Definitions from Wikipedia (Almost simple group)
▸ noun: In mathematics, a group is said to be almost simple if it contains a non-abelian simple group and is contained within the automorphism group of that simple group – that is, if it fits between a (non-abelian) simple group and its automorphism group.
▸ Words similar to Almost simple group
▸ Usage examples for Almost simple group
▸ Idioms related to Almost simple group
▸ Wikipedia articles (New!)
▸ Words that often appear near Almost simple group
▸ Rhymes of Almost simple group
▸ Invented words related to Almost simple group
▸ noun: In mathematics, a group is said to be almost simple if it contains a non-abelian simple group and is contained within the automorphism group of that simple group – that is, if it fits between a (non-abelian) simple group and its automorphism group.
▸ Words similar to Almost simple group
▸ Usage examples for Almost simple group
▸ Idioms related to Almost simple group
▸ Wikipedia articles (New!)
▸ Words that often appear near Almost simple group
▸ Rhymes of Almost simple group
▸ Invented words related to Almost simple group