Nonequilibrium phase transition due to social group isolation

Abstract

We introduce a simple model of a growing system with m competing communities. The model corresponds to the phenomenon of defeats suffered by social groups living in isolation. A nonequilibrium phase transition is observed when at critical time tc the first isolated cluster occurs. In the one-dimensional system the volume of the new phase, i.e. the number of the isolated individuals, increases with time as Z t3. For a large number of possible communities the critical density of filled space equals to c = (m/N)1/3 where N is the system size. A similar transition is observed for Erdos-R\'enyi random graphs and Barab\'asi-Albert scale-free networks. Analytic results are in agreement with numerical simulations.