Exponential ergodicity in Markov renewal processes
- 1 August 1968
- journal article
- Published by Cambridge University Press (CUP) in Journal of Applied Probability
- Vol. 5 (2) , 387-400
- https://doi.org/10.2307/3212260
Abstract
In [3], Kendall proved a solidarity theorem for irreducible denumerable discrete time Markov chains. Vere-Jones refined Kendall's theorem by obtaining uniform estimates [14], while Kingman proved analogous results for an irreducible continuous time Markov chain [4], [5].We derive similar solidarity theorems for an irreducible Markov renewal process. The transient case is discussed in Section 3, and Section 4 deals with the positive recurrent case. Recently Cheong also proved solidarity theorems for Semi-Markov processes [1]. His theorems use the Markovian structure, while our emphasis is on the renewal aspects of Markov renewal processes.An application to the M/G/1 queue is included in the last section.Keywords
This publication has 8 references indexed in Scilit:
- Geometric convergence of semi-Markov transition probabilitiesProbability Theory and Related Fields, 1967
- Limit Theorems for Markov Renewal ProcessesThe Annals of Mathematical Statistics, 1964
- The Exponential Decay of Markov Transition ProbabilitiesProceedings of the London Mathematical Society, 1963
- Ergodic Properties of Continuous-Time Markov Processes and Their Discrete SkeletonsProceedings of the London Mathematical Society, 1963
- GEOMETRIC ERGODICITY IN DENUMERABLE MARKOV CHAINSThe Quarterly Journal of Mathematics, 1962
- Markov Renewal Processes with Finitely Many StatesThe Annals of Mathematical Statistics, 1961
- Markov Renewal Processes: Definitions and Preliminary PropertiesThe Annals of Mathematical Statistics, 1961
- Many server queueing processes with Poisson input and exponential service timesPacific Journal of Mathematics, 1958