On cores of distance-regular graphs

Abstract

We look at the question of which distance-regular graphs are core-complete, meaning they are isomorphic to their own core or have a complete core. We build on Roberson's homomorphism matrix approach by which method he proved the Cameron-Kazanidis conjecture that strongly regular graphs are core-complete. We develop the theory of the homomorphism matrix for distance-regular graphs of diameter d. We derive necessary conditions on the cosines of a distance-regular graph for it to admit an endomorphism into a subgraph of smaller diameter e<d. As a consequence of these conditions, we show that if X is a primitive distance-regular graph where the subgraph induced by the set of vertices furthest away from a vertex v is connected, any retraction of X onto a diameter-d subgraph must be an automorphism, which recovers Roberson's result for strongly regular graphs as a special case for diameter 2. We illustrate the application of our necessary conditions through computational results. We find that no antipodal, non-bipartite distance-regular graphs of diameter 3, with degree at most 50 admits an endomorphism to a diameter 2 subgraph. We also give many examples of intersection arrays of primitive distance-regular graphs of diameter 3 which are core-complete. Our methods include standard tools from the theory of association schemes, particularly the spectral idempotents. Keywords: algebraic graph theory, distance-regular graphs, association schemes, graph homomorphisms

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