Abstract :
For use in asymptotic analysis of nonlinear time series models, we show that with
~Xt , t 0! a ~geometrically! ergodic Markov chain, the general version of the strong
law of large numbers applies+ That is, the average ~10T !(t 0
T 1 f~Xt , Xt 1, + + +!
converges almost surely to the expectation of f~Xt , Xt 1, + + +! irrespective of the
choice of initial distribution of, or value of, X0+ In the existing literature, the less
general form ~10T !(t 0
T 1 f~Xt ! has been studied+
