Algorithm for Spacecraft Angular and Translational Motion Control with use of Orientation Thrusters
Authors: Sumarokov A.V., Tyrnov P.A. | Published: 16.12.2019 |
Published in issue: #6(129)/2019 | |
DOI: 10.18698/0236-3933-2019-6-30-40 | |
Category: Informatics, Computer Engineering and Control | Chapter: System Analysis, Control, and Information Processing | |
Keywords: orientation thrusters, simultaneous control of angular and spatial motion, least squares method, control velocity formation, calculation of thrusters burn duration |
The paper discusses the algorithm of spacecraft orientation and docking thrusters control for simultaneous spatial and angular motion. The solution of control velocity formation problem and the problem of required engines configuration determination along with the optimization of control vector execution accuracy are considered. The formation of control velocity is carried out using a phase plane with switching lines and a zone of inactivity. The calculation of thrusters working duration time is based on the method of least squares with non-negative resulting solution vector and additional boundary conditions. In the paper, the necessary control parameters were chosen to ensure the necessary accuracy of spacecraft stabilization. To demonstrate the developed algorithm, mathematical modelling of various considered spacecraft's orbital flight stages was executed, including damping of initial angular velocities, spatial motion, and stabilization under the influence of continuous perturbations. The simulation took into account the disturbing moments acting on the spacecraft, thrusters mounting errors and the characteristics of the angular velocity meter. The elastic characteristics of the structure were not taken into account. The results of mathematical modelling showed that the proposed algorithm coped well with the task, and was able to ensure the movement of the spacecraft center of masses in a given direction and simultaneous angular stabilization with required accuracy
The Russian Foundation supported this work for Basic Research (projects no. 17-08-01635, 18-08-01379)
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