State-discretization of V-geometrically ergodic Markov chains and convergence to the stationary distribution

Abstract

Let (Xn)n ∈N be a V-geometrically ergodic Markov chain on a measurable space X with invariant probability distribution π. In this paper, we propose a discretization scheme providing a computable sequence (πk)k 1 of probability measures which approximates π as k growths to infinity. The probability measure πk is computed from the invariant probability distribution of a finite Markov chain. The convergence rate in total variation of (πk)k 1 to π is given. As a result, the specific case of first order autoregressive processes with linear and non-linear errors is studied. Finally, illustrations of the procedure for such autoregressive processes are provided, in particular when no explicit formula for π is known.