Zassenhaus Group
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High Quality Content by WIKIPEDIA articles! In mathematics, a Zassenhaus group, named after Hans Julius Zassenhaus, is a certain sort of doubly transitive permutation group very closely related to rank-1 groups of Lie type.Some authors omit the third condition that G has no regular normal subgroup. This condition is put in to eliminate some "degenerate" cases. The extra examples one gets by omitting it are either Frobenius groups or certain groups of degree 2p and order 2p(2p 1)p for a prime p, that are generated by all semilinear mappings and Galois automorphisms of a field of order 2p.

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High Quality Content by WIKIPEDIA articles! In mathematics, a Zassenhaus group, named after Hans Julius Zassenhaus, is a certain sort of doubly transitive permutation group very closely related to rank-1 groups of Lie type.Some authors omit the third condition that G has no regular normal subgroup. This condition is put in to eliminate some "degenerate" cases. The extra examples one gets by omitting it are either Frobenius groups or certain groups of degree 2p and order 2p(2p 1)p for a prime p, that are generated by all semilinear mappings and Galois automorphisms of a field of order 2p.