On the Asymptotic u0-Expected Flooding Time of Stationary Edge-Markovian Graphs

Abstract

Consider that u0 nodes are aware of some piece of data d0. This note derives the expected time required for the data d0 to be disseminated through-out a network of n nodes, when communication between nodes evolves according to a graphical Markov model Gn,p with probability parameter p. In this model, an edge between two nodes exists at discrete time k ∈ N+ with probability p if this edge existed at k-1, and with probability (1-p) if this edge did not exist at k-1. Each edge is interpreted as a bidirectional communication link over which data between neighbors is shared. The initial communication graph is assumed to be an Erdos-Renyi random graph with parameters (n,p), hence we consider a stationary Markov model Gn,p. The asymptotic "u0-expected flooding time" of Gn,p is defined as the expected number of iterations required to transmit the data d0 from u0 nodes to n nodes, in the limit as n approaches infinity. Although most previous results on the asymptotic flooding time in graphical Markov models are either almost sure or with high probability, the bounds obtained here are in expectation. However, our bounds are tighter and can be more complete than previous results.