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Autori principali: Dilip, A. Sanand Amita, Athalye, Chirayu D.
Natura: Preprint
Pubblicazione: 2023
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Accesso online:https://arxiv.org/abs/2310.00589
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author Dilip, A. Sanand Amita
Athalye, Chirayu D.
author_facet Dilip, A. Sanand Amita
Athalye, Chirayu D.
contents Structural controllability challenges arise from imprecise system modeling and system interconnections in large scale systems. In this paper, we study structural control of bilinear systems on the special Euclidean group. We employ graph theoretic methods to analyze the structural controllability problem for driftless bilinear systems and structural accessibility for bilinear systems with drift. This facilitates the identification of a sparsest pattern necessary for achieving structural controllability and discerning redundant connections. To obtain a graph theoretic characterization of structural controllability and accessibility on the special Euclidean group, we introduce a novel idea of solid and broken edges on graphs; subsequently, we use the notion of transitive closure of graphs.
format Preprint
id arxiv_https___arxiv_org_abs_2310_00589
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Structural Controllability of Bilinear Systems on $\mathbb{SE(n)}$
Dilip, A. Sanand Amita
Athalye, Chirayu D.
Optimization and Control
Systems and Control
17B45, 05C85, 91A68, 93B70
Structural controllability challenges arise from imprecise system modeling and system interconnections in large scale systems. In this paper, we study structural control of bilinear systems on the special Euclidean group. We employ graph theoretic methods to analyze the structural controllability problem for driftless bilinear systems and structural accessibility for bilinear systems with drift. This facilitates the identification of a sparsest pattern necessary for achieving structural controllability and discerning redundant connections. To obtain a graph theoretic characterization of structural controllability and accessibility on the special Euclidean group, we introduce a novel idea of solid and broken edges on graphs; subsequently, we use the notion of transitive closure of graphs.
title Structural Controllability of Bilinear Systems on $\mathbb{SE(n)}$
topic Optimization and Control
Systems and Control
17B45, 05C85, 91A68, 93B70
url https://arxiv.org/abs/2310.00589