Affine flag graphs and classification of a family of symmetric graphs with complete quotients

Abstract

A graph is G-symmetric if G is a group of automorphisms of which is transitive on the set of ordered pairs of adjacent vertices of . If V() admits a nontrivial G-invariant partition B such that for blocks B, C ∈ B adjacent in the quotient graph B of relative to B, exactly one vertex of B has no neighbour in C, then is called an almost multicover of B. In this case an incidence structure with point set B arises naturally, and it is a (G, 2)-point-transitive and G-block-transitive 2-design if in addition B is a complete graph. In this paper we classify all G-symmetric graphs such that (i) B has block size |B| 3; (ii) B is complete and almost multi-covered by ; (iii) the incidence structure involved is a linear space; and (iv) G contains a regular normal subgroup which is elementary abelian. This classification together with earlier results in [A. Gardiner and C. E. Praeger, Australas. J. Combin. 71 (2018) 403--426], [M.~Giulietti et al., J. Algebraic Combin. 38 (2013) 745--765] and [T. Fang et al., Electronic J. Combin. 23 (2) (2016) P2.27] completes the classification of symmetric graphs satisfying (i) and (ii).