| THE STRUCTURES OF GROUPS OF ORDER 2~3P~2 |
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| 作者姓名: | Zhang Yuanda |
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| 作者单位: | Wuhan University |
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| 摘 要: | In this paper,the following theorem is proved:Let p be a prime distinet from 3 and 7,then the groups of order 2~3 p~2 have1)60 types when p=1(mod 8),2)52 types when p=5(mod 8),3)42 types when p=3,7(mod 8).
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| 收稿时间: | 1981/3/24 0:00:00 |
THE STRUCTURES OF GROUPS OF ORDER $\[{2^3}{P^2}\]$ |
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| Zhang Yuanda.THE STRUCTURES OF GROUPS OF ORDER 2~3P~2[J].Chinese Annals of Mathematics,Series B,1983,4(1):77-94. |
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| Authors: | Zhang Yuanda |
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| Institution: | Wuhan University |
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| Abstract: | In this paper, the following theorem is proved:
Let p be a prime distinct from 3 and 7, then the groups of order $\{2^3}{P^2}\]$ have
1) 60 types when $\p \equiv 1\]$(mod 8),
2) 52 types when $\p \equiv 5\]$(mod 8),
3) 42 types when $\p \equiv 3,7\]$(mod 8). |
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