Robust (Strictly) Positive Interval Rational Functions
Document Type
Article
Publication Date
1-1-1991
Abstract
In a recent paper by Bose and Dalansky [ll Dasguata's result [10] has been extended to study the robustness of positive complex (PC) rational and strictly positive complex (SPC) rational properties for a complex interval rational function. It is concluded that the PC (SPC) property of the specific 64 extreme members of the set can imply the PC (SPC) property of the set. In this paper, it is proven that the PC (SPC) property of a complex interval rational function can be guaranteed by the PC (SPC) property of its certain 32 extreme members, which are a subset of those 64 extreme members defined in [11]. © 1991 IEEE
Identifier
0026155672 (Scopus)
Publication Title
IEEE Transactions on Circuits and Systems
External Full Text Location
https://doi.org/10.1109/31.76493
ISSN
00984094
First Page
552
Last Page
554
Issue
5
Volume
38
Recommended Citation
    Shi, Y. Q., "Robust (Strictly) Positive Interval Rational Functions" (1991). Faculty Publications.  17601.
    
    
    
        https://digitalcommons.njit.edu/fac_pubs/17601
    
 
				 
					