Invasion by rare mutants in a spatial two-type Fisher-Wright system with selection (1104.0253v1)

Abstract: We consider a meanfield system of interacting Fisher-Wright diffusions with selection and rare mutation on the geographic space ${1,2,...,N}$. The type 1 has fitness 0, type 2 has fitness 1 and (rare) mutation occurs from type 1 to 2 at rate $m...N^{-1}$, selection is at rate $s>0$. The system starts in the state concentrated on type 1, the state of low fitness. We investigate this system for $N \to \infty$ on the original and large time scales. We show that for some $\alpha \in (0,s)$ at times $\alpha^{-1} \log N+t, t \in \R, N \to \infty$ the emergence of type 2 (positive global type-2 intensity) at a global level occurs, while at times $\alpha^{-1} \log N+t_N$, with $t_N \to \infty$ we get fixation on type 2 and on the other hand with $t_N \to -\infty$ as $N \to \infty$ asymptotically only type 1 is present. We describe the transition from emergence to fixation in the time scale $\alpha^{-1} \log N+t, t \in \R$ in the limit $N \to \infty$ by a McKean-Vlasov random entrance law. This entrance law behaves for $t \to -\infty$ like $^\ast\CW e^{-\alpha |t|}$ for a positive random variable $^\ast \CW$. The formation of small droplets of type-2 dominated sites in times $o(\log N)$, or $\gamma...\log N, \gamma \in (0,\alpha^{-1})$ is described in the limit $N \to \infty$ by a measure-valued process following a stochastic equation driven by Poissonian type noise which we identify explicitly. The total mass of this limiting $(N \to \infty)$ droplet process grows like $\CW^\ast e^{\alpha t}$ as $t \to \infty$. We prove that exit behaviour from the small time scale equals the entrance behaviour in the large time scale, namely $\CL[^\ast\CW] =\CL[\CW^\ast]$.