Symmetries of biplanes

Abstract

In this paper, we first study biplanes D with parameters (v,k,2), where the block size k∈\13,16\. These are the smallest parameter values for which a classification is not available. We show that if k=13, then either D is the Aschbacher biplane or its dual, or Aut(D) is a subgroup of the cyclic group of order 3. In the case where k=16, we prove that |Aut(D)| divides 27· 32· 5· 7· 11· 13. We also provide an example of a biplane with parameters (16,6,2) with a flag-transitive and point-primitive subgroup of automorphisms preserving a homogeneous cartesian decomposition. This motivated us to study biplanes with point-primitive automorphism groups preserving a cartesian decomposition. We prove that such an automorphism group is either of affine type (as in the example), or twisted wreath type.