Litcius/Paper detail

Exponential Stability With RISE Controllers

Omkar Sudhir Patil, Axton Isaly, Bin Xian, Warren E. Dixon

2021IEEE Control Systems Letters36 citationsDOI

Abstract

A class of continuous robust controllers termed Robust Integral of the Sign of the Error (RISE) have been published over the past two decades as a means to yield asymptotic tracking error convergence and asymptotic identification of time-varying uncertainties, for classes of nonlinear systems that are subject to sufficiently smooth bounded exogenous disturbances and/or modeling uncertainties. Despite the wide application of RISE-based techniques, an open question that has eluded researchers during this time-span is whether the asymptotic tracking error convergence is also uniform or exponential. This question has remained open due to certain limitations in the traditional construction of a Lyapunov function for RISE-based error systems. In this letter, new insights on the construction of a Lyapunov function are used that result in an exponential stability result for RISE-based controllers. As an outcome of this breakthrough, the inherent learning capability of RISE-based controllers is shown to yield exponential identification of state-dependent disturbances/uncertainty.

Topics & Concepts

Exponential stabilityLyapunov functionControl theory (sociology)Exponential functionTracking errorBounded functionConvergence (economics)MathematicsExponential growthRobust controlComputer scienceNonlinear systemApplied mathematicsControl (management)Mathematical analysisArtificial intelligenceEconomicsQuantum mechanicsPhysicsEconomic growthAdaptive Control of Nonlinear SystemsAdvanced Control Systems OptimizationControl Systems and Identification