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Mathematical Model of Human Capital Dynamics, and necessary optimality conditions are obtained in the form of Pontryagin’s maximum principle. The model
Company management based on predictable sustainability of activities in an environment of uncertainty and efficiency of the activities of Russian public utility companies in the context of the theory of the economic
Optimal power consumption motion control of a fish-like vehicle in a vortices vector fiele conditions of optimality in the form of a Maximum Principle of Pontryagin are stated, and the features
Математическая модель системы спроса - предложения на сырье provides the basic mathematical ration with regards to using principle of maximum utility applicable
Maximum principle in problems with mixed constraints under weak assumptions of regularity weakening of the conventional regularity assumptions on mixed constraints is introduced. A maximum principle
Pontryagin's maximum principle for optimal impulsive control problemsA necessary optimality conditions in the form of Pontryagin's maximum principle for an impulsive
On some continuity properties of the measure lagrange multiplier from the maximum principle for state constrained problemsThe continuity of the Lagrange multiplier μ(t) from the maximum principle for control problems
Maximum principle and second-order conditions for minimax problems of optimal controlMaximum principle and second-order conditions for minimax problems of optimal control
L. s. Pontryagin maximum principle for some optimal control problems by trajectories pencils. An importance problem in this field is proof of Pontryagin’s maximum principle. In the paper we continue
A remark on the continuity of the measure Lagrange multiplier in state constrained optimal control problems specifically, it has been noted that the measure-multiplier from the maximum principle is continuous under
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