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系统科学与数学 2010
ON A CONTROL PROBLEM FOR A CLASS OF POPULATION SYSTEMS WITH TIME DELAY AND AGE DISTRIBUTION
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Abstract:
An optimal harvesting problem is considered for a class of population models with discrete delay and continuous age distribution, whose state system is described by a partial functional differential equation. The existence of optimal strategy is proved by means of maximizing sequence and Mazur's theorem, and the first-order optimality conditions are derived out via normal cone and adjoint system techniques. Finally by a detailed analysis for the adjoint system, the uniqueness and the characteristic representation of the optimal controller are given.
