Title :
On the complexity of purely complex μ computation and related problems in multidimensional systems
Author :
Toker, Onur ; Özbay, Hitay
Author_Institution :
Dept. of Electr. Eng., California Univ., Riverside, CA, USA
fDate :
3/1/1998 12:00:00 AM
Abstract :
In this paper, the following robust control problems are shown to be NP-hard: given a purely complex uncertainty structure Δ, determine if: 1) μΔ(M)<1, for a given rational matrix M; 2) ||M(·)||μ<1, for a given rational transfer matrix M(s); and 3) inf(Q∈H∞)||F(T,Q)||μ<1, for a given linear fractional transformation F(T,Q) with rational coefficients. In other words, purely complex μ computation, analysis, and synthesis problems are NP-hard. It is also shown that checking stability and computing the H∞ norm of a multidimensional system, are NP-hard problems. Therefore, it is rather unlikely to find nonconservative polynomial time algorithms for solving the problems in complete generality
Keywords :
computational complexity; control system analysis; control system synthesis; multidimensional systems; robust control; singular value decomposition; transfer function matrices; NP-hard problem; complex uncertainty structure; computational complexity; multidimensional systems; polynomial time algorithms; rational transfer matrix; robust control; singular value decomposition; Complexity theory; Computational complexity; Control theory; Multidimensional systems; Polynomials; Stability; Systems engineering and theory; Turing machines;
Journal_Title :
Automatic Control, IEEE Transactions on
