Local majority dynamics on preferential attachment graphs
Abstract
Suppose in a graph vertices can be either red or blue. Let be odd. At each time step, each vertex in polls random neighbours and takes the majority colour. If it doesn't have neighbours, it simply polls all of them, or all less one if the degree of is even. We study this protocol on the preferential attachment model of Albert and Barab\'asi, which gives rise to a degree distribution that has roughly power-law , as well as generalisations which give exponents larger than . The setting is as follows: Initially each vertex of is red independently with probability , and is otherwise blue. We show that if is sufficiently biased away from , then with high probability, consensus is reached on the initial global majority within steps. Here is the number of vertices and is the minimum of and (or if is even), being the number of edges each new vertex adds in the preferential attachment generative process. Additionally, our analysis reduces the required bias of for graphs of a given degree sequence studied by the first author (which includes, e.g., random regular graphs).
Cite
@article{arxiv.1507.06818,
title = {Local majority dynamics on preferential attachment graphs},
author = {Mohammed Amin Abdullah and Michel Bode and Nikolaos Fountoulakis},
journal= {arXiv preprint arXiv:1507.06818},
year = {2015}
}