A classification of flag-transitive block designs

Abstract

In this article, we investigate 2-(v,k,λ) designs with (r,λ)=1 admitting flag-transitive automorphism groups G. We prove that if G is an almost simple group, then such a design belongs to one of the seven infinite families of 2-designs or it is one of the eleven well-known examples. We describe all these examples of designs. We, in particular, prove that if D is a symmetric (v,k,λ) design with (k,λ)=1 admitting a flag-transitive automorphism group G, then either G≤ A L1(q) for some odd prime power q, or D is a projective space or the unique Hadamard design with parameters (11,5,2).