: | 国家自然科学基金(批准号:10971054); 河南省教育厅自然科学基金(批准号:2011B110011); 河南工业大学科研基金(批准号:10XZZ011);河北工业大学引进人才基金(批准号:2009BS029)资助项目 |
| 摘 要: | 用如下的方式确定了广义超特殊p-群G的自同构群.设|G|=p2n+m,|ζG|=pm,|N|=pl并且G'≤N≤ζG,其中n≥1且m≥2.AutnG表示AutG中平凡地作用在N上的所有自同构形成的正规子群.则(1)当p是奇素数时,AutG/AunG≌Z(p-1)pl-1.进一步地,(i)如果G的幂指数是pm,则Autn... |
| 关 键 词: | 广义超特殊p-群 中心积 辛群 自同构 |
On the automorphism group of a generalized extraspecial p-group |
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| WANG YuLei , LIU HeGuo. On the automorphism group of a generalized extraspecial p-group[J]. Scientia Sinica Mathemation, 2011, 41(2): 125-134. DOI: 10.1360/012010-306 | |
| Authors: | WANG YuLei & LIU HeGuo |
| Affiliation: | WANG YuLei & LIU HeGuo |
| Abstract: | In this paper,the automorphism group of a generalized extraspecial p-group G is determined.Assume that |G| = p2n+m,|ζG| = pm,|N| = pl and G N ζG,where n 1 and m 2.Let AutnG be the normal subgroup of AutG consisting of all elements of AutG which act trivially on N.Then (1) When p is odd,AutG/AutnG ≌ Z(p-1)pl-1.Furthermore,(i) If the exponent of G is equal to pm,then AutnG/InnG ≌ Sp(2n,p) × H.(ii) If the exponent of G is equal to pm+1,then AutnG/InnG ≌ (K Sp(2n - 2,p)) × H,where K is an extraspecial p-group of order p2n-1.Here H = 1 (if m = l) or Zpm-l (if m l).(2) When p = 2,AutG = AutnG (if l = 1) and AutG/AutnG ≌ Z2l-2 × Z2 (if l 2).Furthermore,(i) If the exponent of G is equal to 2m,then AutnG/InnG ≌ Sp(2n,2) × H.(ii) If the exponent of G is equal to 2m+1,then AutnG/InnG ≌ (K Sp(2n - 2,2)) × H,where K is an elementary abelian 2-group of order 22n-1.Here H = Z2m-2 × Z2 (if l = 1),1 (if l 2 and l = m),or Z2m-l (if l 2 and m l). |
| Keywords: | generalized extraspecial p-groups central product symplectic groups automorphisms |
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