The determinant of the distance matrix of graphs with at most two cycles
Abstract
Let G be a connected graph on n vertices and D(G) its distance matrix. The formula for computing the determinant of this matrix in terms of the number of vertices is known when the graph is either a tree or a unicyclic graph. In this work we generalize these results, obtaining the determinant of the distance matrix for all graphs in a class, including trees, unicyclic and bicyclic graphs. This class actually includes graphs with many cycles, provided that each block of the graph is at most bicyclic.
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