Bounds on Kemeny's constant of a graph and the Nordhaus-Gaddum problem
Abstract
We study Nordhaus-Gaddum problems for Kemeny's constant K(G) of a connected graph G. We prove bounds on \K(G),K(G)\ and the product K(G)K(G) for various families of graphs. In particular, we show that if the maximum degree of a graph G on n vertices is n-O(1) or n-(n), then \K(G),K(G)\ is at most O(n).
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