A new density limit for unanimity in majority dynamics on random graphs

Abstract

Majority dynamics is a process on a simple, undirected graph G with an initial Red/Blue color for every vertex of G. Each day, each vertex updates its color following the majority among its neighbors, using its previous color for tie-breaking. The dynamics achieves unanimity if every vertex has the same color after finitely many days, and such color is said to win. When G is a G(n,p) random graph, L. Tran and Vu (2019) found a codition in terms of p and the initial difference 2 beteween the sizes of the Red and Blue camps, such that unanimity is achieved with probability arbitrarily close to 1. They showed that if p2 1 , p ≥ 100, and p≥ (1+) n-1 n for a positive constant , then unanimity occurs with probability 1 - o(1). If p is not extremely small, namely p > -1/16 n , then Sah and Sawhney (2022) showed that the condition p2 1 is sufficient. If n-12 n p n-1/21/4 n, we show that p3/2 n-1/2 n is enough. Since this condition holds if p ≥ 100 for p in this range, this is an improvement of Tran's and Vu's result. For the closely related problem of finding the optimal condition for p to achieve unanimity when the initial coloring is chosen uniformly at random among all possible Red/Blue assignments, our result implies a new lower bound p n-2/32/3 n, which improves upon the previous bound of n-3/5 n by Chakraborti, Kim, Lee and T. Tran (2021).

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