The present paper analyses a class of optimal control problems on geometric paths of the euclidean space, that is, curves parametrized by arc length. In the first part we deal with existence and robustness issues for such problems and we define the associated inverse optimal control problem. In the second part we discuss the inverse optimal control problem in the special case of planar trajectories and under additional assumptions. More precisely we define a criterion to restrict the study to a convenient class of costs based on the analysis of experimentally recorded trajectories. This method applies in particular to the case of human locomotion trajectories. © 2013 IEEE.
Geometric modeling of the movement based on an inverse optimal control approach / Jean, F.; Mason, P.; Chittaro, F. C.. - (2013), pp. 1816-1821. ( 52nd IEEE Conference on Decision and Control, CDC 2013 Firenze, Italia 2013) [10.1109/CDC.2013.6760146].
Geometric modeling of the movement based on an inverse optimal control approach
Chittaro F. C.
2013-01-01
Abstract
The present paper analyses a class of optimal control problems on geometric paths of the euclidean space, that is, curves parametrized by arc length. In the first part we deal with existence and robustness issues for such problems and we define the associated inverse optimal control problem. In the second part we discuss the inverse optimal control problem in the special case of planar trajectories and under additional assumptions. More precisely we define a criterion to restrict the study to a convenient class of costs based on the analysis of experimentally recorded trajectories. This method applies in particular to the case of human locomotion trajectories. © 2013 IEEE.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione
