Bounds on the edge-Wiener index of cacti with n vertices and t cycles
Abstract
The edge-Wiener index We(G) of a connected graph G is the sum of distances between all pairs of edges of G. A connected graph G is said to be a cactus if each of its blocks is either a cycle or an edge. Let Gn,t denote the class of all cacti with n vertices and t cycles. In this paper, the upper bound and lower bound on the edge-Wiener index of graphs in Gn,t are identified and the corresponding extremal graphs are characterized.
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