Robust Discrete-Time Pontryagin Maximum Principle on Matrix Lie Groups
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Abstract
This article considers a discrete-time robust optimal control problem on matrix Lie groups. The underlying system is assumed to be perturbed by exogenous unmeasured bounded disturbances, and the control problem is posed as a min-max optimal control wherein the disturbance is the adversary and tries to maximise a cost that the control tries to minimise. Assuming the existence of a saddle point in the problem, we present a version of the Pontryagin maximum principle (PMP) that encapsulates first-order necessary conditions that the optimal control and disturbance trajectories must satisfy. This PMP features a saddle point condition on the Hamiltonian and a set of backward difference equations for the adjoint dynamics. We also present a special case of our result on Euclidean spaces. We conclude with applying the PMP to robust version of single axis rotation of a rigid body.
Citation
@INPROCEEDINGS{9303794,
author={Joshi, Anant A. and Chatterjee, Debasish and Banavar, Ravi N.},
booktitle={2020 59th IEEE Conference on Decision and Control (CDC)},
title={Robust Discrete-Time Pontryagin Maximum Principle on Matrix Lie Groups},
year={2020},
volume={},
number={},
pages={1086-1091},
doi={10.1109/CDC42340.2020.9303794}
}