Quasimonotone systems and convergence to equilibrium in a population genetic model

The semilinear parabolic system that describes the evolution of the gene frequencies in the diffusion approximation for migration and selection at a multiallelic locus is investigated. The population occupies a finite habitat of arbitrary dimensionality and shape. The selection coefficients depend o

## Abstract We consider a fully hyperbolic phase‐field model in this paper. Our model consists of a damped hyperbolic equation of second order with respect to the phase function χ(__t__) , which is coupled with a hyperbolic system of first order with respect to the relative temperature θ(__t__) and

Nine populations (Germans, Turks, Moroccans, Ovambos, Ugandans, Chinese, Japanese, Papuans, and Australian Aborigines) were investigated using six microsatellite systems (HumCD4, Hum F13B, HumFES/FPS, HumTH01, HumVWA, and D21S11), so-called STRs (short tandem repeats). Allele frequency data and sequ