Unified bounds for the independence number of graph powers

Abstract

For a graph G, its k-th power Gk is constructed by placing an edge between two vertices if they are within distance k of each other. The k-independence number αk(G) is defined as the independence number of Gk. By using general semidefinite programming and polynomial methods, we derive sharp bounds for the k-independence number of a graph, which extend and unify various existing results. Our work also allows us to easily derive some new bounds for αk(G).

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