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Auteur principal: Podobryaev, A. V.
Format: Preprint
Publié: 2022
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Accès en ligne:https://arxiv.org/abs/2203.02267
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author Podobryaev, A. V.
author_facet Podobryaev, A. V.
contents We find the attainable set for a control system on the free Carnot group of rank $3$ and step $2$ with positive controls. This kind of control systems is connected with the theory of free Lie semigroups; with some estimates for probabilities of inequalities for independent random variables; with the nilpotent approximation of robotic control systems and with contour recovering without cusps in image processing. We investigate the boundary of the attainable set with the help of the Pontryagin maximum principle for the time-optimal control problem. We study extremal trajectories that correspond to bang-bang, singular and mixed controls. We obtain upper bounds for the number of switchings for optimal controls. This implies a parametrization of the boundary faces of the attainable set.
format Preprint
id arxiv_https___arxiv_org_abs_2203_02267
institution arXiv
publishDate 2022
record_format arxiv
spellingShingle Attainable set for rank 3 step 2 free Carnot group with positive controls
Podobryaev, A. V.
Optimization and Control
Group Theory
Probability
93B03, 49K15, 35R03, 22E25, 20M05
We find the attainable set for a control system on the free Carnot group of rank $3$ and step $2$ with positive controls. This kind of control systems is connected with the theory of free Lie semigroups; with some estimates for probabilities of inequalities for independent random variables; with the nilpotent approximation of robotic control systems and with contour recovering without cusps in image processing. We investigate the boundary of the attainable set with the help of the Pontryagin maximum principle for the time-optimal control problem. We study extremal trajectories that correspond to bang-bang, singular and mixed controls. We obtain upper bounds for the number of switchings for optimal controls. This implies a parametrization of the boundary faces of the attainable set.
title Attainable set for rank 3 step 2 free Carnot group with positive controls
topic Optimization and Control
Group Theory
Probability
93B03, 49K15, 35R03, 22E25, 20M05
url https://arxiv.org/abs/2203.02267