Let ${\displaystyle \{X_{n}\}}$  be a Markov chain on a general state space ${\displaystyle \Omega }$  with stochastic kernel ${\displaystyle K}$ . The kernel represents a generalized one-step transition probability law, so that ${\displaystyle P(X_{n+1}\in C\mid X_{n}=x)=K(x,C)}$  for all states ${\displaystyle x}$  in ${\displaystyle \Omega }$  and all measurable sets ${\displaystyle C\subseteq \Omega }$ . The chain ${\displaystyle \{X_{n}\}}$  is a Harris chain^[2] if there exists ${\displaystyle A\subseteq \Omega ,\varepsilon >0}$ , and probability measure ${\displaystyle \rho }$  with ${\displaystyle \rho (\Omega )=1}$  such that

1. If ${\displaystyle \tau _{A}:=\inf\{n\geq 0:X_{n}\in A\}}$ , then ${\displaystyle P(\tau _{A}<\infty \mid X_{0}=x)=1}$  for all ${\displaystyle x\in \Omega }$ .
2. If ${\displaystyle x\in A}$  and ${\displaystyle C\subseteq \Omega }$  (where ${\displaystyle C}$  is measurable), then ${\displaystyle K(x,C)\geq \varepsilon \rho (C)}$ .

The first part of the definition ensures that the chain returns to some state within ${\displaystyle A}$  with probability 1, regardless of where it starts. It follows that it visits state ${\displaystyle A}$  infinitely often (with probability 1). The second part implies that once the Markov chain is in state ${\displaystyle A}$ , its next-state can be generated with the help of an independent Bernoulli coin flip. To see this, first note that the parameter ${\displaystyle \varepsilon }$  must be between 0 and 1 (this can be shown by applying the second part of the definition to the set ${\displaystyle C=\Omega }$ ). Now let ${\displaystyle x}$  be a point in ${\displaystyle A}$  and suppose ${\displaystyle X_{n}=x}$ . To choose the next state ${\displaystyle X_{n+1}}$ , independently flip a biased coin with success probability ${\displaystyle \varepsilon }$ . If the coin flip is successful, choose the next state ${\displaystyle X_{n+1}\in \Omega }$  according to the probability measure ${\displaystyle \rho }$ . Else (and if ${\displaystyle \varepsilon <1}$ ), choose the next state ${\displaystyle X_{n+1}}$  according to the measure ${\displaystyle P(X_{n+1}\in C\mid X_{n}=x)=(K(x,C)-\varepsilon \rho (C))/(1-\varepsilon )}$  (defined for all measurable subsets ${\displaystyle C\subseteq \Omega }$ ).

Two random processes ${\displaystyle \{X_{n}\}}$  and ${\displaystyle \{Y_{n}\}}$  that have the same probability law and are Harris chains according to the above definition can be coupled as follows: Suppose that ${\displaystyle X_{n}=x}$  and ${\displaystyle Y_{n}=y}$ , where ${\displaystyle x}$  and ${\displaystyle y}$  are points in ${\displaystyle A}$ . Using the same coin flip to decide the next-state of both processes, it follows that the next states are the same with probability at least ${\displaystyle \varepsilon }$ .

Example 1: Countable state space edit

Let Ω be a countable state space. The kernel K is defined by the one-step conditional transition probabilities P[X_n+1 = y | X_n = x] for x,y ∈ Ω. The measure ρ is a probability mass function on the states, so that ρ(x) ≥ 0 for all x ∈ Ω, and the sum of the ρ(x) probabilities is equal to one. Suppose the above definition is satisfied for a given set A ⊆ Ω and a given parameter ε > 0. Then P[X_n+1 = c | X_n = x] ≥ ερ(c) for all x ∈ A and all c ∈ Ω.

Example 2: Chains with continuous densities edit

Let {X_n}, X_n ∈ R^d be a Markov chain with a kernel that is absolutely continuous with respect to Lebesgue measure:

K(x, dy) = K(x, y) dy

such that K(x, y) is a continuous function.

Pick (x₀, y₀) such that K(x₀, y₀ ) > 0, and let A and Ω be open sets containing x₀ and y₀ respectively that are sufficiently small so that K(x, y) ≥ ε > 0 on A ×  Ω. Letting ρ(C) = |Ω ∩ C|/|Ω| where |Ω| is the Lebesgue measure of Ω, we have that (2) in the above definition holds. If (1) holds, then {X_n} is a Harris chain.

In the following ${\displaystyle R:=\inf\{n\geq 1:X_{n}\in A\}}$ ; i.e. ${\displaystyle R}$  is the first time after time 0 that the process enters region ${\displaystyle A}$ . Let ${\displaystyle \mu }$  denote the initial distribution of the Markov chain, i.e. ${\displaystyle X_{0}\sim \mu }$ .

Definition: If for all ${\displaystyle \mu }$ , ${\displaystyle P[R<\infty |X_{0}\in A]=1}$ , then the Harris chain is called recurrent.

Definition: A recurrent Harris chain ${\displaystyle X_{n}}$  is aperiodic if ${\displaystyle \exists N}$ , such that ${\displaystyle \forall n\geq N}$ , ${\displaystyle \forall \mu ,P[X_{n}\in A|X_{0}\in A]>0}$ 

Theorem: Let ${\displaystyle X_{n}}$  be an aperiodic recurrent Harris chain with stationary distribution ${\displaystyle \pi }$ . If ${\displaystyle P[R<\infty |X_{0}\in A]=1}$  then as ${\displaystyle n\rightarrow \infty }$ , ${\displaystyle ||{\mathcal {L}}(X_{n}|X_{0})-\pi ||_{TV}\rightarrow 0}$  where ${\displaystyle ||\cdot ||_{TV}}$  denotes the total variation for signed measures defined on the same measurable space.