Coexistence of grass, saplings and trees in the Staver-Levin forest model

Abstract

In this paper, we consider two attractive stochastic spatial models in which each site can be in state 0, 1 or 2: Krone's model in which 0=vacant, 1=juvenile and 2=a mature individual capable of giving birth, and the Staver-Levin forest model in which 0=grass, 1=sapling and 2=tree. Our first result shows that if (0,0) is an unstable fixed point of the mean-field ODE for densities of 1's and 2's then when the range of interaction is large, there is positive probability of survival starting from a finite set and a stationary distribution in which all three types are present. The result we obtain in this way is asymptotically sharp for Krone's model. However, in the Staver-Levin forest model, if (0,0) is attracting then there may also be another stable fixed point for the ODE, and in some of these cases there is a nontrivial stationary distribution.