Counting oriented spanning trees in generalized join digraphs
Abstract
Let G be a digraph with vertex set \1,2,...,n\ and H1,H2,...,Hn be n digraphs. The generalized join digraph G=G[H1,H2,...,Hn] is a digraph obtained from G by replacing each vertex i with Hi and for any u∈ V(Hi) and v∈ V(Hj), (u,v)∈ E(G) if and only if (i,j)∈ E(G). In this paper we express the number of oriented spanning trees in G in terms of Laplacian eigenvalues of H1,H2,...,Hn and oriented spanning trees of G. Furthermore, we consider the number of oriented spanning trees with a fixed root in G. First, we introduce the biclique-directed star transformation formula for counting oriented spanning trees with a fixed root in digraphs. Using it, we give the formula for the total number of oriented spanning trees with roots in a certain Hi (1≤ i ≤ n) of G in terms of Laplacian eigenvalues of H1,H2,...,Hn and oriented spanning trees of G. As applications, when each Hi is a given digraph, the enumerative formulas for oriented spanning trees with a fixed root of G are derived from our work.
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