English

Models for Genetic Diversity Generated by Negative Binomial Point Processes

Applications 2019-05-01 v1

Abstract

We develop a model based on a generalised Poisson-Dirichlet distribution for the analysis of genetic diversity, and illustrate its use on microsatellite data for the genus Dasyurus (the quoll, a marsupial carnivore listed as near-threatened in Australia). Our class of distributions, termed PDα(r)PD_\alpha^{(r)}, is constructed from a negative binomial point process, generalizing the usual one-parameter PDαPD_\alpha model, which is constructed from a Poisson point process. Both models have at their heart a Stable(α)(\alpha) process, but in PDα(r)PD_\alpha^{(r)}, an extra parameter r>0r>0 adds flexibility, analogous to the way the negative binomial distribution allows for "overdispersion" in the analysis of count data. A key result obtained is a generalised version of Ewens' sampling formula for PDα(r)PD_\alpha^{(r)}. We outline the theoretical basis for the model, and, for the quolls data, estimate the parameters α\alpha and r by least squares, showing how the extra parameter r aids in the interpretability of the data by comparison with the standard PDαPD_\alpha model. The methods potentially have implications for the management and conservation of threatened populations.

Cite

@article{arxiv.1904.13046,
  title  = {Models for Genetic Diversity Generated by Negative Binomial Point Processes},
  author = {Yuguang F. Ipsen and Soudabeh Shemehsavar and Ross A. Maller},
  journal= {arXiv preprint arXiv:1904.13046},
  year   = {2019}
}
R2 v1 2026-06-23T08:52:59.460Z