Periodic Solutions for Nonlinear Population Dynamics Models with Age-Dependence and Spatial Structure

We consider the control problem for a population dynamics model with age dependence, spatial structure, and a nonlocal birth process arising as a boundary condition. We examine the controllability at a given time T and show that approximate controllability holds for every fixed finite time T. As a c

The instabilities of the equilibria of a class of time discrete population growth models are studied. The models describe the growth of one species with age structure, where the survival probabilities are assumed to depend on the total population. Instability occurs when the fecundities or the survi

To describe the dynamics of a resource-dependent age structured population, a general non-linear Leslie type model is derived. The dependence on the resources is introduced through the death rates of the reproductive age classes. The conditions assumed in the derivation of the model are regularity a

The large time behavior of numerical solutions for a model describing age-structured population dynamics is investigated. An upwind scheme is considered for the approximation. The optimal rate of convergence of the scheme is demonstrated for the maximum norm and the stability of the method is discus