Yet another look at Harris' ergodic theorem for Markov chains
Martin Hairer, Jonathan C. Mattingly
Setting and main result
Throughout this note, we fix a measurable space and a Markov transition kernel on . We will use the notation for the operators defined as usual on both the set of bounded measurable functions and the set of measures of finite mass by
Hence we are using both to denote the action on functions and its duel action on measure. Note that extends trivially to measurable functions . We first assume that satisfies the following geometric drift condition:
There exists a function and constants and such that