English

Discrete Incremental Voting on Expanders

Discrete Mathematics 2024-09-20 v1

Abstract

Pull voting is a random process in which vertices of a connected graph have initial opinions chosen from a set of kk distinct opinions, and at each step a random vertex alters its opinion to that of a randomly chosen neighbour. If the system reaches a state where each vertex holds the same opinion, then this opinion will persist forthwith. In general the opinions are regarded as incommensurate, whereas in this paper we consider a type of pull voting suitable for integer opinions such as {1,2,,k}\{1,2,\ldots,k\} which can be compared on a linear scale; for example, 1 ('disagree strongly'), 2 ('disagree'), ,\ldots, 5 ('agree strongly'). On observing the opinion of a random neighbour, a vertex updates its opinion by a discrete change towards the value of the neighbour's opinion, if different. Discrete incremental voting is a pull voting process which mimics this behaviour. At each step a random vertex alters its opinion towards that of a randomly chosen neighbour; increasing its opinion by +1+1 if the opinion of the chosen neighbour is larger, or decreasing its opinion by 1-1, if the opinion of the neighbour is smaller. If initially there are only two adjacent integer opinions, for example {0,1}\{0,1\}, incremental voting coincides with pull voting, but if initially there are more than two opinions this is not the case. For an nn-vertex graph G=(V,E)G=(V,E), let λ\lambda be the absolute second eigenvalue of the transition matrix PP of a simple random walk on GG. Let the initial opinions of the vertices be chosen from {1,2,,k}\{1,2,\ldots,k\}. Let c=vVπvXvc=\sum_{v \in V} \pi_v X_v, where XvX_v is the initial opinion of vertex vv, and πv\pi_v is the stationary distribution of the vertex. Then provided λk=o(1)\lambda k=o(1) and k=o(n/logn)k=o(n/\log n), with high probability the final opinion is the initial weighted average cc suitably rounded to c\lfloor c \rfloor or c\lceil c\rceil.

Keywords

Cite

@article{arxiv.2409.12615,
  title  = {Discrete Incremental Voting on Expanders},
  author = {Colin Cooper and Tomasz Radzik and Takeharu Shiraga},
  journal= {arXiv preprint arXiv:2409.12615},
  year   = {2024}
}

Comments

arXiv admin note: text overlap with arXiv:2305.15632

R2 v1 2026-06-28T18:50:02.206Z