The number of independent sets in bipartite graphs and benzenoids

Abstract

Given a graph G, we study the number of independent sets in G, denoted i(G). This parameter is known as both the Merrifield-Simmons index of a graph as well as the Fibonacci number of a graph. In this paper, we give general bounds for i(G) when G is bipartite and we give its exact value when G is a balanced caterpillar. We improve upon a known upper bound for i(T) when T is a tree, and study a conjecture that all but finitely many positive integers represent i(T) for some tree T. We also give exact values for i(G) when G is a particular type of benzenoid.

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