Element structure of groups of order 64: Difference between revisions
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| [[direct product of M16 and Z4]] || 85 || [[direct product of Z8 and Z4 and Z2]] || 83 || via class two Lie cring || || || || || | | [[direct product of M16 and Z4]] || 85 || [[direct product of Z8 and Z4 and Z2]] || 83 || via class two Lie cring || || || || || | ||
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| [[central product of M16 and Z8 over common Z2]] || 86 || [[direct product of Z8 and Z4 and Z2]] || 83 || via class two Lie cring || || || || | | [[central product of M16 and Z8 over common Z2]] || 86 || [[direct product of Z8 and Z4 and Z2]] || 83 || via class two Lie cring || || || || || | ||
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| || 112 || [[direct product of Z8 and Z4 and Z2]] || 83 || via class two Lie cring || || || || | | || 112 || [[direct product of Z8 and Z4 and Z2]] || 83 || via class two Lie cring || || || || || | ||
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| || 184 || [[direct product of Z16 and V4]] || 183 || via class two Lie cring || || || || | | [[direct product of M32 and Z2]]|| 184 || [[direct product of Z16 and V4]] || 183 || via class two Lie cring || || || || || | ||
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| || 185 || [[direct product of Z16 and V4]] || 183 || via class two Lie cring || || || || | | [[central product of D8 and Z16]] || 185 || [[direct product of Z16 and V4]] || 183 || via class two Lie cring || || || || || | ||
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| || 195 || [[direct product of Z4 and Z4 and V4]] || 192 || via class two Lie cring || || || || | | [[direct product of SmallGroup(32,24) and Z2]] || 195 || [[direct product of Z4 and Z4 and V4]] || 192 || via class two Lie cring || || || || || | ||
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| || 198 || [[direct product of Z4 and Z4 and V4]] || 192 || via class two Lie cring || || || || | | [[direct product of SmallGroup(16,13) and Z4]] || 198 || [[direct product of Z4 and Z4 and V4]] || 192 || via class two Lie cring || || || || || | ||
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| || 247 || [[direct product of Z8 and E8]] || 246 || via class two Lie cring || || || || | | [[direct product of M16 and V4]] || 247 || [[direct product of Z8 and E8]] || 246 || via class two Lie cring || || || || || | ||
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| || 248 || [[direct product of Z8 and E8]] || 246 || via class two Lie cring || || || || | | [[SmallGroup(64,248)]] || 248 || [[direct product of Z8 and E8]] || 246 || via class two Lie cring || || || || || | ||
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| || 249 || [[direct product of Z8 and E8]] || 246 || via class two Lie cring || || || || | | || 249 || [[direct product of Z8 and E8]] || 246 || via class two Lie cring || || || || || | ||
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| || 263 || [[direct product of E16 and Z4]] || 260 || via class two Lie cring || || || || | | [[direct product of SmallGroup(16,13) and V4]] || 263 || [[direct product of E16 and Z4]] || 260 || via class two Lie cring || || || || || | ||
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| || 266 || [[direct product of E16 and Z4]] || 260 || via class two Lie cring || || || || | | || 266 || [[direct product of E16 and Z4]] || 260 || via class two Lie cring || || || || || | ||
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| [[semidirect product of Z16 and Z4 via fifth power map]] || 28 || [[direct product of Z16 and Z4]] || 26 || ? || || || || || | | [[semidirect product of Z16 and Z4 via fifth power map]] || 28 || [[direct product of Z16 and Z4]] || 26 || ? || || || || || | ||
Revision as of 05:18, 4 December 2010
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
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:
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