Edge-averaging dynamics on finite graphs: moment dependence

Abstract

We study the edge-averaging process on a finite, connected graph G = (V, E). Initially, the vertices in V are endowed with i.i.d.\ real-valued opinions (f0(v))v ∈ V. Edges are activated according to i.i.d.\ Poisson clocks of rate 1; when an edge is activated, the opinions at its endpoints are replaced by their average. Let ft(v) denote the opinion at v at time t.Define the ε-convergence time τε as the first time when the maximum and the minimum of ft differ by at most ε. It is known that if the initial opinions (f0(v))v ∈ V are bounded in L∞, then E(τε) is at most Cε 2 n for ε ∈ (0, 1]. We assume instead that the Lp norm of f0(v) is at most 1 for every v ∈ V. For fixed ε ∈ (0, 1], and show that E(τε) = O(nβp) up to logarithmic terms, where βp := (3 - p, 2/p). Moreover, this power law is tight on cycle graphs.