On the average size of 1-nearly independent vertex sets in graphs
Abstract
A k-nearly independent vertex subset of a graph G is a set of vertices that induces a subgraph containing exactly k edges. For k = 0, this coincides with the classical notion of independent subsets. This paper investigates the average size, av1(G) of the 1-nearly independent vertex subsets of both graphs and trees of a given order n. Let En denote the n-vertex edgeless graph, so that av1(En) = 0. We determine all n-vertex graphs G≠ En that minimize or maximize av1. Similarly, we identify the trees of order n that achieve the minimum value of av1, and prove that the maximum value lies between n/2 and (n+1)/2 if n>8. Finally, we construct a family of n-vertex trees which shows that the bounds are asymptotically sharp.
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