Torsion Discriminance for Stability of Linear Time-Invariant Systems

Abstract

This paper proposes a new approach to describe the stability of linear time-invariant systems via the torsion τ(t) of the state trajectory. For a system r(t)=Ar(t) where A is invertible, we show that (1) if there exists a measurable set E1 with positive Lebesgue measure, such that r(0)∈ E1 implies that t+∞τ(t)≠0 or t+∞τ(t) does not exist, then the zero solution of the system is stable; (2) if there exists a measurable set E2 with positive Lebesgue measure, such that r(0)∈ E2 implies that t+∞τ(t)=+∞, then the zero solution of the system is asymptotically stable. Furthermore, we establish a relationship between the ith curvature (i=1,2,·s) of the trajectory and the stability of the zero solution when A is similar to a real diagonal matrix.