Hans-Bernd Dürr scite author profile

Extremum seeking feedback is a powerful method to steer a dynamical system to an extremum of a partially or completely unknown map. It often requires advanced system-theoretic tools to understand the qualitative behavior of extremum seeking systems. In this paper, a novel interpretation of extremum seeking is introduced. We show that the trajectories of an extremum seeking system can be approximated by the trajectories of a system which involves certain Lie brackets of the vector fields of the extremum seeking system. It turns out that the Lie bracket system directly reveals the optimizing behavior of the extremum seeking system. Furthermore, we establish a theoretical foundation and prove that uniform asymptotic stability of the Lie bracket system implies practical uniform asymptotic stability of the corresponding extremum seeking system. We use the established results in order to prove local and semi-global practical uniform asymptotic stability of the extrema of a certain map for multi-agent extremum seeking systems.

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Extremum seeking for dynamic maps using Lie brackets and singular perturbations

Dürr¹,

Krstić

Scheinker

et al. 2017

Automatica

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Saddle Point Seeking for Convex Optimization Problems

Dürr

Zeng

Ebenbauer

2013

IFAC Proceedings Volumes

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Extremum seeking on submanifolds in the Euclidian space

et al. 2014

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A smooth vector field for quadratic programming

Dürr

Saka

Ebenbauer

2012

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Hans-Bernd Dürr

Lie bracket approximation of extremum seeking systems

Extremum seeking for dynamic maps using Lie brackets and singular perturbations

Saddle Point Seeking for Convex Optimization Problems

Extremum seeking on submanifolds in the Euclidian space

A smooth vector field for quadratic programming

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