Description of Stability for Linear Time-Invariant Systems Based on the First Curvature

Abstract

This paper focuses on using the first curvature (t) of trajectory to describe the stability of linear time-invariant system. We extend the results for two and three-dimensional systems [Y. Wang, H. Sun, Y. Song et al., arXiv:1808.00290] to n-dimensional systems. We prove that for a system r(t)=Ar(t), (i) if there exists a measurable set whose Lebesgue measure is greater than zero, such that for all initial values in this set, t+∞(t)≠0 or t+∞(t) does not exist, then the zero solution of the system is stable; (ii) if the matrix A is invertible, and there exists a measurable set whose Lebesgue measure is greater than zero, such that for all initial values in this set, t+∞(t)=+∞, then the zero solution of the system is asymptotically stable.