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Metzler asymptotic stability of initial time linear time-varying real-order systems

Bichitra Kumar Lenka, Swaroop Nandan Bora

2023Franklin Open12 citationsDOIOpen Access PDF

Abstract

Determining the asymptotics of many time-varying systems associated with real orders remains a challenging issue in qualitative asymptotic theory. This paper introduces a new concept of Metzler asymptotic stability to linear time-varying real-order systems. The design class is considered in standard and block matrix forms whenever the initial time is defined on the real axis. The non-negativity of such systems is discussed by introducing a time-dependent Metzler matrix. New theoretical conditions are developed that guarantee the asymptotic stability of such systems. It is shown that, to ensure the Metzler asymptotic stability of such systems; it suffices to construct a suitable linear non-negative asymptotic stable system where the coefficient matrix should be Metzler. Examples illustrate the potential practical and promising applicability of the introduced results.

Topics & Concepts

Exponential stabilityStability (learning theory)MathematicsLinear systemMatrix (chemical analysis)Applied mathematicsClass (philosophy)Block (permutation group theory)Mathematical analysisNonlinear systemComputer scienceGeometryArtificial intelligenceComposite materialMachine learningQuantum mechanicsPhysicsMaterials scienceControl Systems and IdentificationMatrix Theory and AlgorithmsAdvanced Control Systems Design
Metzler asymptotic stability of initial time linear time-varying real-order systems | Litcius