A multirate variational approach to simulation and optimal control for flexible spacecraft

We propose an optimal control method for simultaneous slewing and vibration control of flexible spacecraft. Considering dynamics on different time scales, the optimal control problem is discretized on micro and macro time grids using a multirate variational approach. The description of the system and the necessary optimality conditions are derived through the discrete Lagrange-d'Alembert principle. The discrete problem retains the conservation properties of the continuous model and achieves high fidelity simulation at a reduced computational cost. Simulation results for a single-axis rotational maneuver demonstrate vibration suppression and achieve the same accuracy as the single rate method at reduced computational cost.

[1]  Sina Ober-Blöbaum,et al.  Computing time investigations for variational multirate integration , 2013 .

[2]  J. A. Breakwell,et al.  Optimal feedback slewing of flexible spacecraft , 1981 .

[3]  심성한,et al.  Fundamentals of Vibrations , 2013 .

[4]  James D. Turner,et al.  Optimal distributed control of a flexible spacecraft during a large-angle maneuver , 1984 .

[5]  Zidong Wang,et al.  Sliding mode and shaped input vibration control of flexible systems , 2008, IEEE Transactions on Aerospace and Electronic Systems.

[6]  Sina Ober-Blöbaum,et al.  A Variational Approach to Multirate Integration for Constrained Systems , 2013 .

[7]  J. Junkins,et al.  Optimal Large-Angle Single-Axis Rotational Maneuvers of Flexible Spacecraft , 1980 .

[8]  J. Marsden,et al.  Discrete mechanics and variational integrators , 2001, Acta Numerica.

[9]  J. Marsden,et al.  Discrete mechanics and optimal control , 2005 .

[10]  M. Leok Variational Integrators , 2012 .

[11]  Youdan Kim,et al.  Introduction to Dynamics and Control of Flexible Structures , 1993 .

[12]  Computing time investigations of variational multirate integrators , 2013 .

[13]  J. Marsden,et al.  DISCRETE MECHANICS AND OPTIMAL CONTROL: AN ANALYSIS ∗ , 2008, 0810.1386.

[14]  F. Topputo,et al.  Survey of Direct Transcription for Low-Thrust Space Trajectory Optimization with Applications , 2014 .

[15]  Mohammad Eghtesad,et al.  Dynamics and control of a smart flexible satellite moving in an orbit , 2015 .

[16]  Bernd Simeon,et al.  Order reduction of stiff solvers at elastic multibody systems , 1998 .

[17]  Matthew Kelly,et al.  An Introduction to Trajectory Optimization: How to Do Your Own Direct Collocation , 2017, SIAM Rev..

[18]  Bruce A. Conway,et al.  A Survey of Methods Available for the Numerical Optimization of Continuous Dynamic Systems , 2011, Journal of Optimization Theory and Applications.

[19]  S. Leyendecker,et al.  Variational multirate integration in discrete mechanics and optimal control , 2017 .