On combinatorial structure and algebraic characterizations of distance-regular digraphs
Abstract
Let =(A) denote a simple strongly connected digraph with vertex set X, diameter D, and let \A0,A:=A1,A2,…,AD\ denote the set of distance-i matrices of . Let \Ri\i=0D denote a partition of X× X, where Ri=\(x,y)∈ X× X (Ai)xy=1\ (0 i D). The digraph is distance-regular if and only if (X,\Ri\i=0D) is a commutative association scheme. In this paper, we describe the combinatorial structure of in the sense of equitable partition, and from it we derive several new algebraic characterizations of such a graph, including the spectral excess theorem for distance-regular digraph. Along the way, we also rediscover all well-known algebraic characterizations of such graphs.
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