Advances in Differential Equations and Control Processes

The Advances in Differential Equations and Control Processes is an esteemed international journal indexed in the Emerging Sources Citation Index (ESCI). It publishes original research articles related to recent developments in both theory and applications of ordinary and partial differential equations, integral equations, and control theory. The journal highlights the interdisciplinary nature of these topics, with applications in physical, biological, environmental, and health sciences, mechanics, and engineering. It also considers survey articles that identify future avenues of advancement in the field.

Submit Article

DECOUPLING OF NONLINEAR CONTROL SYSTEM BASED ON LIE SYMMETRY METHOD

Authors

  • Zheng Mingliang
  • Nie Wenyan
  • Cheng Daguang
  • Yu Liang

Keywords:

decoupling control, Lie symmetry, infinitesimal generator

DOI:

https://doi.org/10.17654/0974324324014

Abstract

The Lie symmetry method is introduced for the decoupling problem of nonlinear control system. Firstly, the key technology of Lie symmetry theory for differential equations is introduced; secondly, a kind of nonlinear control system model is established, and the conditions and properties of Lie symmetry are given in detail. Finally, the decoupling global and local forms of the system are given through the derived distribution of infinitesimal generators. The numerical results show the effectiveness of Lie symmetry method. As long as the infinitesimal generator is constructed, the cascade decoupling form of nonlinear control system could be obtained.

Received: March 20, 2024
Revised: April 25, 2024
Accepted: May 6, 2024

References

Ma Ping, Yang Jinfang, Cui Changchun and Hu Shengkun, The status and development of decoupling control, Control Engineering 12(2) (2005), 98-101 (in Chinese).

Liu Tao, Zhang Weidong, Gu Shengying and Cai Yunze, The progress in frequency domain decoupling control design of chemical processes with multivariable and time delay, Acta Automat. Sinica 32(1) (2006), 73-83 (in Chinese).

Chai Tianyou, The indirect adaptive decoupling control algorithm for multivariable, Acta Automat. Sinica 17(5) (1991), 51-54 (in Chinese).

Xue Fuzhen, Genetic optimization method for multivariable decoupling robust control, Journal of China University of Science and Technology 31(6) (2001), 721-726 (in Chinese).

T. Y. Chai, Multivariable intelligent decoupling control and its application, Proceedings of the 3rd World Congress on Intelligent Control and Automation, Hefei, 2000.

Zhao Lina and Yang Xu, A class of constrained generalized predictive decoupling control, Computer and Digital Engineering 11 (2015), 1918-1923 (in Chinese).

Zou Runmin and M. Malabre, Almost disturbance decoupling and pole placement, Automatica 26(11) (2009), 2685-2691.

Stefan Grünvogel, Semilinear control systems with symmetry, ZAMM Z. Angew. Math. Mech. 78 (1998), 927-928.

Nail H. Ibragimov, Differential Equation and mathematical Physical Equation, Higher Education Press, Beijing, 2013 (in Chinese).

G. W. Blumen and S. C. Bianco, The Symmetry and Integral Method of Differential Equations, Science Press, Beijing, 2009 (in Chinese).

Xie Xiaoxin, Liu Xiaoping and Zhang Siying, Structural simplification of symmetric nonlinear systems, Control Theory and Applications 9(2) (1992), 125 129 (in Chinese).

Zhao Jun and Zhang Siying, Generalized symmetry and controllability of nonlinear control systems, Chinese Sci. Bull. 18(1) (1991), 1428-1430 (in Chinese).

A. Palazoglu and A. Karakas, Control of nonlinear distributed parameter systems using generalized invariants, Automatica 36(5) (2000), 697-703 (in Chinese).

A. Palazoglu, A. Karakas and S. Godasi, Control of nonlinear distributed parameter processes using symmetry groups and invariance conditions, Computers and Chemical Engineering 26(7) (2002), 1023-1036.

G. S. F. Frederico and D. F. M. Torres, Fractional conservation laws in optimal control theory, Nonlinear Dyn. 53(3) (2008), 215-222.

D. F. M. Torres, On the Noether theorem for optimal control, Eur. J. Control 8 (2002), 56-63.

Liu Xiaoping, Symmetrical structure and disturbance decoupling of nonlinear control system, Journal of Northeast Institute of Technology 13(3) (1992), 249 253 (in Chinese).

Zhao Jun, Jing Yuanwei and Zhang Siying, Cascade decoupling standard form of symmetric nonlinear control system, Acta Automat. Sinica 23(2) (1997), 239 243 (in Chinese).

Downloads

Published

2024-05-11

Issue

Vol. 31 No. 2 (2024)

Section

Articles

License

Copyright (c) 2024 Pushpa Publishing House, Prayagraj, India

Creative Commons License

This work is licensed under a Creative Commons Attribution 4.0 International License.

Licensing Terms:

Attribution: Credit Pushpa Publishing House as the original publisher, including title and author(s) if applicable.

Non-Commercial Use: For non-commercial purposes only. No commercial activities without explicit permission.

No Derivatives: Modifying or creating derivative works not allowed without written permission.

Contact Pushpa Publishing House for more info or permissions.

How to Cite

DECOUPLING OF NONLINEAR CONTROL SYSTEM BASED ON LIE SYMMETRY METHOD. (2024). Advances in Differential Equations and Control Processes, 31(2), 275-283. https://doi.org/10.17654/0974324324014

Similar Articles

1-10 of 21

You may also start an advanced similarity search for this article.