Payoff Sensitivity of Linear Quadratic Differential Games to Parameter Change

[+] Author and Article Information
C. T. Leondes

School of Engineering and Applied Science, U.C.L.A., Los Angeles, Calif. 90024

T. K. Sui

Computer Science Department, B. C. Hydro 8, Vancouver B. C.

J. Dyn. Sys., Meas., Control 103(1), 36-38 (Mar 01, 1981) (3 pages) doi:10.1115/1.3139640 History: Received February 25, 1981; Online July 21, 2009


Both maximizing and minimizing players are concerned with the change in payoff due to small variation of system parameters. A technique is developed to derive linear algebraic matrix equations which can be used to determine the payoff sensitivity of all the parameters in linear zero- sum differential games with constant feedback. Above all, this technique is applicable for determining both the optimal strategy and payoff.

Copyright © 1981 by ASME
Topics: Feedback
Your Session has timed out. Please sign back in to continue.





Some tools below are only available to our subscribers or users with an online account.

Related Content

Customize your page view by dragging and repositioning the boxes below.

Related Journal Articles
Related eBook Content
Topic Collections

Sorry! You do not have access to this content. For assistance or to subscribe, please contact us:

  • TELEPHONE: 1-800-843-2763 (Toll-free in the USA)
  • EMAIL: asmedigitalcollection@asme.org
Sign In