Delayed logistic equation as a limit of long memory Markov chains

Abstract

We introduce and analyze a long-memory continuous-time Markov chain on R+ whose jump mechanism depends explicitly on a state in the past. From the present state x0, the process jumps to x0(1+1N) or x0(1-x- τ N N2), each at rate 12, where x- τ N denotes the state located τ N jumps backward in time. Here the delay τ > 0 is fixed and N is the scaling parameter. The initial condition is prescribed by a vector of length τ N + 1, all of whose entries are equal to μ N. Using a genuine space-time replacement lemma, we prove that, as N ∞, the rescaled process converges to a deterministic limit governed by the Delayed Logistic Equation (also known as the Hutchinson equation) with delay τ and initial condition (t) μ for t ∈ [-τ, 0].