AbstractIt is well known that stationary geometrically ergodic Markov chains are
$\beta$
-mixing (absolutely regular) with geometrically decaying mixing coefficients. Furthermore, for initial distributions other than the stationary one, geometric ergodicity implies
$\beta$
-mixing under suitable moment assumptions. In this note we show that similar results hold also for subgeometrically ergodic Markov chains. In particular, for both stationary and other initial distributions, subgeometric ergodicity implies
$\beta$
-mixing with subgeometrically decaying mixing coefficients. Although this result is simple, it should prove very useful in obtaining rates of mixing in situations where geometric ergodicity cannot be established. To illustrate our results we derive new subgeometric ergodicity and
$\beta$
-mixing results for the self-exciting threshold autoregressive model.
Geometric ergodicity of affine processes on cones
