T. K. Melikov scite author profile

The paper deals with a nonlinear discrete-time optimal control problem with a cost functional of terminal type. Using a new variation of the control and new properties of optimal controls, we prove the linearised optimality conditions extending such classical optimality conditions. Along with this, various optimality conditions of quasi-singular controls are obtained. Finally, the examples illustrating the rich content of the obtained results are illustrated.

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First- and second-order necessary conditions with respect to components for discrete optimal control problems

Mardanov

Melikov

Malik

et al. 2020

Journal of Computational and Applied Mathematics

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This paper is devoted to the study of discrete optimal control problems. We aim to obtain more constructive optimality conditions under weakened convexity assumptions. Based on a new approach introduced in this work, an optimality condition with respect to every component is obtained in the form of a global maximum principle. In addition, an optimality condition with respect to one of the components of a control in the form of the global maximum principle and with respect to another component of a control in the form of the linearized maximum principle are obtained. Furthermore, various second-order optimality conditions in terms of singular and quasi-singular controls with respect to the components are obtained on the fly.

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On Necessary Optimality Conditions for Discrete Control Systems

Mardanov¹,

Melikov²

2020

Bull.ISU.Ser.Math.

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T. K. Melikov

A New Discrete Analogue of Pontryagin’s Maximum Principle

On necessary optimality conditions in discrete control systems

First- and second-order necessary conditions with respect to components for discrete optimal control problems

On Necessary Optimality Conditions for Discrete Control Systems

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