On Cohen's stochastic generalization of the strong ergodic theorem of demography
- 1 September 1979
- journal article
- Published by Cambridge University Press (CUP) in Journal of Applied Probability
- Vol. 16 (3), 496-504
- https://doi.org/10.2307/3213079
Abstract
Cohen has generalized the classical strong ergodic theorem of demography to a stochastic setting. In this setting population projection matrices are chosen according to some homogeneous Markov chain. If this Markov chain converges to the same long-run distribution regardless of its starting point, then one can define an induced Markov chain on the product space of projection matrices and age structure vectors that also has a long-run distribution independent of its starting point. The present paper gives more natural conditions under which Cohen's result holds.Keywords
This publication has 9 references indexed in Scilit:
- Contractive inhomogeneous products of non-negative matricesMathematical Proceedings of the Cambridge Philosophical Society, 1979
- Ergodicity of age structure in populations with Markovian vital rates, III: Finite-state moments and growth rate; an illustrationAdvances in Applied Probability, 1977
- Ergodicity of age structure in populations with Markovian vital rates. II. General statesAdvances in Applied Probability, 1977
- Ergodicity of Age Structure in Populations with Markovian Vital Rates, I: Countable StatesJournal of the American Statistical Association, 1976
- On products of non-negative matricesMathematical Proceedings of the Cambridge Philosophical Society, 1976
- Convergence of the age structure: Applications of the projective metricTheoretical Population Biology, 1975
- Hilbert's metric and positive contraction mappings in a Banach spaceArchive for Rational Mechanics and Analysis, 1973
- Markov Processes. Structure and Asymptotic BehaviorPublished by Springer Nature ,1971
- PROBABILITY MEASURES IN A METRIC SPACEPublished by Elsevier ,1967