Characterizations of amorphic association schemes in terms of fusing triples

Abstract

Let R be an association scheme with nontrivial relations A1,…,Ad. We call R amorphic if every possible fusion of its nontrivial relations gives rise to a fusion scheme. We define the fusing-relations 3-hypergraph of R to be the 3-uniform hypergraph on the vertex set \A1,…,Ad\ such that \ Ai, Aj, Ak \ forms an edge if it fuses, i.e., fusing Ai, Aj, Ak gives rise to a fusion scheme of R. A 3-uniform hypergraph is called a 3-sunflower if, for the edges, the union is the set of vertices and the intersection consists of 2 vertices. In this paper, we prove that for d≥ 5, R is amorphic if its fusing-relations 3-hypergraph contains two 3-sunflowers. As a corollary, for d≥ 5, R is amorphic if and only if all triples of its nontrivial relations fuse.