A Tight Upper Bound on Acquaintance Time of Graphs

Abstract

In this note we confirm a conjecture raised by Benjamini et al. BST on the acquaintance time of graphs, proving that for all graphs G with n vertices it holds that (G) = O(n3/2), which is tight up to a multiplicative constant. This is done by proving that for all graphs G with n vertices and maximal degree it holds that (G) ≤ 20 n. Combining this with the bound (G) ≤ O(n2/) from BST gives the foregoing uniform upper bound of all n-vertex graphs. We also prove that for the n-vertex path Pn it holds that (Pn)=n-2. In addition we show that the barbell graph Bn consisting of two cliques of sizes n/2 and n/2 connected by a single edge also has (Bn) = n-2. This shows that it is possible to add (n2) edges to Pn without changing the value of the graph.