Invariant measures for Markov chains with no irreducibility assumptions
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[1] D. Kendall. Some Problems in the Theory of Queues , 1951 .
[2] F. G. Foster. On the Stochastic Matrices Associated with Certain Queuing Processes , 1953 .
[3] M. Rosenblatt. Invariant and subinvariant measures of transition probability functions acting on continuous functions , 1973 .
[4] M. Rosenblatt. Recurrent points and transition functions acting on continuous functions , 1974 .
[5] R. Tweedie. Sufficient conditions for ergodicity and recurrence of Markov chains on a general state space , 1975 .
[6] R. Tweedie. Criteria for classifying general Markov chains , 1976, Advances in Applied Probability.
[7] R. Tweedie,et al. Techniques for establishing ergodic and recurrence properties of continuous‐valued markov chains , 1978 .
[8] R. Tweedie,et al. Markov Chains with Continuous Components , 1979 .
[9] B. G. Quinn,et al. Random Coefficient Autoregressive Models: An Introduction , 1982 .
[10] R. Tweedie. The existence of moments for stationary Markov chains , 1983, Journal of Applied Probability.
[11] Sam Woolford,et al. A multiple-threshold AR(1) model , 1985, Journal of Applied Probability.
[12] Paul D. Feigin,et al. RANDOM COEFFICIENT AUTOREGRESSIVE PROCESSES:A MARKOV CHAIN ANALYSIS OF STATIONARITY AND FINITENESS OF MOMENTS , 1985 .
[13] R. L. Tweedie,et al. Moments for stationary and quasi-stationary distributions of markov chains , 1985 .