On the NP-hardness of checking matrix polytope stability and continuous-time switching stability

Author(s)

Gurvits, Leonid; Olshevsky, Alexander

Abstract

Motivated by questions in robust control and switched linear dynamical systems, we consider the problem checking whether all convex combinations of k matrices in R[superscript ntimesn] are stable. In particular, we are interested whether there exist algorithms which can solve this problem in time polynomial in n and k. We show that if k=n[superscript d] for any fixed real d > 0, then the problem is NP-hard, meaning that no polynomial-time algorithm in n exists provided that P ne NP, a widely believed conjecture in computer science. On the other hand, when k is a constant independent of n, then it is known that the problem may be solved in polynomial time in n. Using these results and the method of measurable switching rules, we prove our main statement: verifying the absolute asymptotic stability of a continuous-time switched linear system with more than n[superscript d] matrices A[subscript i] isin R[superscript ntimesn] satisfying 0 ges A[subscript i] + A[subscript i] [superscript T] is NP-hard.

Date issued

2009-02

URI

http://hdl.handle.net/1721.1/52419

Department

Massachusetts Institute of Technology. Department of Electrical Engineering and Computer Science
Massachusetts Institute of Technology. Laboratory for Information and Decision Systems

Journal

IEEE Transactions on Automatic Control

Publisher

Institute of Electrical and Electronics Engineers

Citation

Gurvits, L., and A. Olshevsky. “On the NP-Hardness of Checking Matrix Polytope Stability and Continuous-Time Switching Stability.” Automatic Control, IEEE Transactions on 54.2 (2009): 337-341. © 2009 IEEE

Version: Final published version

ISSN

0018-9286