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- Q1571290 subject Q7003933.
- Q1571290 subject Q7110104.
- Q1571290 abstract "In mathematics, more specifically in the area of modern algebra known as group theory, a group is said to be perfect if it equals its own commutator subgroup, or equivalently, if the group has no nontrivial abelian quotients (equivalently, its abelianization, which is the universal abelian quotient, is trivial). In symbols, a perfect group is one such that G(1) = G (the commutator subgroup equals the group), or equivalently one such that Gab = {1} (its abelianization is trivial).".
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- Q1571290 wikiPageWikiLink Q159943.
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- Q1571290 wikiPageWikiLink Q3041173.
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- Q1571290 wikiPageWikiLink Q571124.
- Q1571290 wikiPageWikiLink Q7003933.
- Q1571290 wikiPageWikiLink Q7110104.
- Q1571290 wikiPageWikiLink Q7269527.
- Q1571290 wikiPageWikiLink Q743179.
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- Q1571290 wikiPageWikiLink Q7798010.
- Q1571290 wikiPageWikiLink Q83478.
- Q1571290 wikiPageWikiLink Q874429.
- Q1571290 comment "In mathematics, more specifically in the area of modern algebra known as group theory, a group is said to be perfect if it equals its own commutator subgroup, or equivalently, if the group has no nontrivial abelian quotients (equivalently, its abelianization, which is the universal abelian quotient, is trivial). In symbols, a perfect group is one such that G(1) = G (the commutator subgroup equals the group), or equivalently one such that Gab = {1} (its abelianization is trivial).".
- Q1571290 label "Perfect group".