The classification of doubly transitive affine designs

We prove that the finite linear spaces containing a proper linear subspace and admitting an automorphism group which is transitive on the unordered pairs of intersecting lines are the projective and affine spaces of dimension ~3, unless all lines have size 2.

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

All affine resolvable designs with parameters of the design of the hyperplanes in ternary affine 3-space are enumerated. This enumeration implies the classification (up to equivalence), of all optimal equidistant ternary codes of length 13 and distance 9, as well as all complete orthogonal arrays of

Examples 1.1. (Desarguesian affine spaces). Here S is an affine space AG n (q), where n 2 and q n = p d ; we have G 0 1L n (q), and one of the following holds:

We classify the flocks of quadratic cones in PG(3, q), q odd, that admit the group G ≤ PGL(4, q) acting doubly transitively on the conics of the flock. This yields, in conjunction with a predecessor to this paper, a complete classification of the doubly transitive oval and quadratic flocks in PG(3,