| Information | |
|---|---|
| has gloss | eng: In the area of abstract algebra known as group theory, a 2-transitive group is a transitive permutation group in which a point stabilizer acts transitively on the remaining points. Every 2-transitive group is a primitive group, but not conversely. Every Zassenhaus group is 2-transitive, but not conversely. The solvable 2-transitive groups were classified by Bertram Huppert and are described in the list of transitive finite linear groups. The insoluble groups were classified by using the classification of finite simple groups and are all almost simple groups. |
| lexicalization | eng: 2-transitive group |
| lexicalization | eng: 2-transitive permutation group |
| lexicalization | eng: Doubly transitive group |
| lexicalization | eng: Doubly transitive permutation group |
| lexicalization | eng: Doubly transitive permutation representation |
| lexicalization | eng: Doubly-transitive permutation group |
| lexicalization | eng: Two transitive group |
| instance of | e/Permutation group |
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