Nagylaki T
Genetics. 1975 Mar;79(3):545-50. doi: 10.1093/genetics/79.3.545.
For a system of n self-incompatibility alleles, neglecting mutation and random drift, it is shown that the completely symmetric equilibrium is locally stable, and any allelic frequency less than q equals 1 + a minus the square root of 1 + a-2, where a equals [2(n minus 1)]- minus 1, will increase. For all n, q greater than (2n)- minus 1, but if n greater than 1, q is approximately equal to (2n)- minus 1.
对于一个具有n个自交不亲和等位基因的系统,在忽略突变和随机漂变的情况下,可以证明完全对称平衡是局部稳定的,并且任何小于q的等位基因频率都会增加,其中q等于1 + a减去1 + a - 2的平方根,这里a等于[2(n - 1)] - 1。对于所有的n,q大于(2n) - 1,但如果n大于1,q近似等于(2n) - 1。
