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| Autores principales: | , |
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| Formato: | Preprint |
| Publicado: |
2021
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| Acceso en línea: | https://arxiv.org/abs/2110.01966 |
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| author | Jóźwikowski, Michał Sikorski, Bartłomiej |
| author_facet | Jóźwikowski, Michał Sikorski, Bartłomiej |
| contents | We study the end-point map of a control-linear system in a neighborhood of an arbitrarily chosen trajectory. In particular, we want to calculate the $k$-th order derivative of this map in a given direction. A priori it is a solution of a quite complicated ODE depending on all derivatives of order less or equal $k$. We prove that there exists a special coordinate system adapted to the geometry of the problem, which changes the system of ODEs describing all derivatives of the end-point map up to order $k$ to equations of a control-affine (non-autonomous control-linear) system, with the direction of derivation playing the role of the new control. As an application we study controllability criteria for this system, obtaining first and second-order necessary optimality conditions of sub-Riemannian geodesics. In particular, for the case of an abnormal minimizer we can interpret \emph{Goh conditions} as non-controllability conditions of this control-affine system for $k=2$. We make a hypothesis that for higher $k$'s its non-controllability corresponds to recently obtained higher-order analogs of the Goh conditions [Boarotto, Monti, Palmurella, 2020], [Boarotto, Monti, a Socionovo, 2022]. |
| format | Preprint |
| id |
arxiv_https___arxiv_org_abs_2110_01966 |
| institution | arXiv |
| publishDate | 2021 |
| record_format | arxiv |
| spellingShingle | Higher derivatives of the end-point map of a linear control system via adapted coordinates Jóźwikowski, Michał Sikorski, Bartłomiej Optimization and Control 93C10, 93B11, 93C73, 53C17 We study the end-point map of a control-linear system in a neighborhood of an arbitrarily chosen trajectory. In particular, we want to calculate the $k$-th order derivative of this map in a given direction. A priori it is a solution of a quite complicated ODE depending on all derivatives of order less or equal $k$. We prove that there exists a special coordinate system adapted to the geometry of the problem, which changes the system of ODEs describing all derivatives of the end-point map up to order $k$ to equations of a control-affine (non-autonomous control-linear) system, with the direction of derivation playing the role of the new control. As an application we study controllability criteria for this system, obtaining first and second-order necessary optimality conditions of sub-Riemannian geodesics. In particular, for the case of an abnormal minimizer we can interpret \emph{Goh conditions} as non-controllability conditions of this control-affine system for $k=2$. We make a hypothesis that for higher $k$'s its non-controllability corresponds to recently obtained higher-order analogs of the Goh conditions [Boarotto, Monti, Palmurella, 2020], [Boarotto, Monti, a Socionovo, 2022]. |
| title | Higher derivatives of the end-point map of a linear control system via adapted coordinates |
| topic | Optimization and Control 93C10, 93B11, 93C73, 53C17 |
| url | https://arxiv.org/abs/2110.01966 |