English

Competition between group interactions and nonlinearity in voter dynamics on hypergraphs

Physics and Society 2024-12-03 v2 Social and Information Networks Dynamical Systems Adaptation and Self-Organizing Systems

Abstract

Social dynamics are often driven by both pairwise (i.e., dyadic) relationships and higher-order (i.e., polyadic) group relationships, which one can describe using hypergraphs. To gain insight into the impact of polyadic relationships on dynamical processes on networks, we formulate and study a polyadic voter process, which we call the group-driven voter model (GVM), that incorporates the effect of group interactions by nonlinear interactions that are subject to a group (i.e., hyperedge) constraint. By examining the competition between nonlinearity and group sizes, we show that the GVM achieves consensus faster than standard voter-model dynamics, with an optimal minimizing exit time. We substantiate this finding by using mean-field theory on annealed uniform hypergraphs with NN nodes, for which the exit time scales as AlnN{\cal A}\ln N, where the prefactor A{\cal A} depends both on the nonlinearity and on group-constraint factors. Our results reveal how competition between group interactions and nonlinearity shapes GVM dynamics. We thereby highlight the importance of such competing effects in complex systems with polyadic interactions.

Cite

@article{arxiv.2407.11261,
  title  = {Competition between group interactions and nonlinearity in voter dynamics on hypergraphs},
  author = {Jihye Kim and Deok-Sun Lee and Byungjoon Min and Mason A. Porter and Maxi San Miguel and K. -I. Goh},
  journal= {arXiv preprint arXiv:2407.11261},
  year   = {2024}
}

Comments

Maintext: 6 pages, 6 figures & Supplemental Material: 14 pages, 7 figures

R2 v1 2026-06-28T17:42:19.258Z