Improved finite-time stability and instability theorems for stochastic nonlinear systems
Abstract
This paper studies finite-time stability and instability theorems in probability sense for stochastic nonlinear systems. Firstly, a new sufficient condition is proposed to guarantee that the considered system has a global solution. Secondly, we propose improved finite-time stability and instability criteria that relax the constraints on LV (the infinitesimal operator of Lyapunov function V) by the uniformly asymptotically stable function(UASF). The improved finite-time stability theorems allow LV to be indefinite (negative or positive) rather than just only allow LV to be negative. Most existing finite-time stability and instability results can be viewed as special cases of the obtained theorems. Finally, some simulation examples verify the validity of the theoretical results.
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