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Abstract
The paper is devoted to the study of optimal control theory with higher order differential inclusions (HODIs) and a varying time interval. Essentially, under a more general setting of problems and endpoint constraints the main goal is to establish sufficient conditions of optimality for HODIs. Thus with the use of Euler–Lagrange and Hamiltonian type of inclusions and transversal conditions on the ‘initial’ sets, the sufficient conditions are formulated. Derivation of Euler–Lagrange inclusions and -attainability conditions are real difficulties. Application of these results by solving some linear control problem
with third-order differential inclusions is illustrated. The Pontryagin maximum principle in problem
together with
-attainability condition holds.
Acknowledgements
The author would like to thank the Co-Editor, Prof. Yongzhi Steve Xu of the Journal of ‘Applicable Analysis’ and anonymous reviewers for their careful reading of the manuscript and their many insightful comments and suggestions.
Disclosure statement
No potential conflict of interest was reported by the author.