LOGIN TO YOUR ACCOUNT

Username
Password
Remember Me
Or use your Academic/Social account:

CREATE AN ACCOUNT

Or use your Academic/Social account:

Congratulations!

You have just completed your registration at OpenAire.

Before you can login to the site, you will need to activate your account. An e-mail will be sent to you with the proper instructions.

Important!

Please note that this site is currently undergoing Beta testing.
Any new content you create is not guaranteed to be present to the final version of the site upon release.

Thank you for your patience,
OpenAire Dev Team.

Close This Message

CREATE AN ACCOUNT

Name:
Username:
Password:
Verify Password:
E-mail:
Verify E-mail:
*All Fields Are Required.
Please Verify You Are Human:
fbtwitterlinkedinvimeoflicker grey 14rssslideshare1
Houlston, Paul Robert; Garvey, Seamus D.; Popov, Atanas A. (2006)
Languages: English
Types: Unknown
Subjects:
In the context of active control of rotating machines, standard optimal controller methods enable a trade-off to be made between (weighted) mean-square vibrations and (weighted) mean-square currents injected into magnetic bearings. One shortcoming of such controllers is that no concern is devoted to the voltages required. In practice, the voltage available imposes a strict limitation on the maximum possible rate of change of control force (force slew rate). This paper removes the aforementioned existing shortcomings of traditional optimal control.
  • The results below are discovered through our pilot algorithms. Let us know how we are doing!

    • [1] Zhou, K., Doyle, J. and Glover, K. (1996): Robust and Optimal Control. Prentice Hall, Upper Saddle River, N.J.
    • [2] Zhang, J. (2002): Optimal Control for Mechanical Vibration Systems Based on Second-Order Matrix Equations. Mechanical Systems and Signal Processing, 16(1), pp. 61-67.
    • [3] Chiba, A., Fukao, T., Ichikawa, O., Oshima, M., Takemoto, M. and Dorrell, D. (2005): Magnetic Bearings and Bearingless Drives. Newnes, Oxford.
    • [4] Goldstein H., Poole, C. and Safko J. (2002): Classical Mechanics. Addison-Wesley, San Fransico, Calif.
    • [5] Burl, J. (1999): Linear Optimal Control, H2 and H Infinity Methods. Addison-Wesley Menlo Park,Calif.
    • [6] Guyan R.J. (1964): Reduction of Stiffness and Mass Matrices. AIAA Journal 3(2), pp. 380
  • No related research data.
  • No similar publications.

Share - Bookmark

Cite this article