Title of article
Probability distribution of haplotype frequencies under the two-locus Wright–Fisher model by diffusion approximation
Author/Authors
Simon Boitard، نويسنده , , Patrice Loisel، نويسنده ,
Issue Information
دوماهنامه با شماره پیاپی سال 2007
Pages
12
From page
380
To page
391
Abstract
The probability distribution of haplotype frequencies in a population, and the way it is influenced by genetical forces such as recombination, selection, random drift … is a question of fundamental interest in population genetics. For large populations, the distribution of haplotype frequencies for two linked loci under the classical Wright–Fisher model is almost impossible to compute because of numerical reasons. However the Wright–Fisher process can in such cases be approximated by a diffusion process and the transition density can then be deduced from the Kolmogorov equations. As no exact solution has been found for these equations, we developed a numerical method based on finite differences to solve them. It applies to transient states and models including selection or mutations. We show by several tests that this method is accurate for computing the conditional joint density of haplotype frequencies given that no haplotype has been lost. We also prove that it is far less time consuming than other methods such as Monte Carlo simulations
Keywords
Finite difference scheme , Kolmogorov forward equation , Wright–Fisher model , Diffusion processes
Journal title
Theoretical Population Biology
Serial Year
2007
Journal title
Theoretical Population Biology
Record number
773980
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