The finite k-set homogeneous graphs

Abstract

A classification is given of finite k-set-homogeneous graphs for k≥slant 2, leading to a striking result that each finite k-set-homogeneous graph is k-homogeneous. It shows that 3-set-homogeneous graphs are rare, consisting of the following graphs and their complements: 5, nn, nm, the Schl\"afli graph of order 27, the Higman-Sims graph, the MaLaughlin graph, affine polar graphs, and elliptic orthogonal graphs. As an ingredient for the proof, it is shown that all orbitals in a primitive permutation group of rank 4 are self-paired, except for 3(3) acting on 36 points.