The age of an allele in a finite population*

Takeo Maruyama

doi:10.1017/S0016672300014750

Summary

Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.

The age of an allele segregating in a finite population may be defined in two ways. They are (1) the age of a mutant gene that has never reached fixation in the population, and (2) the age including any fixation period in the past. Theoretical expressions for these are derived on the assumption that every mutant is unique.

References

REFERENCES

Ewens, W. J. (1969). Population Genetics. London: Methuen.CrossRef Google Scholar

Kimura, M. (1964). Diffusion models in population genetics. Journal of Applied Probability 1 177–232.Google Scholar

Kimura, M. (1969). The number of heterozygous nucleotide sites maintained in a finite population due to steady flux of mutations. Genetics 61, 893–903.Google Scholar

Kimura, M. & Ohta, T. (1969). The average number of generations until fixation of a mutant gene in a finite population. Genetics 61, 763–771.Google Scholar

Kimura, M. & Ohta, T. (1971). Theoretical Aspects of Population Genetics. Princeton, New Jersey: Princeton University Press.Google Scholar

Kimura, M. & Ohta, T. (1973). The age of a neutral mutant persisting in a finite population. Genetics 75, 199–212.CrossRef Google Scholar

Wright, S. (1938). The distribution of gene frequencies under irreversible mutation. Proceedings of the National Academy of Sciences, U.S.A. 24, 253–259.Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Watterson, G.A. 1976. Reversibility and the age of an allele. I. Moran's infinitely many neutral alleles model. Theoretical Population Biology, Vol. 10, Issue. 3, p. 239.

LI, WEN‐HSIUNG 1976. A note on the arrival probability, first arrival time and age of a mutant gene in a finite population. Annals of Human Genetics, Vol. 39, Issue. 4, p. 435.

LI, WEN‐HSIUNG 1976. Growth of deleterious mutant genes in a large population. Annals of Human Genetics, Vol. 39, Issue. 4, p. 441.

Levikson, Benny 1977. The age distribution of Markov processes. Journal of Applied Probability, Vol. 14, Issue. 3, p. 492.

Watterson, G.A. 1977. Reversibility and the age of an allele II. Two-allele models, with selection and mutation. Theoretical Population Biology, Vol. 12, Issue. 2, p. 179.

Littler, R.A. and Good, A.J. 1978. Ages, extinction times, and first passage probabilities for a multiallele diffusion model with irreversible mutation. Theoretical Population Biology, Vol. 13, Issue. 2, p. 214.

Tavaré, S. 1978. Age distributions for Markov processes in genetics. Advances in Applied Probability, Vol. 10, Issue. 1, p. 17.

Tavaré, S. 1979. Dual diffusions, killed diffusions, and the age distribution problem in population genetics. Theoretical Population Biology, Vol. 16, Issue. 3, p. 253.

Karlin, Samuel and Tavaré, Simon 1982. A diffusion process with killing: the time to formation of recurrent deleterious mutant genes. Stochastic Processes and their Applications, Vol. 13, Issue. 3, p. 249.

Maruyama, Takeo 1983. Stochastic theory of population genetics. Bulletin of Mathematical Biology, Vol. 45, Issue. 4, p. 521.

Barton, N.H. and Rouhani, S. 1987. The frequency of shifts between alternative equilibria. Journal of Theoretical Biology, Vol. 125, Issue. 4, p. 397.

Svirezhev, Yuri M. and Passekov, Vladimir P. 1990. Fundamentals of Mathematical Evolutionary Genetics. Vol. 22, Issue. , p. 269.

TAKAHATA, Naoyuki 1993. On the Occasion of the 25th Anniversary of the Neutral Theory. (I). Introductory comments on major papers by Professor Motoo Kimura.. The Japanese Journal of Genetics, Vol. 68, Issue. 5, p. 353.

TAKAHATA, Naoyuki 1993. Introductory comments on major papers by Professor Motoo Kimura. Genes & Genetic Systems, Vol. 68, Issue. 5, p. 353.

Slatkin, Montgomery and Rannala, Bruce 2000. Estimating Allele Age. Annual Review of Genomics and Human Genetics, Vol. 1, Issue. 1, p. 225.

Ohashi, Jun and Tokunaga, Katsushi 2000. Sojourn Times and Substitution Rate at Overdominant and Linked Neutral Loci. Genetics, Vol. 155, Issue. 2, p. 921.

Charlesworth, B. Harvey, P. H. and Slatkin, Montgomery 2000. Allele age and a test for selection on rare alleles. Philosophical Transactions of the Royal Society of London. Series B: Biological Sciences, Vol. 355, Issue. 1403, p. 1663.

Rannala, Bruce and Bertorelle, Giorgio 2001. Using linked markers to infer the age of a mutation. Human Mutation, Vol. 18, Issue. 2, p. 87.

Download full list

Article contents

The age of an allele in a finite population*

Summary

References

REFERENCES

Save article to Kindle

Save article to Dropbox

Save article to Google Drive

Reply to: Submit a response

Your details

You have entered the maximum number of contributors

Conflicting interests