Wandering phenomena in infinite-allelic diffusion models
- 1 September 1982
- journal article
- Published by Cambridge University Press (CUP) in Advances in Applied Probability
- Vol. 14 (3) , 457-483
- https://doi.org/10.2307/1426669
Abstract
We introduce a class of infinite-dimensional diffusion processes which contains a limiting version of the Ohta–Kimura model in population genetics. For this a necessary and sufficient condition for existence of stationary distributions is obtained. We are especially interested in the case where there is no stationary distribution. Then it is shown that an individual ergodic theorem holds for a suitably centralized process. As a corollary the wandering distribution exists.Keywords
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