Inversion in indirect optimal control
Authors: F. Chaplais, N. Petit, 7th European Control Conference, Cambridge 2003
In this paper we explain how to use inversion (as defined in nonlinear control theory) for indirect optimal control. Given the relative degree r, it is possible to recover r adjoint states and thus to simplify the problem. Explicit proof is given and relies on the triangular structure of the underlying normal form. An example from the literature is treated in the last section.
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BibTeX:
@Proceedings{,
author = {F. Chaplais, N. Petit},
editor = {},
title = {Inversion in indirect optimal control},
booktitle = {7th European Control Conference},
volume = {},
publisher = {},
address = {Cambridge},
pages = {},
year = {2003},
abstract = {In this paper we explain how to use inversion (as defined in nonlinear control theory) for indirect optimal control. Given the relative degree r, it is possible to recover r adjoint states and thus to simplify the problem. Explicit proof is given and relies on the triangular structure of the underlying normal form. An example from the literature is treated in the last section.},
keywords = {}}
In this paper we explain how to use inversion (as defined in nonlinear control theory) for indirect optimal control. Given the relative degree r, it is possible to recover r adjoint states and thus to simplify the problem. Explicit proof is given and relies on the triangular structure of the underlying normal form. An example from the literature is treated in the last section.
Download PDF
BibTeX:
@Proceedings{,
author = {F. Chaplais, N. Petit},
editor = {},
title = {Inversion in indirect optimal control},
booktitle = {7th European Control Conference},
volume = {},
publisher = {},
address = {Cambridge},
pages = {},
year = {2003},
abstract = {In this paper we explain how to use inversion (as defined in nonlinear control theory) for indirect optimal control. Given the relative degree r, it is possible to recover r adjoint states and thus to simplify the problem. Explicit proof is given and relies on the triangular structure of the underlying normal form. An example from the literature is treated in the last section.},
keywords = {}}