On commutative association schemes and associated (directed) graphs

Abstract

Let M denote the Bose--Mesner algebra of a commutative d-class association scheme X (not necessarily symmetric), and denote a (strongly) connected (directed) graph with adjacency matrix A. Under the assumption that A belongs to M, we describe the combinatorial structure of . Moreover, we provide an algebraic-combinatorial characterization of when A generates M. Among else, we show that, if X is a commutative 3-class association scheme that is not an amorphic symmetric scheme, then we can always find a (directed) graph such that the adjacency matrix A of generates the Bose--Mesner algebra M of X.