On the Periodicity of k-distance Graphs
Abstract
The k-distance graph Gk of a graph G has the same vertex set as G and two vertices are adjacent if and only if their distance is k in G. These graphs have been extensively studied for their connection properties. In this paper, we study various properties of these graphs, including clique number and periodicity. For all k, we show that there exists a k-distance graph that is weakly periodic for any size period. Our main result is a proof that if k > 2 then there exists a k-distance graph of any size (strong) period. Finally, we provide evidence that there exists an upper bound on the periodicity of a connected 2-distance graph as a function of |V|.
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