论文信息 - On strong ergodicity for nonhomogeneous continuous-time Markov chains

On strong ergodicity for nonhomogeneous continuous-time Markov chains

Let X(t) be a nonhomogeneous continuous-time Markov chain. Suppose that the intensity matrices of X(t) and some weakly or strongly ergodic Markov chain X(t) are close. Some sufficient conditions for weak and strong ergodicity of X(t) are given and estimates of the rate of convergence are proved. Queue-length for a birth and death process in the case of asymptotically proportional intensities is considered as an example.

Alexander Zeifman | Dean Isaacson

[1] Dean Isaacson,et al. Proportional intensities and strong ergodicity for Markov processes , 1983 .

[2] Alexander I. Zeifman. Some estimates of the rate of convergence for birth and death processes , 1991 .

[3] Conditions for strong ergodicity using intensity matrices , 1988 .

[4] A. Zeifman,et al. Quasi-ergodicity for non-homogeneous continuous-time Markov chains , 1989, Journal of Applied Probability.

[5] M. Kreĭn,et al. Stability of Solutions of Differential Equations in Banach Spaces , 1974 .

[6] Thomas L. Saaty,et al. Elements of Queueing Theory: With Applications , 1961 .

[7] D. Griffeath. Uniform coupling of non-homogeneous Markov chains , 1975, Journal of Applied Probability.

[8] Masaaki Kajima. On the largest negative eigenvalue of the infinitesimal generator associated with M/M/ n/n queues , 1990 .