Locally dihedral block designs and primitive groups with dihedral point stabilizers

Abstract

Let D be a block design admitting a locally transitive automorphism group G. We say that D is G-point-locally dihedral if the induced local action GxD is dihedral for each point x, and that D is G-block-locally dihedral if the induced local action GBB is dihedral for each block B. If both conditions hold, D is called G-locally dihedral. We give a classification of primitive permutation groups with dihedral point stabilizers and apply this to classify point-locally dihedral block designs. In particular, for symmetric designs with a dihedral or abelian local action, we show that Gx and GB are conjugate in G, and that either G acts imprimitively on both points and blocks, or G is a Frobenius group of odd order.