Models of populations in which a type or location,
represented by a point in a metric space$E$, is associated with each
individual in the population are considered. A population process is
neutral if the chances of an individual replicating or dying do not depend
on its type. Measure-valued processes are obtained as infinite population
limits for a large class of neutral population models, and it is shown that
these measure-valued processes can be represented in terms of the total mass of
the population and the de Finetti measures associated with an $E^{\infty}$
-valued particle model$X=(X_1, X_2\ldots)$ such that, for each $t \geq
0,(X_1(t),X_2(t),\ldots)$ is exchangeable. The construction gives an explicit
connection between genealogical and diffusion models in population genetics.
The class of measure-valued models covered includes both neutral Fleming-Viot
and Dawson-Watanabe processes. The particle model gives a simple representation
of the Dawson-Perkins historical process and Perkins’s historical
stochastic integral can be obtained in terms of classical semimartingale
integration. A number of applications to new and known results on conditioning,
uniqueness and limiting behavior are described.
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UNITED KINGDOM MADISON, WISCONSIN 53706-1388 E-MAIL: donnelly@stats.ox.ac.uk E-MAIL: kurtz@math.wisc.edu
