Stochastic difference equations with the Allee effect

Abstract

For a truncated stochastically perturbed equation xn+1=\ f(xn)+ln+1, 0 \ with f(x)<x on (0,m), which corresponds to the Allee effect, we observe that for very small perturbation amplitude l, the eventual behavior is similar to a non-perturbed case: there is extinction for small initial values in (0,m-) and persistence for x0 ∈ (m+δ, H] for some H satisfying H>f(H)>m. As the amplitude grows, an interval (m-, m+δ) of initial values arises and expands, such that with a certain probability, xn sustains in [m, H], and possibly eventually gets into the interval (0,m-), with a positive probability. Lower estimates for these probabilities are presented. If H is large enough, as the amplitude of perturbations grows, the Allee effect disappears: a solution persists for any positive initial value.