2022
DOI: 10.1088/2632-072x/ac8c78
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Exact time-dependent dynamics of discrete binary choice models

Abstract: We provide a generic method to find full dynamical solutions to binary decision models with interactions. In these models, agents follow a stochastic evolution where they must choose between two possible choices by taking into account the choices of their peers. We illustrate our method by solving Kirman and Föllmer's ant recruitment model for any number $N$ of \textit{discrete} agents and for any choice of parameters, recovering past results found in the limit $N\to \infty$. We then solve extensions of the an… Show more

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Cited by 7 publications
(23 citation statements)
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“…This also allows one to connect continued fractions to their equivalent polynomial expressions that define the eigenspectra. The key references for the examples in this section are [36][37][38].…”
Section: Application To Relaxation Times In Models Of Social Choicementioning
confidence: 99%
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“…This also allows one to connect continued fractions to their equivalent polynomial expressions that define the eigenspectra. The key references for the examples in this section are [36][37][38].…”
Section: Application To Relaxation Times In Models Of Social Choicementioning
confidence: 99%
“…The same model has been used in other contexts to describe genetic drift [39] and the dynamics of migration [40,41]. In simpler cases where the effects of recruitment are symmetric in both decisions the binary choice model has been solved [38,40]. However, making the effects of recruitment asymmetric leads to non-trivial relaxation rates and eigenfunctions for the stochastic process [38].…”
Section: A Fully Asymmetric Binary Choice Modelmentioning
confidence: 99%
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