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Optimal Control of the Inverse Problem of the Burgers Equation for Representing the State of Sonic Vibration Velocity in Water

Author

Listed:
  • Jiale Qin

    (School of Science, Jiangsu University of Science and Technology, Zhenjiang 212003, China)

  • Yiping Meng

    (School of Science, Jiangsu University of Science and Technology, Zhenjiang 212003, China)

  • Shichao Yi

    (School of Science, Jiangsu University of Science and Technology, Zhenjiang 212003, China
    Yangzijiang Shipbuilding Group, Taizhou 212299, China)

Abstract

In this paper, we investigate the inverse of the set of unknown functions ( v , g ) of the Burgers equation in the framework of optimal theory. Firstly, we prove the existence of functional minimizers in the optimal control problem and derive the necessary conditions for the optimal solution. Subsequently, the global uniqueness of the optimal solution and its stability are explored. After completing the ill-posed analysis of the Burgers equation, we can apply it to the problem of sonic vibration velocity in water. The desired result is obtained by inverse-performing an unknown initial state with known terminal vibration velocity. This is important for solving practical problems.

Suggested Citation

  • Jiale Qin & Yiping Meng & Shichao Yi, 2024. "Optimal Control of the Inverse Problem of the Burgers Equation for Representing the State of Sonic Vibration Velocity in Water," Mathematics, MDPI, vol. 12(22), pages 1-9, November.
  • Handle: RePEc:gam:jmathe:v:12:y:2024:i:22:p:3625-:d:1525372
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