Email this article On the Relationship Between the Pontryagin Maximum Principle and the Hamilton–Jacobi–Bellman Equation in Optimal Control Problems for Fractional-Order Systems
- Authors: Gomoyunov M.I.1,2
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Affiliations:
- Krasovskii Institute of Mathematics and Mechanics, Ural Branch, Russian Academy of Sciences, Yekaterinburg, 620108, Russia
- Ural Federal University, Yekaterinburg, 620002, Russia
- Issue: Vol 59, No 11 (2023)
- Pages: 1515-1521
- Section: Articles
- URL: https://journals.rcsi.science/0374-0641/article/view/233717
- DOI: https://doi.org/10.31857/S0374064123110067
- EDN: https://elibrary.ru/PEGKMT
- ID: 233717
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Abstract
We consider the optimal control problem of minimizing the terminal cost functional for a dynamical system whose motion is described by a differential equation with Caputo fractional derivative. The relationship between the necessary optimality condition in the form of Pontryagin’s maximum principle and the Hamilton–Jacobi–Bellman equation with so-called fractional coinvariant derivatives is studied. It is proved that the costate variable in the Pontryagin maximum principle coincides, up to sign, with the fractional coinvariant gradient of the optimal result functional calculated along the optimal motion.
About the authors
M. I. Gomoyunov
Krasovskii Institute of Mathematics and Mechanics, Ural Branch, Russian Academy of Sciences, Yekaterinburg, 620108, Russia; Ural Federal University, Yekaterinburg, 620002, Russia
Author for correspondence.
Email: m.i.gomoyunov@gmail.com
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