I want to know what all doubly-transitive groups look like. Do you know some good reference where I can read about it?
Group Theory – Doubly-Transitive Groups
gr.group-theoryreference-request
gr.group-theoryreference-request
I want to know what all doubly-transitive groups look like. Do you know some good reference where I can read about it?
Best Answer
In Section 7.7 "The Finite 2-transitive Groups" of the book Permutation groups by John D. Dixon and Brian Mortimer, the authors describe the complete list of finite 2-transitive groups without proofs but with references.
They list eight infinite families: the alternating, symmetric, affine and projective groups in their natural actions, as well as the less known groups of Lie type: the symplectic groups, the Suzuki groups, the unitary groups and the Ree groups. The symplectic groups have two distinct 2-transitive actions, the last three classes are 2-transitive on the sets of points in their action on appropriate Steiner systems. Additional there are 10 sporadic examples of 2-transitive groups.