This paper presents a discretization scheme for Mayer’s type optimal control problems of linear systems. The scheme is based on second order Volterra–Fliess approximations, and on an augmentation of the control variable in a control set of higher dimension. Compared with the existing results, it has the advantage of providing a higher order accuracy, which May make it more efficient when aiming for a certain precision. Error estimations (depending on the controllability index of the system at the solution) are proved by using a recent result about stability of the optimal solution with respect to disturbances. Numerical results are provided which show the sharpness of the error estimations.

High order discrete approximations to Mayer⇔s problems for linear systems

Scarinci T.
;
2018-01-01

Abstract

This paper presents a discretization scheme for Mayer’s type optimal control problems of linear systems. The scheme is based on second order Volterra–Fliess approximations, and on an augmentation of the control variable in a control set of higher dimension. Compared with the existing results, it has the advantage of providing a higher order accuracy, which May make it more efficient when aiming for a certain precision. Error estimations (depending on the controllability index of the system at the solution) are proved by using a recent result about stability of the optimal solution with respect to disturbances. Numerical results are provided which show the sharpness of the error estimations.
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11697/151296
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