Ronald Fisher and
Sewall Wright originally defined effective population size as "the number of breeding individuals in an
idealised population that would show the same amount of dispersion of
allele frequencies under random
genetic drift or the same amount of
inbreeding as the population under consideration". This implied two potentially different effective population sizes, based either on the one-generation increase in variance across replicate populations
(variance effective population size), or on the one-generation change in the inbreeding coefficient
(inbreeding effective population size). These two are closely linked, and derived from
F-statistics, but they are not identical. Today, the effective population size is usually estimated empirically with respect to the amount of within-species
genetic diversity divided by the
mutation rate, yielding a
coalescent effective population size that reflects the cumulative effects of genetic drift, background selection, and genetic hitchhiking over longer time periods. Another important effective population size is the
selection effective population size 1/scritical, where scritical is the critical value of the
selection coefficient at which selection becomes more important than
genetic drift.
Variance effective size In the
Wright-Fisher idealized population model, the
conditional variance of the allele frequency p', given the
allele frequency p in the previous generation, is :\operatorname{var}(p' \mid p)= {p(1-p) \over 2N}. Let \widehat{\operatorname{var}}(p'\mid p) denote the same, typically larger, variance in the actual population under consideration. The variance effective population size N_e^{(v)} is defined as the size of an idealized population with the same variance. This is found by substituting \widehat{\operatorname{var}}(p'\mid p) for \operatorname{var}(p'\mid p) and solving for N which gives :N_e^{(v)} = {p(1-p) \over 2 \widehat{\operatorname{var}}(p)}. In the following examples, one or more of the assumptions of a strictly idealised population are relaxed, while other assumptions are retained. The variance effective population size of the more relaxed population model is then calculated with respect to the strict model.
Variations in population size Population size varies over time. Suppose there are
t non-overlapping
generations, then effective population size is given by the
harmonic mean of the population sizes: :{1 \over N_e} = {1 \over t} \sum_{i=1}^t {1 \over N_i} For example, say the population size was
N = 10, 100, 50, 80, 20, 500 for six generations (
t = 6). Then the effective population size is the
harmonic mean of these, giving: : Note this is less than the
arithmetic mean of the population size, which in this example is 126.7. The harmonic mean tends to be dominated by the smallest
bottleneck that the population goes through.
Dioeciousness If a population is
dioecious, i.e. there is no
self-fertilisation then :N_e = N + \begin{matrix} \frac{1}{2} \end{matrix} or more generally, :N_e = N + \begin{matrix} \frac{D}{2} \end{matrix} where
D represents dioeciousness and may take the value 0 (for not dioecious) or 1 for dioecious. When
N is large,
Ne approximately equals
N, so this is usually trivial and often ignored: :N_e = N + \begin{matrix} \frac{1}{2} \approx N \end{matrix}
Variance in reproductive success If population size is to remain constant, each individual must contribute on average two
gametes to the next generation. An idealized population assumes that this follows a
Poisson distribution so that the
variance of the number of gametes contributed,
k is equal to the
mean number contributed, i.e. 2: :\operatorname{var}(k) = \bar{k} = 2. However, in natural populations the variance is often larger than this. The vast majority of individuals may have no offspring, and the next generation stems only from a small number of individuals, so :\operatorname{var}(k) > 2. The effective population size is then smaller, and given by: :N_e^{(v)} = {4 N - 2D \over 2 + \operatorname{var}(k)} Note that if the variance of
k is less than 2,
Ne is greater than
N. In the extreme case of a population experiencing no variation in family size, in a laboratory population in which the number of offspring is artificially controlled,
Vk = 0 and
Ne = 2
N.
Non-Fisherian sex-ratios When the
sex ratio of a population varies from the
Fisherian 1:1 ratio, effective population size is given by: :N_e^{(v)} = N_e^{(F)} = {4 N_m N_f \over N_m + N_f} Where
Nm is the number of males and
Nf the number of females. For example, with 80 males and 20 females (an absolute population size of 100): : Again, this results in
Ne being less than
N.
Inbreeding effective size Alternatively, the effective population size may be defined by noting how the average
inbreeding coefficient changes from one generation to the next, and then defining
Ne as the size of the idealized population that has the same change in average inbreeding coefficient as the population under consideration. The presentation follows Kempthorne (1957). For the idealized population, the inbreeding coefficients follow the recurrence equation :F_t = \frac{1}{N}\left(\frac{1+F_{t-2}}{2}\right)+\left(1-\frac{1}{N}\right)F_{t-1}. Using Panmictic Index (1 −
F) instead of inbreeding coefficient, we get the approximate recurrence equation :1-F_t = P_t = P_0\left(1-\frac{1}{2N}\right)^t. The difference per generation is :\frac{P_{t+1}}{P_t} = 1-\frac{1}{2N}. The inbreeding effective size can be found by solving :\frac{P_{t+1}}{P_t} = 1-\frac{1}{2N_e^{(F)}}. This is :N_e^{(F)} = \frac{1}{2\left(1-\frac{P_{t+1}}{P_t}\right)} .
Theory of overlapping generations and age-structured populations When organisms live longer than one breeding season, effective population sizes have to take into account the
life tables for the species.
Haploid Assume a haploid population with discrete age structure. An example might be an organism that can survive several discrete breeding seasons. Further, define the following age structure characteristics: : v_i =
Fisher's reproductive value for age i, : \ell_i = The chance an individual will survive to age i, and : N_0 = The number of newborn individuals per breeding season. The
generation time is calculated as : T = \sum_{i=0}^\infty \ell_i v_i = average age of a reproducing individual Then, the inbreeding effective population size is :N_e^{(F)} = \frac{N_0T}{1 + \sum_i\ell_{i+1}^2v_{i+1}^2(\frac{1}{\ell_{i+1}}-\frac{1}{\ell_i})}.
Diploid Similarly, the inbreeding effective number can be calculated for a diploid population with discrete age structure. This was first given by Johnson, but the notation more closely resembles Emigh and Pollak. Assume the same basic parameters for the life table as given for the haploid case, but distinguishing between male and female, such as
N0
ƒ and
N0
m for the number of newborn females and males, respectively (notice lower case
ƒ for females, compared to upper case
F for inbreeding). The inbreeding effective number is : \begin{align} \frac{1}{N_e^{(F)}} = \frac{1}{4T}\left\{\frac{1}{N_0^f}+\frac{1}{N_0^m} + \sum_i\left(\ell_{i+1}^f\right)^2\left(v_{i+1}^f\right)^2\left(\frac{1}{\ell_{i+1}^f}-\frac{1}{\ell_i^f}\right)\right. \,\,\,\,\,\,\,\, & \\ \left. {} + \sum_i\left(\ell_{i+1}^m\right)^2\left(v_{i+1}^m\right)^2\left(\frac{1}{\ell_{i+1}^m}-\frac{1}{\ell_i^m}\right) \right\}. & \end{align} ==See also==