Advances in Natural Science

The differential equation for moving genome of panmictic and inbred populations is found. These equations have allowed find the dependence of the population movement speed on various parameters: average time of a generation alternation, the area of the territory developed by the population for certain time, length of a wave of the moving population and inbreeding factor. The nonlinear differential equation of the third order reflecting natural selection in a population is found. Research of the migrating inbred population at present of natural selection
has allowed to fined a condition of the allele frequency preservation at women in Х-chromosomes.

Dodd R., Eilbek G., Ghibbon G., & Morris G. (1998). Solitons and nonlinear wave equations (p. 696). Moscow, World.

Muller, H. J. (1950). Our load of mutation. Am. J. Hum. Genet., 2, 111-176.

Vogel, F., & Motulsky, A. (1990). Human genetics (Volumes 1, 2 & 3, p.1068). Berlin: Springer-Verlag.

Volobuev, A. N., Romanchuk, P. I., & Malishev, V. K. (2013). Population and mutagenesis or about Hardy and Weinberg one methodical mistake. Advances in Natural Science, 6(4), 55-63.

Volobuev, A. N., Romanchuk, P. I., & Malishev, V. K. (2014). Nonlinear genetics, inbreeding and genetic load. Advances in Natural Science, 7(1), 1-5.

Volobuev, A. N. (2005). Population development of genome in conditions of radiating environment. Moscow, Mathematical modeling, 17(7), 31-38.

Volobuev, A. N., Neganov, V. A., & Zajtsev, V. V. (1998). Physical and mathematical nature of the nervous pulse. (1998). Samara, Physics of Wave Processes and Radio Engineering Systems, 1(2-3), 108-110.

Zajtsev, V. F., & Polanin, F. D. (1996). Handbook on the differential equations with particular derivatives: Accuracy solutions(p.438). Moscow, International Program of Education.