Mixed Deffuant Dynamics
Abstract
The original Deffuant model consists of a finite number of agents whose opinion is a number in [0,1]. Two socially connected agents are uniformly randomly selected at each time step and approach each other at a rate μ∈ [0,1/2] if and only if their opinions differ by at most some confidence threshold ε>0. In this paper, we consider a variant of the Deffuant model, namely the mixed model, where the convergence parameter μ and the social relationship can vary over time. We investigate circumstances under which asymptotic stability holds or a consensus can be achieved. Also, we derive a nontrivial lower bound for the probability of consensus which is independent of the number of agents.
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