A note on the acquaintance time of random graphs

Abstract

In this short note, we prove the conjecture of Benjamini, Shinkar, and Tsur on the acquaintance time AC(G) of a random graph G ∈ G(n,p). It is shown that asymptotically almost surely AC(G) = O( n / p) for G ∈ G(n,p), provided that pn > (1+ε) n for some ε > 0 (slightly above the threshold for connectivity). Moreover, we show a matching lower bound for dense random graphs, which also implies that asymptotically almost surely Kn cannot be covered with o( n / p) copies of a random graph G ∈ G(n,p), provided that pn > n1/2+ε and p < 1-ε for some ε>0. We conclude the paper with a small improvement on the general upper bound showing that for any n-vertex graph G, we have AC(G) = O(n2/ n).