Title :
Complexity of ten decision problems in continuous time dynamical systems
Author :
Ahmadi, Amir Ali ; Majumdar, Angshul ; Tedrake, Russ
Author_Institution :
T.J. Watson Res. Center, Dept. of Bus. Anal. & Math. Sci., IBM, Yorktown Heights, NY, USA
Abstract :
We show that for continuous time dynamical systems described by polynomial differential equations of modest degree (typically equal to three), the following decision problems which arise in numerous areas of systems and control theory cannot have a polynomial time (or even pseudo-polynomial time) algorithm unless P=NP: local attractivity of an equilibrium point, stability of an equilibrium point in the sense of Lyapunov, boundedness of trajectories, convergence of all trajectories in a ball to a given equilibrium point, existence of a quadratic Lyapunov function, invariance of a ball, invariance of a quartic semialgebraic set under linear dynamics, local collision avoidance, and existence of a stabilizing control law. We also extend our earlier NP-hardness proof of testing local asymptotic stability for polynomial vector fields to the case of trigonometric differential equations of degree four.
Keywords :
algebra; asymptotic stability; collision avoidance; computational complexity; continuous time systems; differential equations; polynomials; time-varying systems; NP-hardness proof; ball invariance; continuous time dynamical systems; control theory; decision problems; decision problems complexity; linear dynamics; local asymptotic stability; local collision avoidance; polynomial differential equations; polynomial time; polynomial vector fields; quadratic Lyapunov function; quartic semialgebraic set invariance; stabilizing control law; trajectory boundedness; trigonometric differential equations; Asymptotic stability; Complexity theory; Differential equations; Lyapunov methods; Polynomials; Trajectory; Vectors;
Conference_Titel :
American Control Conference (ACC), 2013
Conference_Location :
Washington, DC
Print_ISBN :
978-1-4799-0177-7
DOI :
10.1109/ACC.2013.6580838
