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Optimal control and non-zero-sum differential game for Hurwicz model considering uncertain dynamic systems with multiple input delays

Author

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  • Xi Li
  • Qiankun Song
  • Yurong Liu

Abstract

Uncertainty theory is a field in axiomatic mathematics committed to disposing of belief degrees. By dint of uncertain theory and Hurwicz criterion, this article mainly addresses optimal control and non-zero-sum differential game of uncertain delay dynamic systems, which are depicted as a sort of uncertain differential equation with multiple input delays. Employing the technology of dynamic programming, the optimality principle is put forward and the optimality equation is formulated simultaneously to deal with the optimal control problem. In addition, an equilibrium equation is derived to solve the Nash equilibrium for the multi-player non-zero-sum uncertain differential game on the strength of the proposed optimality equation. An example is devised to illustrate the availability of the results in the end.

Suggested Citation

  • Xi Li & Qiankun Song & Yurong Liu, 2023. "Optimal control and non-zero-sum differential game for Hurwicz model considering uncertain dynamic systems with multiple input delays," International Journal of Systems Science, Taylor & Francis Journals, vol. 54(8), pages 1676-1693, June.
    • Handle: RePEc:taf:tsysxx:v:54:y:2023:i:8:p:1676-1693
    DOI: 10.1080/00207721.2023.2208133
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