| Abstract: | The kth power of a simple graph G, denoted by  , is the graph with vertex set  where two vertices are adjacent if they are within distance k in G. We are interested in finding lower bounds on the average degree of  . Here we prove that if G is connected with minimum degree  and  , then G4 has average degree at least  . We also prove that if G is a connected d‐regular graph on n vertices with diameter at least  , then the average degree of  is at least ![urn:x-wiley:03649024:jgt21628:equation:jgt21628-math-0009]( "urn:x-wiley:03649024:jgt21628:equation:jgt21628-math-0009") Both these results are shown to be essentially best possible; the second is best possible even when  is arbitrarily large. |
