On duality in optimal control problems with second-order differential inclusions and initial-point constraints

Elimhan N. Mahmudov, Misir J. Mardanov

Araştırma sonucu: Dergiye katkıMakalebilirkişi

25 Atıf (Scopus)

Özet

The paper deals with the optimal control problem described by second-order differential inclusions. Based on the infimal convolution concept of convex functions, dual problems for differential inclusions are constructed and the results of duality are proved. In this case, it turns out that Euler-Lagrange type inclusions are “duality relations” for both primary and dual problems. In particular, the linear second-order optimal control problem with the Mayer functional is considered. This problem shows that maximization in the dual problems is realized over the set of solutions of the adjoint equation. Finally, we construct the dual problem to the problem with the second-order polyhedral differential inclusion.

Orijinal dilİngilizce
Sayfa (başlangıç-bitiş)115-128
Sayfa sayısı14
DergiProceedings of the Institute of Mathematics and Mechanics
Hacim46
Basın numarası1
DOI'lar
Yayın durumuYayınlandı - 2020

Bibliyografik not

Publisher Copyright:
© 2020, Institute of Mathematics and Mechanics, National Academy of Sciences of Azerbaijan. All rights reserved.

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