On mathematical theory of selection: continuous time population dynamics

This article deals with a mathematical model of an age structured proliferating w cell population originally proposed by Lebowitz and Rubinow J. Math. Biol. 1 Ž . x 1974 , 17᎐36 . Individual cells are distinguished by age and by cell cycle length. The cell cycle length is considered as an inherited

Continuous Galerkin finite element methods in the age-time domain are proposed to approximate the solution to the model of population dynamics with unbounded mortality (coefficient) function. Stability of the method is established and a priori L 2error estimates are obtained. Treatment of the nonloc

A genetic model of a two allelic locus involving gene frequency dependent selection with overdominance or underdominance was investigated with regard to the probability of and the expected time to fixation of an allele in the face of stochastic variations arising from finite population size. Results

Selection, in the case of a variable finite population size and a two-allelic locus with overdominance, caused an acceleration in the time to fixation or loss of the favorable allele (i.e. time with selection was less than that with no selection) when the deterministic gene frequency equilibrium was