Acquaintance Time of a Graph

Abstract

We define the following parameter of connected graphs. For a given graph $G = (V,E)$ we place one agent in each vertex $v \in V$. Every pair of agents sharing a common edge is declared to be acquainted. In each round we choose some matching of $G$ (not necessarily a maximal matching), and for each edge in the matching the agents on this edge swap places. After the swap, again, every pair of agents sharing a common edge become acquainted, and the process continues. We define the acquaintance time of a graph $G$, denoted by $\mathcal{AC}(G)$, to be the minimal number of rounds required until every two agents are acquainted. We first study the acquaintance time for some natural families of graphs including the path, expanders, the binary tree, and the complete bipartite graph. We also show that for all $n \in {\mathbb N}$ and for all positive integers $k \leq n^{1.5}$ there exists an $n$-vertex graph $G$ such that $k/c \leq \mathcal{AC}(G) \leq c \cdot k$ for some universal constant $c \geq 1$. We also prove...