Steiner distance matrix of caterpillar graphs
Abstract
For a connected graph G:=(V,E), the Steiner distance dG(X) among a set of vertices X is the minimum size among all the connected subgraphs of G whose vertex set contains X. The k-Steiner distance matrix Dk(G) of G is a matrix whose rows and columns are indexed by k-subsets of V. For k-subsets X1 and X2, the (X1,X2)-entry of Dk(G) is dG(X1 X2). In this paper, we show that the rank of 2-Steiner distance matrix of a caterpillar graph on N vertices and with p pendant veritices is 2N-p-1.
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