Element structure of groups of order 64: Difference between revisions
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==1-isomorphism== | ==1-isomorphism== | ||
===Pairs where one of the groups is abelian=== | ===Pairs where one of the groups is abelian=== | ||
There are 29 pairs of groups that are [[1-isomorphic groups|1-isomorphic]] with the property that one of them is abelian. Of these, some pairs share the abelian group part, as the table below shows. Of these, the only example of a group that is not of nilpotency class two is [[SmallGroup(64,25)]] (GAP ID: 25): | There are 29 pairs of groups that are [[1-isomorphic groups|1-isomorphic]] with the property that one of them is abelian. Of these, some pairs share the abelian group part, as the table below shows. Of these, the only example of a group that is not of nilpotency class two is [[SmallGroup(64,25)]] (GAP ID: 25): | ||
Here is a summary version: | |||
{| class="sortable" border="1" | |||
! Nature of 1-isomorphism !! Intermediate object !! Number of 1-isomorphisms between non-abelian and abelian group of this type !! Number of 1-isomorphisms between non-abelian and abelian group of this nature, not of any of the preceding types | |||
|- | |||
| [[linear halving generalization of Baer correspondence]] || [[class two Lie ring]] || 1 || 1 | |||
|- | |||
| [[cocycle having generalization of Baer correspondence]] || [[class two Lie cring]] || 17 || 16 | |||
|- | |||
| [[cocycle skew reversal generalization of Baer correspondence]] || [[class two near-Lie cring]] || ? || ? | |||
|- | |||
| {{fillin}} || {{fillin}} || ? || ? | |||
|} | |||
Here is a long version: | |||
{| class="sortable" border="1" | {| class="sortable" border="1" | ||
Revision as of 23:55, 6 June 2011
This article gives specific information, namely, element structure, about a family of groups, namely: groups of order 64.
View element structure of group families | View element structure of groups of a particular order |View other specific information about groups of order 64
1-isomorphism
Pairs where one of the groups is abelian
There are 29 pairs of groups that are 1-isomorphic with the property that one of them is abelian. Of these, some pairs share the abelian group part, as the table below shows. Of these, the only example of a group that is not of nilpotency class two is SmallGroup(64,25) (GAP ID: 25):
Here is a summary version:
| Nature of 1-isomorphism | Intermediate object | Number of 1-isomorphisms between non-abelian and abelian group of this type | Number of 1-isomorphisms between non-abelian and abelian group of this nature, not of any of the preceding types |
|---|---|---|---|
| linear halving generalization of Baer correspondence | class two Lie ring | 1 | 1 |
| cocycle having generalization of Baer correspondence | class two Lie cring | 17 | 16 |
| cocycle skew reversal generalization of Baer correspondence | class two near-Lie cring | ? | ? |
| PLACEHOLDER FOR INFORMATION TO BE FILLED IN: [SHOW MORE] | PLACEHOLDER FOR INFORMATION TO BE FILLED IN: [SHOW MORE] | ? | ? |
Here is a long version: