The number of 1-nearly independent edge subsets

Abstract

Let G=(V(G),E(G)) be a graph with set of vertices V(G) and set of edges E(G). A subset S of E(G) is called a k-nearly independent edge subsets if there are exactly k pairs of elements of S that share a common end. Zk(G) is the number of such subsets. This paper studies Z1. Various properties of Z1 are discussed. We characterise the two n-vertex trees with smallest Z1, as well as the one with largest value. A conjecture on the n-vertex tree with second-largest Z1 is proposed.

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