Fast plurality consensus in regular expanders

Abstract

Pull voting is a classic method to reach consensus among n vertices with differing opinions in a distributed network: each vertex at each step takes on the opinion of a random neighbour. This method, however, suffers from two drawbacks. Even if there are only two opposing opinions, the time taken for a single opinion to emerge can be slow and the final opinion is not necessarily the initially held majority. We refer to a protocol where 2 neighbours are contacted at each step as a 2-sample voting protocol. In the two-sample protocol a vertex updates its opinion only if both sampled opinions are the same. Not much was known about the performance of two-sample voting on general expanders in the case of three or more opinions. In this paper we show that the following performance can be achieved on a d-regular expander using two-sample voting. We suppose there are k 3 opinions, and that the initial size of the largest and second largest opinions is A1, A2 respectively. We prove that, if A1 - A2 C n \( n)/A1, λ\, where λ is the absolute second eigenvalue of matrix P=Adj(G)/d and C is a suitable constant, then the largest opinion wins in O((n n)/A1) steps with high probability. For almost all d-regular graphs, we have λ=c/d for some constant c>0. This means that as d increases we can separate an opinion whose majority is o(n), whereas (n) majority is required for d constant. This work generalizes the results of Becchetti et. al (SPAA 2014) for the complete graph Kn.