摘要
We study a subclass of the May–Leonard stochastic model with an arbitrary,even number of species,leading to the rise of two competing partnerships where individuals are indistinguishable.By carrying out a series of accurate numerical stochastic simulations,we show that alliances compete each other forming spatial domains bounded by interfaces of empty sites.We solve numerically the mean field equations associated with the stochastic model in one and two spatial dimensions.We demonstrate that the stationary interface profile presents topological properties which are related to the asymptotic spatial distribution of species of enemy alliances far away from the interface core.Finally,we introduce a theoretical approach to model the formation of stable interfaces using spontaneous breaking of a discrete symmetry.We show that all the results provided by the soliton topological model,presented here for the very first time,are in agreement with the stochastic simulations and may be used as a tool for understanding the complex biodiversity in nature.
基金
CAPES,CNPq,FAPERN and the Netherlands Organization for Scientific Research(NWO)for financial and computational support.JM acknowledges support from NWO Visitor’s Travel Grant 040.11.643.