Doubly homogeneous 2-(v, k, 1) designs

Let G be an automorphism group of a 2&(v, k, 1) design. In this paper, we prove that if G is line-primitive and kÂ(k, v) 10, then G is also point-primitive.

An automorphism of a 2-(v, k, 1) design acts as a permutation of the points and as another of the blocks. We show that the permutation of the blocks has at least as many cycles, of lengths n > k, as the permutation of the points. Looking at Steiner triple systems we show that this holds for all n un

In this paper, we prove that if D is a 2-(v, k, 1) design with G ≤ Aut(D) block primitive and soc (G) = 2 G 2 (q) then D is a Ree unital with parameters 2-(q 3 + 1, q + 1, 1).

In this article, we study the classification of flag-transitive, point-primitive 2-(v, k, 4) symmetric designs. We prove that if the socle of the automorphism group G of a flag-transitive, point-primitive nontrivial 2-(v, k, 4) symmetric design D is an alternating group A n for n ≥ 5, then (v, k) =