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Manifold turnpikes, trims, and symmetries

Timm Faulwasser, Kathrin Flaßkamp, Sina Ober‐Blöbaum, Manuel Schaller, Karl Worthmann

2022Mathematics of Control Signals and Systems21 citationsDOIOpen Access PDF

Abstract

Abstract Classical turnpikes correspond to optimal steady states which are attractors of infinite-horizon optimal control problems. In this paper, motivated by mechanical systems with symmetries, we generalize this concept to manifold turnpikes. Specifically, the necessary optimality conditions projected onto a symmetry-induced manifold coincide with those of a reduced-order problem defined on the manifold under certain conditions. We also propose sufficient conditions for the existence of manifold turnpikes based on a tailored notion of dissipativity with respect to manifolds. Furthermore, we show how the classical Legendre transformation between Euler–Lagrange and Hamilton formalisms can be extended to the adjoint variables. Finally, we draw upon the Kepler problem to illustrate our findings.

Topics & Concepts

MathematicsInvariant manifoldHomogeneous spaceManifold (fluid mechanics)Center manifoldLegendre transformationEuler–Lagrange equationPure mathematicsOptimal controlApplied mathematicsSymmetry (geometry)Mathematical analysisMathematical optimizationLagrangianBifurcationNonlinear systemGeometryMechanical engineeringHopf bifurcationEngineeringPhysicsQuantum mechanicsControl and Stability of Dynamical SystemsControl and Dynamics of Mobile RobotsAdvanced Differential Equations and Dynamical Systems