Quadratic Extensions of Flag-transitive Planes

For any odd prime power q, all (q 2 &q+1)th roots of unity clearly lie in the extension field F q 6 of the Galois field F q of q elements. It is easily shown that none of these roots of unity have trace &2, and the only such roots of trace &3 must be primitive cube roots of unity which do not belong

The flag-transitive affine planes of order 125 are completely classified. There are five such planes.

Steiner quadruple system of order v is a 3&(v, 4, 1) design and will be denoted SQS(v). Using the classification of finite 2-transitive permutation groups all SQS(v) with a flag-transitive automorphism group are completely classified, thus solving the ``still open and longstanding problem of classif

Each of the d-dimensional dual hyperovals S h m discovered by Yoshiara [20] gives rise, via affine expansion, to a flag-transitive semibiplane A f (S h m ). We prove that, if m is not isomorphic to any of the examples we are aware of, except possibly for certain semibiplanes obtained from D n -buil