English

A stochastic opinion dynamics model with domain size dependent dynamic evolution

Statistical Mechanics 2014-06-16 v3 Physics and Society

Abstract

We introduce a stochastic model of binary opinion dynamics in one dimension. The binary opinions ±1\pm 1 are analogous to up and down Ising spins and in the equivalent spin system, only the spins at the domain boundary can flip. The probability that a spin at the boundary is up is taken as Pup=supsup+δsdownP_{up} = \frac {s_{up}} {s_{up} + \delta s_{down}} where sup(sdown)s_{up} (s_{down}) denotes the size of the domain with up (down) spins neighbouring it. With xx fraction of up spins initially, a phase transition is observed in terms of the exit probability and the phase boundary is obtained in the δx\delta -x plane. In addition, we investigate the coarsening behaviour starting from a completely random state; conventional scaling is observed only at the phase transition point δ=1\delta = 1. The scaling behaviour is compared to other dynamical phenomena; the model apparently belongs to a new dynamical universility class as far as persistence is concerned although the dynamical exponent, equal to one, is identical to a similar model with no stochasticity.

Keywords

Cite

@article{arxiv.1205.3943,
  title  = {A stochastic opinion dynamics model with domain size dependent dynamic evolution},
  author = {Suman Sinha and Soham Biswas and Parongama Sen},
  journal= {arXiv preprint arXiv:1205.3943},
  year   = {2014}
}

Comments

This paper has been withdrawn by the authors. An updated, revised and accepted version (in PRE) of this paper is available at arXiv:1306.6813

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