Ergodic Theorems for discrete Markov chains

Abstract

Let Xn be a discrete time Markov chain with state space S (countably infinite, in general) and initial probability distribution μ(0) = (P(X0=i1),P(X0=i2),·s,). What is the probability of choosing in random some k ∈ N with k ≤ n such that Xk = j where j ∈ S? This probability is the average 1n Σk=1n μ(k)j where μ(k)j = P(Xk = j). In this note we will study the limit of this average without assuming that the chain is irreducible, using elementary mathematical tools. Finally, we study the limit of the average 1n Σk=1n g(Xk) where g is a given function for a Markov chain not necessarily irreducible.