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Manifold Calculus in System Theory and Control—Fundamentals and First-Order Systems

Simone Fiori

2021Symmetry23 citationsDOIOpen Access PDF

Abstract

The aim of the present tutorial paper is to recall notions from manifold calculus and to illustrate how these tools prove useful in describing system-theoretic properties. Special emphasis is put on embedded manifold calculus (which is coordinate-free and relies on the embedding of a manifold into a larger ambient space). In addition, we also consider the control of non-linear systems whose states belong to curved manifolds. As a case study, synchronization of non-linear systems by feedback control on smooth manifolds (including Lie groups) is surveyed. Special emphasis is also put on numerical methods to simulate non-linear control systems on curved manifolds. The present tutorial is meant to cover a portion of the mentioned topics, such as first-order systems, but it does not cover topics such as covariant derivation and second-order dynamical systems, which will be covered in a subsequent tutorial paper.

Topics & Concepts

Manifold (fluid mechanics)Cover (algebra)EmbeddingDynamical systems theoryCenter manifoldComputer scienceOrder (exchange)Linear systemCalculus (dental)Covariant transformationSynchronization (alternating current)Space (punctuation)Covering spaceMathematicsAlgebra over a fieldTopology (electrical circuits)Pure mathematicsNonlinear systemMathematical analysisGeometryMechanical engineeringEngineeringOperating systemArtificial intelligenceMedicineFinancePhysicsBifurcationCombinatoricsQuantum mechanicsEconomicsHopf bifurcationDentistryQuantum chaos and dynamical systemsNonlinear Dynamics and Pattern FormationControl and Stability of Dynamical Systems