Convergence Analysis of Asymmetric Homogeneous Deffuant-Weisbuch Model
In this paper, we consider the convergence property of asymmetric homogenous Deffuant-Weisbuch (DW) model, which is described by discrete-time equations driven by endogenously changing topologies. We focus on the dynamics analysis for this model when the agent selection probability is distributed independently and uniformly on the set of all agents. Although the opinions updated by a local rule are time-varying, we prove that all the opinions of the agents will convergent almost surely for any initial states, which verifies the aggregation characteristics of the asymmetric stochastic opinion dynamics models.
opinion dynamics multi-agent systems aggregation convergence separability
Jiangbo Zhang Ge Chen Yiguang Hong
Faculty of KeyLaboratory of System and Control, Academy of Mathematics and SystemsScience, Chinese A Faculty of Key Laboratory of System and Control, Academy of Mathematics and Systems Science, Chinese
国际会议
The 24th Chinese Control and Decision Conference (第24届中国控制与决策学术年会 2012 CCDC)
太原
英文
2406-2411
2012-05-23(万方平台首次上网日期,不代表论文的发表时间)