This letter introduces a new multidimensional extension of the Hegselmann-Krause (HK) opinion dynamics model, where opinion proximity is not determined by a norm or metric. Instead, each agent trusts opinions within the Minkowski sum ξ+O , where ξ is the agent’s current opinion and O is the confidence set defining acceptable deviations. During each iteration, agents update their opinions by simultaneously averaging the trusted opinions. Unlike traditional HK systems, where O is a ball in some norm, our model allows the confidence set to be non-convex and even unbounded. The new model, referred to as SCOD (Set-based Confidence Opinion Dynamics), can exhibit properties absent in the conventional HK model. Some solutions may converge to non-equilibrium points in the state space, while others oscillate periodically. These “pathologies” disappear if the set O is symmetric and contains zero in its interior: similar to the usual HK model, the SCOD then converge in a finite number of iterations to one of the equilibrium points. The latter property is also preserved if one agent is “stubborn” and resists changing their opinion, yet still influences the others; however, two stubborn agents can lead to oscillations.

Opinion Dynamics With Set-Based Confidence: Convergence Criteria and Periodic Solutions / Zabarianska, Iryna; Proskurnikov, Anton V.. - In: IEEE CONTROL SYSTEMS LETTERS. - ISSN 2475-1456. - ELETTRONICO. - 8:(2024), pp. 2373-2378. [10.1109/lcsys.2024.3479275]

Opinion Dynamics With Set-Based Confidence: Convergence Criteria and Periodic Solutions

Proskurnikov, Anton V.
2024

Abstract

This letter introduces a new multidimensional extension of the Hegselmann-Krause (HK) opinion dynamics model, where opinion proximity is not determined by a norm or metric. Instead, each agent trusts opinions within the Minkowski sum ξ+O , where ξ is the agent’s current opinion and O is the confidence set defining acceptable deviations. During each iteration, agents update their opinions by simultaneously averaging the trusted opinions. Unlike traditional HK systems, where O is a ball in some norm, our model allows the confidence set to be non-convex and even unbounded. The new model, referred to as SCOD (Set-based Confidence Opinion Dynamics), can exhibit properties absent in the conventional HK model. Some solutions may converge to non-equilibrium points in the state space, while others oscillate periodically. These “pathologies” disappear if the set O is symmetric and contains zero in its interior: similar to the usual HK model, the SCOD then converge in a finite number of iterations to one of the equilibrium points. The latter property is also preserved if one agent is “stubborn” and resists changing their opinion, yet still influences the others; however, two stubborn agents can lead to oscillations.
File in questo prodotto:
File Dimensione Formato  
LCSYS3479275-2.pdf

accesso aperto

Tipologia: 2a Post-print versione editoriale / Version of Record
Licenza: Creative commons
Dimensione 1.38 MB
Formato Adobe PDF
1.38 MB Adobe PDF Visualizza/Apri
Pubblicazioni consigliate

I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.

Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11583/2993798