Optimal harvesting of a hierarchical age-struetured population system

We investigate an optimal harvesting problem for age-structured species,in which elder individuals are more competitive than younger ones,and the population is modeled by a highly nonlinear integro-partial differential equation with a global feedback boundary condition.The existence of optimal strategies is established by means of compactness and maximizing sequences,and the maximum principle obtained via an adjoint system,tangent-normal cones and a new continuity result.In addition,some numerical experiments are presented to show the effects of the price function and younger's weight on the optimal profits.

The global dynamics of a discrete nonlinear hierarchical population system

This paper is concerned with the global dynamics of a hierarchical population model,in which the fertility of an individual depends on the total number of higher-ranking members.We investigate the stability of equilibria,nonexistence of periodic orbits and the persistence of the population by means of eigenvalues,Lyapunov function,and several results in discrete dynamical systems.Our work demonstrates that the reproductive number governs the evolution of the population.Besides the theoretical results,some numerical experiments are also presented.

Theoretical resillts of optimal harvesting in a hierarchical size-structured population system with delay

We investigate an optimal control problem for a hierarchical size-structured populationmodel,which incorporates the inoculation delay into the globally feedbacked boundarycondition.After the establishment of the continuity of the states with respect to theharvesting efforts,the existence of the optimal solutions is proved by a result in convexanalysis,and the maximum principle is obtained via conjugate system and tangent-normal cones.