Optimal control of stochastic prey-predator models
F., El-Gohary, A., and Bukhari, . 2003
Optimal control of stochastic prey–predator models during infinite and finite time intervals is considered. Optimal feedback controlling functions are derived as non-linear functions of the densities of prey and predator populations using Lyapunov–Bellman technique. The densities of both prey and predator populations are obtained as functions of time. We will be concerned with time intervals of the control process and time dependence of the control functions.
A spatial stochastic model to study the optimal stabilization of the steady-states of the genital herpes epidemic is introduced. The steady-states of this model are found. The stability and…
The problem of optimal control of the equilibrium states of the Lorenz system in both finite and infinite time intervals has been studied. The optimal control functions ensuring asymptotic…
Optimal control of stochastic prey–predator models during infinite and finite time intervals is considered. Optimal feedback controlling functions are derived as non-linear functions of the…