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| THE STRUCTURES OF GROUPS OF ORDER $\[{2^3}{P^2}\]$ |
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Citation: |
Zhang Yuanda.THE STRUCTURES OF GROUPS OF ORDER $\[{2^3}{P^2}\]$[J].Chinese Annals of Mathematics B,1983,4(1):77~94 |
| Page view: 728
Net amount: 746 |
Authors: |
Zhang Yuanda; |
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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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