Stochastic population growth in spatially heterogeneous environments

Abstract

Classical ecological theory predicts that environmental stochasticity increases extinction risk by reducing the average per-capita growth rate of populations. To understand the interactive effects of environmental stochasticity, spatial heterogeneity, and dispersal on population growth, we study the following model for population abundances in n patches: the conditional law of Xt+dt given Xt=x is such that when dt is small the conditional mean of Xt+dti-Xti is approximately [xiμi+Σj(xj Dji-xi Dij)]dt, where Xti and μi are the abundance and per capita growth rate in the i-th patch respectivly, and Dij is the dispersal rate from the i-th to the j-th patch, and the conditional covariance of Xt+dti-Xti and Xt+dtj-Xtj is approximately xi xj σijdt. We show for such a spatially extended population that if St=(Xt1+...+Xtn) is the total population abundance, then Yt=Xt/St, the vector of patch proportions, converges in law to a random vector Y∞ as t∞, and the stochastic growth rate t∞t-1 St equals the space-time average per-capita growth rate Σiμi[Y∞i] experienced by the population minus half of the space-time average temporal variation [Σi,jσijY∞i Y∞j] experienced by the population. We derive analytic results for the law of Y∞, find which choice of the dispersal mechanism D produces an optimal stochastic growth rate for a freely dispersing population, and investigate the effect on the stochastic growth rate of constraints on dispersal rates. Our results provide fundamental insights into "ideal free" movement in the face of uncertainty, the persistence of coupled sink populations, the evolution of dispersal rates, and the single large or several small (SLOSS) debate in conservation biology.