Reaching a Consensus on Random Networks: The Power of Few

Abstract

A community of n individuals splits into two camps, Red and Blue. The individuals are connected by a social network, which influences their colors. Everyday, each person changes his/her color according to the majority among his/her neighbors. Red (Blue) wins if everyone in the community becomes Red (Blue) at some point. We study this process when the underlying network is the random Erdos-Renyi graph G(n, p). With a balanced initial state (n/2 person in each camp), it is clear that each color wins with the same probability. Our study reveals that for any constants p and , there is a constant C such that if one camp has n/2 +C individuals, then it wins with probability at least 1 - . The surprising key fact here is that C does not depend on n, the population of the community. When p=1/2 and =.1, one can set C as small as 6. If the aim of the process is to choose a candidate, then this means it takes only 6 "defectors" to win an election unanimously with overwhelming odd.