Title :
Robust Hurwitz-Schur stability conditions of polytopes of 2-D polynomials
Author_Institution :
Inst. of Inf. Sci., Northern Jiaotong Univ., Beijing, China
Abstract :
The characteristic polynomials of polytopes of recursive continuous-discrete systems are polytopes of bivariate (2-D) polynomials. Since the root domain of bivariate polynomials is in 2-D complex space, to be different from that of 1-D polynomials, the analysis for robust stability of polytopes of 2-D polynomials is much more complicated than the 1-D case. To solve the problem of the stability test of polytopes of recursive continuous-discrete systems, we establish necessary and sufficient conditions of robust Hurwitz-Schur stability of polytopes of bivariate polynomials. We show that the robust Hurwitz-Schur stability of a polytope of 2-D polynomials can be determined by testing the stability of the edges of the polytope. An example is given to demonstrate the applicability of our approach
Keywords :
asymptotic stability; continuous time systems; discrete systems; multidimensional systems; polynomials; robust control; 2D complex space; 2D polynomials; bivariate polynomials; characteristic polynomials; necessary and sufficient conditions; polytopes; recursive continuous-discrete systems; robust Hurwitz-Schur stability conditions; root domain; Asymptotic stability; Controllability; Differential equations; Indexing; Information science; Partial differential equations; Polynomials; Robust stability; Sufficient conditions; System testing;
Conference_Titel :
Decision and Control, 2001. Proceedings of the 40th IEEE Conference on
Conference_Location :
Orlando, FL
Print_ISBN :
0-7803-7061-9
DOI :
10.1109/.2001.980426
