Abstract
AbstractMost opinion dynamics models are based on pairwise interactions. However in many real situations, discussions take place within groups of people. Here, we define a higher order Deffuant model by generalizing the original pairwise interaction model for bounded-confidence opinion-dynamics to interactions involving a group of agents of size k. The generalized model is naturally encoded in a hypergraph. We study this dynamics in different hypergraph topologies, from random hypergraph ensembles, to spatially embedded hyper-lattices. We show that including higher order interactions induces a drastic change in the onset of consensus for random hypergraphs; instead of the sharp phase transition, characteristic of the dyadic Deffuant model, the system undergoes a smooth size independent crossover to consensus, as the confidence value increases. This phenomenon is absent from regular hypergraphs, which conserve a phase transition.
Publisher
Springer Science and Business Media LLC
Subject
General Physics and Astronomy
Reference34 articles.
1. Castellano, C., Fortunato, S. & Loreto, V. Statistical physics of social dynamics. Rev. Mod. Phys. 81, 591 (2009).
2. Kelman, H. C. Compliance, identification, and internalization three processes of attitude change. J. Confl. Resolution 2, 51 (1958).
3. Deffuant, G., Neau, D., Amblard, F. & Weisbuch, G. Mixing beliefs among interacting agents. Adv. Complex Syst. 03, 87 (2000).
4. Hegselmann, R. & Krause, U. Opinion dynamics and bounded confidence models, analysis, and simulation. J. Artif. Soc. Soc. Simul. 5, (2002).
5. Levendusky, M. S., Druckman, J. N. & McLain, A. How group discussions create strong attitudes and strong partisans. Res. Politics 3, 2053168016645137 (2016).
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