| Non-abelian member of pair |
GAP ID |
Abelian member of pair |
GAP ID |
The 1-isomorphism arises as a ... |
Description of the 1-isomorphism |
Best perspective 1 |
Best perspective 2 |
Alternative perspective
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| semidirect product of Z8 and Z8 of M-type |
3 |
direct product of Z8 and Z8 |
2 |
cocycle halving generalization of Baer correspondence, the intermediate object being a class two Lie cring |
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| semidirect product of Z16 and Z4 of M-type |
27 |
direct product of Z16 and Z4 |
26 |
cocycle halving generalization of Baer correspondence, the intermediate object being a class two Lie cring |
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| M64 |
51 |
direct product of Z32 and Z2 |
50 |
cocycle halving generalization of Baer correspondence, the intermediate object being a class two Lie cring |
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| SmallGroup(64,57) |
57 |
direct product of Z4 and Z4 and Z4 |
55 |
linear halving generalization of Baer correspondence, the intermediate object being a class two Lie ring |
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| direct product of SmallGroup(32,4) and Z2 |
84 |
direct product of Z8 and Z4 and Z2 |
83 |
cocycle halving generalization of Baer correspondence, the intermediate object being a class two Lie cring |
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| direct product of M16 and Z4 |
85 |
direct product of Z8 and Z4 and Z2 |
83 |
cocycle halving generalization of Baer correspondence, the intermediate object being a 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 |
cocycle halving generalization of Baer correspondence, the intermediate object being a class two Lie cring |
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|
|
112 |
direct product of Z8 and Z4 and Z2 |
83 |
cocycle halving generalization of Baer correspondence, the intermediate object being a class two Lie cring |
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|
|
| direct product of M32 and Z2 |
184 |
direct product of Z16 and V4 |
183 |
cocycle halving generalization of Baer correspondence, the intermediate object being a class two Lie cring |
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| central product of D8 and Z16 |
185 |
direct product of Z16 and V4 |
183 |
cocycle halving generalization of Baer correspondence, the intermediate object being a class two Lie cring |
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|
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| direct product of SmallGroup(32,24) and Z2 |
195 |
direct product of Z4 and Z4 and V4 |
192 |
cocycle halving generalization of Baer correspondence, the intermediate object being a class two Lie cring |
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| direct product of SmallGroup(16,13) and Z4 |
198 |
direct product of Z4 and Z4 and V4 |
192 |
cocycle halving generalization of Baer correspondence, the intermediate object being a class two Lie cring |
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| direct product of M16 and V4 |
247 |
direct product of Z8 and E8 |
246 |
cocycle halving generalization of Baer correspondence, the intermediate object being a class two Lie cring |
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|
| SmallGroup(64,248) |
248 |
direct product of Z8 and E8 |
246 |
cocycle halving generalization of Baer correspondence, the intermediate object being a class two Lie cring |
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|
249 |
direct product of Z8 and E8 |
246 |
cocycle halving generalization of Baer correspondence, the intermediate object being a class two Lie cring |
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| direct product of SmallGroup(16,13) and V4 |
263 |
direct product of E16 and Z4 |
260 |
cocycle halving generalization of Baer correspondence, the intermediate object being a class two Lie cring |
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|
266 |
direct product of E16 and Z4 |
260 |
cocycle halving generalization of Baer correspondence, the intermediate object being a 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 |
? |
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|
|
64 |
direct product of Z4 and Z4 and Z4 |
55 |
? |
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|
|
82 |
direct product of Z4 and Z4 and Z4 |
55 |
? |
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|
17 |
direct product of Z8 and Z4 and Z2 |
83 |
? |
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|
25 |
direct product of Z8 and Z4 and Z2 |
83 |
? |
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|
|
113 |
direct product of Z8 and Z4 and Z2 |
83 |
? |
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|
|
114 |
direct product of Z8 and Z4 and Z2 |
83 |
? |
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| direct product of SmallGroup(32,2) and Z2 |
56 |
direct product of Z4 and Z4 and V4 |
192 |
cocycle skew reversal generalization of Baer correspondence, the intermediate object being a class two near-Lie cring |
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|
61 |
direct product of Z4 and Z4 and V4 |
192 |
? |
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|
77 |
direct product of Z4 and Z4 and V4 |
192 |
? |
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|
| direct product of SmallGroup(32,33) and Z2 |
209 |
direct product of Z4 and Z4 and V4 |
192 |
via class three Lie cring(?) |
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|
210 |
direct product of Z4 and Z4 and V4 |
192 |
? |
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