Models for species evolution with random deaths
Abstract
We consider three discrete-time models for species evolution. In all three models, at each time step n, with probability p, a species is born with an independent Uniform[0,1] fitness value and, with probability 1-p, a species is killed. The mechanism for selecting which species to kill when a death occurs distinguishes the three models: in the first model, the least fit species is always killed; in the second model, with probability r, the least fit species is killed and, with probability 1-r, a species chosen uniformly from the population is killed; in the third model, with probability r, the least fit species is killed and, with probability 1-r, the species with the largest fitness less than an independent Uniform[0,1] outcome is killed. We establish asymptotic results as n ∞ for the three models. These results demonstrate that small changes to the death mechanism of the model can lead to vastly different asymptotic behaviour. To prove our results we develop a novel approach that relies on coupling arguments and mean-field limits.
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