http://iet.metastore.ingenta.com
1887

filtering for discrete-time affine non-linear descriptor systems

filtering for discrete-time affine non-linear descriptor systems

For access to this article, please select a purchase option:

Buy article PDF
$19.95
(plus tax if applicable)
Buy Knowledge Pack
10 articles for $120.00
(plus taxes if applicable)

IET members benefit from discounts to all IET publications and free access to E&T Magazine. If you are an IET member, log in to your account and the discounts will automatically be applied.

Learn more about IET membership 

Recommend Title Publication to library

You must fill out fields marked with: *

Librarian details
Name:*
Email:*
Your details
Name:*
Email:*
Department:*
Why are you recommending this title?
Select reason:
 
 
 
 
 
IET Control Theory & Applications — Recommend this title to your library

Thank you

Your recommendation has been sent to your librarian.

In this study, the authors consider the ℋ-filtering problem for discrete-time affine non-linear descriptor systems. Two types of filters are discussed; namely, (i) singular, (ii) normal and sufficient conditions for the solvability of the problem in terms of disrete-time Hamilton–Jacobi–Isaacs equations (DHJIEs) are presented. The results are also specialised to linear systems, in which case the DHJIEs reduce to a system of linear-matrix-inequalities (LMIs). Examples are also presented to illustrate the results.

References

    1. 1)
      • Dai, L.: ‘Singular control systems’. Lecture Notes in Control and Information Sciences, Springer Verlag, Germany, 1989 (LNCS, 118).
    2. 2)
    3. 3)
    4. 4)
    5. 5)
    6. 6)
    7. 7)
    8. 8)
    9. 9)
    10. 10)
    11. 11)
    12. 12)
    13. 13)
    14. 14)
    15. 15)
      • M.D.S. Aliyu , M. Perrier . Kalman filtering for discrete-time affine nonlinear descriptor systems. Circuits Syst. Signal Process.
    16. 16)
    17. 17)
    18. 18)
    19. 19)
    20. 20)
    21. 21)
    22. 22)
      • M. Vidyasagar . (2002) Nonlinear systems analysis.
    23. 23)
      • T. Basar , G.J. Olsder . (1982) Dynamic noncooperative game theory, Mathematics in science and engineering.
    24. 24)
    25. 25)
    26. 26)
    27. 27)
      • S. Sastry . (1999) Nonlinear systems: analysis, stability and control.
    28. 28)
http://iet.metastore.ingenta.com/content/journals/10.1049/iet-cta.2011.0281
Loading

Related content

content/journals/10.1049/iet-cta.2011.0281
pub_keyword,iet_inspecKeyword,pub_concept
6
6
Loading
This is a required field
Please enter a valid email address