A stochastic opinion dynamics model with domain size dependent dynamic evolution
Abstract
We introduce a stochastic model of binary opinion dynamics in one dimension. The binary opinions 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 where denotes the size of the domain with up (down) spins neighbouring it. With fraction of up spins initially, a phase transition is observed in terms of the exit probability and the phase boundary is obtained in the plane. In addition, we investigate the coarsening behaviour starting from a completely random state; conventional scaling is observed only at the phase transition point . 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.
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This paper has been withdrawn by the authors.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