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Autori principali: Pouchol, Camille, Trélat, Emmanuel, Zhang, Christophe
Natura: Preprint
Pubblicazione: 2024
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Accesso online:https://arxiv.org/abs/2405.07684
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author Pouchol, Camille
Trélat, Emmanuel
Zhang, Christophe
author_facet Pouchol, Camille
Trélat, Emmanuel
Zhang, Christophe
contents Motivated by applications requiring sparse or nonnegative controls, we investigate reachability properties of linear infinite-dimensional control problems under conic constraints. Relaxing the problem to convex constraints if the initial cone is not already convex, we provide a constructive approach based on minimising a properly defined dual functional, which covers both the approximate and exact reachability problems. Our main results heavily rely on convex analysis, Fenchel duality and the Fenchel-Rockafellar theorem. As a byproduct, we uncover new sufficient conditions for approximate and exact reachability under convex conic constraints. We also prove that these conditions are in fact necessary. When the constraints are nonconvex, our method leads to sufficient conditions ensuring that the constructed controls fulfill the original constraints, which is in the flavour of bang-bang type properties. We show that our approach encompasses and generalises several works, and we obtain new results for different types of conic constraints and control systems.
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id arxiv_https___arxiv_org_abs_2405_07684
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Constructive reachability for linear control problems under conic constraints
Pouchol, Camille
Trélat, Emmanuel
Zhang, Christophe
Optimization and Control
Motivated by applications requiring sparse or nonnegative controls, we investigate reachability properties of linear infinite-dimensional control problems under conic constraints. Relaxing the problem to convex constraints if the initial cone is not already convex, we provide a constructive approach based on minimising a properly defined dual functional, which covers both the approximate and exact reachability problems. Our main results heavily rely on convex analysis, Fenchel duality and the Fenchel-Rockafellar theorem. As a byproduct, we uncover new sufficient conditions for approximate and exact reachability under convex conic constraints. We also prove that these conditions are in fact necessary. When the constraints are nonconvex, our method leads to sufficient conditions ensuring that the constructed controls fulfill the original constraints, which is in the flavour of bang-bang type properties. We show that our approach encompasses and generalises several works, and we obtain new results for different types of conic constraints and control systems.
title Constructive reachability for linear control problems under conic constraints
topic Optimization and Control
url https://arxiv.org/abs/2405.07684