Litcius/Paper detail

<i>L</i>₁-Robust Interval Observer Design for Uncertain Nonlinear Dynamical Systems

Tarun Pati, Mohammad Khajenejad, Sai Praveen Daddala, Sze Zheng Yong

2022IEEE Control Systems Letters15 citationsDOI

Abstract

This paper presents a novel interval observer design for uncertain locally Lipschitz continuous-time (CT) and discrete-time (DT) systems with noisy nonlinear observations that is input-to-state stable (ISS) and minimizes the L1-gain of the observer error system with respect to the uncertainties. Using mixed-monotone decompositions, the proposed observer is correct and positive by construction without the need for additional constraints/assumptions. This, in turn, allows us to directly leverage techniques for positive systems to design an ISS and L1-robust interval observer via mixed-integer (linear) programs instead of semi-definite programs with linear matrix inequalities. Further, our observer design offers additional degrees of freedom that may serve as a surrogate for coordinate transformations. Finally, we demonstrate the effectiveness of our proposed observer on some CT and DT systems.

Topics & Concepts

Observer (physics)Lipschitz continuityControl theory (sociology)Interval (graph theory)Nonlinear systemMathematicsComputer scienceAlpha beta filterLinear matrix inequalityState observerMathematical optimizationArtificial intelligenceKalman filterStatisticsExtended Kalman filterQuantum mechanicsMoving horizon estimationCombinatoricsControl (management)Mathematical analysisPhysicsAdvanced Control Systems OptimizationStability and Control of Uncertain SystemsControl Systems and Identification