On two new classes of semibiplanes

We construct a \(c . c^{*}\)-geometry admitting \(M_{22}\) as flag transitive automorphism group. Furthermore, we classify all flag transitive \(c . c^{*}\)-geometries supposing that the residue of a circle is isomorphic to the complete graph \(K_{15}\). We use coset enumeration to determine the uni

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

We construct, in a very simple way, two new classes of elementary abelian (q 2 , k, k&1) and (q 2 , k+1, k+1) difference families with k a multiple of q&1. The first of these classes contains, as special cases, the supplementary difference systems constructed by A.