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On the Convergence of an Opinion-Action Coevolution Model with Bounded Confidence

Chen Song, Angela Fontan, Rong Su, Julien M. Hendrickx, Vladimir Cvetkovic, Karl H. Johansson

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arxiv Score 3.8

Published 2026-04-07 · First seen 2026-04-08

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Abstract

This paper presents a theoretical convergence analysis for an opinion-action coevolution model that integrates the opinion updating rule of the Hegselmann-Krause model with a utility-based decision-making mechanism. The model is reformulated into an augmented state-space representation, where the state matrix induces a time-varying social interaction digraph. The convergence analysis is grounded on two existing theoretical findings that establish convergence for the Hegselmann-Krause type of models and containment control systems with multiple stationary leaders, respectively. Results indicate that, if the structure of the interaction digraph stabilizes within finite time, the model either converges to consensus, where all agents' opinions and actions reach an identical state, or exhibits clustering, where some opinion nodes act as stationary leaders while the remaining nodes approach the convex hull formed by the leaders. Numerical simulations are then provided to validate the theoretical results.

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BibTeX

@article{song2026convergence,
  title = {On the Convergence of an Opinion-Action Coevolution Model with Bounded Confidence},
  author = {Chen Song and Angela Fontan and Rong Su and Julien M. Hendrickx and Vladimir Cvetkovic and Karl H. Johansson},
  year = {2026},
  abstract = {This paper presents a theoretical convergence analysis for an opinion-action coevolution model that integrates the opinion updating rule of the Hegselmann-Krause model with a utility-based decision-making mechanism. The model is reformulated into an augmented state-space representation, where the state matrix induces a time-varying social interaction digraph. The convergence analysis is grounded on two existing theoretical findings that establish convergence for the Hegselmann-Krause type of mod},
  url = {https://arxiv.org/abs/2604.06140},
  keywords = {eess.SY},
  eprint = {2604.06140},
  archiveprefix = {arXiv},
}

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