论文信息 - Enumerations of vertex orders of almost Moore digraphs with selfrepeats

Enumerations of vertex orders of almost Moore digraphs with selfrepeats

An almost Moore digraph G of degree d>1, diameter k>1 is a diregular digraph with the number of vertices one less than the Moore bound. If G is an almost Moore digraph, then for each vertex [email protected]?V(G) there exists a vertex [email protected]?V(G), called repeatof u and denoted by r(u)=v, such that there are two walks of length ==3 then G contains exactly k selfrepeats or none. In this paper, we propose an exact formula for the number of all vertex orders in an almost Moore digraph G containing selfrepeats, based on the vertex orders of the out-neighbours of any selfrepeat vertex.

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