Convergence to equilibrium for density dependent Markov jump processes

Abstract

We investigate the convergence to (quasi--)equilibrium of a density dependent Markov chain in~ Zd, whose drift satisfies a system of ordinary differential equations having an attractive fixed point. For a sequence of such processes~ XN, indexed by a size parameter~N, the time taken until the distribution of~ XN, started in some given state, approaches its (quasi--)equilibrium distribution~πN typically increases with~N. To first order, it corresponds to the time~tN at which the solution to the drift equations reaches a distance of~ N from their fixed point. However, the length of the time interval over which the total variation distance between L ( XN(t)) and its (quasi--)equilibrium distribution~πN changes from being close to~1 to being close to zero is asymptotically of smaller order than~tN. In this sense, the chains exhibit `cut--off', and we are able to prove that the cut-off window is of (optimal) constant size.