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Impact of selection on effective population size: a commentary on ‘Inbreeding in artificial selection programmes’ by Alan Robertson

Published online by Cambridge University Press:  29 October 2008

WILLIAM G. HILL*
Affiliation:
Institute of Evolutionary Biology, School of Biological Sciences, University of Edinburgh, West Mains Road, Edinburgh EH9 3JT, UK
*
*Tel: +44-131-650 5705. Fax: +44-131-650 6564. e-mail: w.g.hill@ed.ac.uk
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Abstract

Type
Article Commentary
Copyright
Copyright © 2008 Cambridge University Press

In a closed population of finite size, parents become increasingly related over generations and therefore inbreeding accumulates, heterozygosity decreases and random genetic drift of gene frequencies increases due to sampling. Under idealized conditions of random mating, discrete generations, constant population size, equal opportunities of leaving offspring and equal numbers of male and female parents, both the inbreeding coefficient and the genetic drift variance will increase in proportion to 1/2N if there are N parents. To deal with unequal numbers of male and female parents and variable family size, Wright (Reference Wright1931) defined the effective population size N e, such that the increment in inbreeding is in general 1/2N e. If the variance of family size, the number of offspring becoming parents in the next generation, is σn2 with pair mating, then N e=4N/(2+σn2) (Wright, Reference Wright1938). So, if family sizes differ only by chance about the mean of 2, i.e. are Poisson-distributed, then σn2=2 and N e=N (some second order terms have been left out of these formulae). Further complexity includes accounting for different numbers of males and females and variation in numbers of sons per sire, daughters per sire, etc. (Gowe et al., Reference Gowe, Robertson and Latter1959). In his classic paper, Robertson (Reference Robertson1961) points out that, in a population under selection for a quantitative trait, relatives of a selected individual in this and subsequent generations are also more likely to be selected, because relatives resemble each other. The variance in numbers of progeny, grand progeny and so on therefore rises progressively, N e is reduced, and the rate of inbreeding and the increment of drift variance are increased. This has implications for the design of breeding programmes, selection experiments and conservation programmes.

There are a number of steps in Robertson's prediction of the magnitude of the effect that selection has on N e. In addition to the random component, N e depends on the variance in expected numbers of selected offspring per family, which is, in turn, a function of the variance in full-sib family ‘selective advantages’ s i, such that σn2=2+var(2s i). He further argued that the selective advantage will be transmitted across generations, halving each time, to a limiting value of 2s i, so the total variance in selective advantage is var(4s i) and N e=N/(1+4σs2). Robertson (Reference Robertson1961) found ‘by trial and error’ that for mass selection an expression for the variance is σs2=i 2σb2/(σb2w2)=i 2t, where i is the selection intensity, σb2 is the variance between families, σw2 the variance within families and t the corresponding sib correlation for the quantitative trait under selection. (I am surprised that he needed trial and error, because it can be derived by the method he used to predict the heritability of a threshold trait (Robertson & Lerner, Reference Robertson and Lerner1949).) This led to the result (from eqn 2 in Robertson (Reference Robertson1961) ), N e=N/(1+4i 2t).

Robertson (Reference Robertson1961) has noted that the phenotypic and therefore the genetic variance among members of the selected group is less than that of random individuals, so the variation between the offspring families will be reduced. Hence, a correction is needed to the above equation, reducing the impact of selection on N e. These comments were more important than then realized. Firstly, heritability estimates from between family variances are biased in selected populations, as Robertson (Reference Robertson1977) elaborated later; secondly, this reduction in variation among families and consequent generation of gametic disequilibrium (Bulmer, Reference Bulmer1971) have an impact on selection response and has become known as the ‘Bulmer effect’. A further and important point Robertson (Reference Robertson1961) made was that if selection was based on an index in which information on relatives is included, the correlation of index values of relatives and consequently family selective values would be increased. Then the reduction in N e is greatest for lowly heritable traits (when t is small) as most weight is put on family mean.

Taking the relevant factors into account, Robertson (Reference Robertson1961) predicted inbreeding rates for two Drosophila experimental populations. The prediction, N e=N/2·5, was ‘in fair agreement’ for one experiment, but the prediction for the other was poorer.

Robertson's formulae were used by Nei & Murata (Reference Nei and Murata1966) to predict the impact of correlation of fertility in natural populations on effective population size. Otherwise the paper's initial impact was not large. But animal breeders were aware of the problems he raised and some took steps to limit the numbers of offspring selected from extreme individuals. It was 30 years before the formal analysis was much further developed, stimulated by the increasing refinements made in breeding programme design and the aim of balancing selection intensity against reduction in N e, a subject Robertson (Reference Robertson1960) himself had initiated. The influence of the paper as judged by the science literature took a while to grow: it was cited only three times by 1963, the citation index window, a further 15 by 1970, then 32, 57 and 90 times in the following decades to 2000, and 40 times since then, 237 to date in all.

Using simulation, I had found that his formulae overpredicted the effect of mass selection on N e, but (annoyingly) did not realize why. Wray & Thompson (Reference Wray and Thompson1990) identified the key point that, as selection increases the population mean in the next generation, the selective advantage transmitted to offspring of selected individuals is less than one-half, because their competitors are also better. They developed an analysis in terms of means and variances, or simply mean squares, of genetic contributions of Mendelian sampling terms to later generations, a methodology subsequently widely followed in this and other applications. Wray & Thompson (Reference Wray and Thompson1990) considered mass selection and cases of different numbers of male and female parents, and showed that inbreeding rates could be increased by about 75% over that in unselected populations. Results for mass selection were initially further developed by Woolliams et al. (Reference Woolliams, Wray and Thompson1993) and Santiago & Caballero (Reference Santiago and Caballero1995) and subsequently generalized to include overlapping generations, selection on index and on best linear unbiased prediction (BLUP) (Bijma & Woolliams, Reference Bijma and Woolliams2000), and linkage (Santiago & Caballero, Reference Santiago and Caballero1998).

Emphasis has now turned from predicting the effective population size in terms of numbers of selected individuals to breeding schemes in which family size is allowed to vary, selecting the most offspring from the best families, less from the next best and so on (Toro & Nieto, Reference Toro and Nieto1984). The objective is then to maximize predicted response for a specified rate of inbreeding without prior specification of family sizes or matings. Dynamic systems have been developed taking account of the predicted breeding value of each selection candidate and its relationship to all others (e.g. Meuwissen, Reference Meuwissen1997; Grundy et al., Reference Grundy, Villanueva and Woolliams1998), and to control contributions across generations (Sánchez et al., Reference Sánchez, Bijma and Woolliams2003). Other major developments have been to incorporate inbreeding rates in the design of breeding programmes to utilize single genes, a few quantitative trait locus (QTL) linked to markers, and full genotype selection using multiple markers. In these the ideas, if not the methods, of Robertson's (Reference Robertson1961) paper have persisted.

References

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