General selection model

The general selection model (GSM) is a model of population genetics that describes how a population's allele frequencies will change when acted upon by natural selection.[1][better source needed]

Equation

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The General Selection Model applied to a single gene with two alleles (let's call them A1 and A2) is encapsulated by the equation:

 
where:
  is the frequency of allele A1
  is the frequency of allele A2
  is the rate of evolutionary change of the frequency of allele A2
  are the relative fitnesses of homozygous A1, heterozygous (A1A2), and homozygous A2 genotypes respectively.
  is the mean population relative fitness.

In words:

The product of the relative frequencies,  , is a measure of the genetic variance. The quantity pq is maximized when there is an equal frequency of each gene, when  . In the GSM, the rate of change   is proportional to the genetic variation.

The mean population fitness   is a measure of the overall fitness of the population. In the GSM, the rate of change   is inversely proportional to the mean fitness  —i.e. when the population is maximally fit, no further change can occur.

The remainder of the equation,  , refers to the mean effect of an allele substitution. In essence, this term quantifies what effect genetic changes will have on fitness.

See also

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References

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  1. ^ Benjamin A. Pierce (9 January 2006). Transmission and Population Genetics. W. H. Freeman. ISBN 978-0-7167-8387-9.