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- In [[group theory]], the '''normaliser''' of a [[subgroup]] of a [[group (mathematics)]] is the set of all group e A subgroup of ''G'' is [[normal subgroup|normal]] in ''G'' if its normaliser is the whole of ''G''.511 bytes (84 words) - 12:24, 29 December 2008
- 112 bytes (17 words) - 12:27, 29 December 2008
- 500 bytes (66 words) - 12:27, 29 December 2008
- 919 bytes (145 words) - 12:30, 29 December 2008
Page text matches
- In [[group theory]], the '''normaliser''' of a [[subgroup]] of a [[group (mathematics)]] is the set of all group e A subgroup of ''G'' is [[normal subgroup|normal]] in ''G'' if its normaliser is the whole of ''G''.511 bytes (84 words) - 12:24, 29 December 2008
- {{r|Normaliser}}885 bytes (141 words) - 12:30, 29 December 2008
- {{r|Normaliser}}907 bytes (145 words) - 12:28, 29 December 2008
- {{r|Normaliser}}1 KB (180 words) - 17:00, 11 January 2010
- {{r|Normaliser}}1 KB (187 words) - 20:18, 11 January 2010