Attitude Stabilization of Satellites Using Random Dither Quantization
Recently, the effectiveness of random dither
quantization method for linear feedback control systems has
been shown in several papers. However, the random dither
quantization method has not yet been applied to nonlinear feedback
control systems. The objective of this paper is to verify the
effectiveness of random dither quantization method for nonlinear
feedback control systems. For this purpose, we consider the attitude
stabilization problem of satellites using discrete-level actuators.
Namely, this paper provides a control method based on the random
dither quantization method for stabilizing the attitude of satellites
using discrete-level actuators.
[1] R. Morita, S. Azuma, T. Sugie, Performance Analysis of Random Dither
Quantizers in Feedback Control Systems, SICE Journal of Control,
Measurement, and System Integration, Vol. 6, No. 1, pp. 21-27, 2013.
[2] T. Hashimoto, I. Yoshimoto, T. Ohtsuka, Probabilistic Constrained
Model Predictive Control for Schr¨odinger Equation with Finite
Approximation, Proceedings of SICE Annual Conference, pp.
1613-1618, 2012.
[3] T. Hashimoto, Probabilistic Constrained Model Predictive Control for
Linear Discrete-time Systems with Additive Stochastic Disturbances,
Proceedings of IEEE Conference on Decision and Control, pp.
6434-6439, 2013.
[4] T. Hashimoto, Computational Simulations on Stability of Model
Predictive Control for Linear Discrete-time Stochastic Systems,
International Journal of Computer, Electrical, Automation, Control and
Information Engineering, Vol. 9, No. 8, pp. 1385-1390, 2015.
[5] T. Hashimoto, Y. Yoshioka, T. Ohtsuka, Receding Horizon Control with
Numerical Solution for Thermal Fluid Systems, Proceedings of SICE
Annual Conference, pp. 1298-1303, 2012.
[6] T. Hashimoto, Y. Yoshioka, T. Ohtsuka, Receding Horizon Control with
Numerical Solution for Spatiotemporal Dynamic Systems, Proceedings
of IEEE Conference on Decision and Control, pp. 2920-2925, 2012.
[7] T. Hashimoto, Y. Takiguchi and T. Ohtsuka, Output Feedback Receding
Horizon Control for Spatiotemporal Dynamic Systems, Proceedings of
Asian Control Conference, 2013.
[8] T. Hashimoto, Y. Yoshioka and T. Ohtsuka, Receding Horizon Control
for Hot Strip Mill Cooling Systems, IEEE/ASME Transactions on
Mechatronics, Vol. 18, No. 3, pp. 998-1005, 2013.
[9] T. Hashimoto, Y. Yoshioka and T. Ohtsuka, Receding Horizon Control
With Numerical Solution for Nonlinear Parabolic Partial Differential
Equations, IEEE Transactions on Automatic Control, Vol. 58, No. 3,
pp. 725-730, 2013.
[10] T. Hashimoto, Y. Takiguchi and T. Ohtsuka, Receding Horizon Control
for High-Dimensional Burgersf Equations with Boundary Control
Inputs, Transactions of the Japan Society for Aeronautical and Space
Sciences, Vol. 56, No.3, pp. 137-144, 2013.
[11] T. Hashimoto, Conservativeness of Probabilistic Constrained Optimal
Control Method for Unknown Probability Distribution, International
Journal of Mathematical, Computational, Physical, Electrical and
Computer Engineering, Vol. 9, No. 9, pp. 11-15, 2015.
[12] T. Hashimoto, A Method for Solving Optimal Control Problems
subject to Probabilistic Affine State Constraints for Linear Discrete-time
Uncertain Systems, International Journal of Mechanical and Production
Engineering, Vol. 3, Issue 12, pp. 6-10, 2015.
[13] T. Hashimoto, Solutions to Probabilistic Constrained Optimal Control
Problems Using Concentration Inequalities, International Journal of
Mathematical, Computational, Physical, Electrical and Computer
Engineering, Vol. 10, No. 10, pp. 441-446, 2016.
[14] T. Hashimoto, Stability of Stochastic Model Predictive Control for
Schr¨odinger Equation with Finite Approximation, International Journal
of Mathematical, Computational, Physical, Electrical and Computer
Engineering, Vol. 11, No. 1, pp. 12-17, 2017.
[15] T. Hashimoto, Stochastic Model Predictive Control for Linear
Discrete-time Systems with Random Dither Quantization, International
Journal of Mathematical, Computational, Physical, Electrical and
Computer Engineering, Vol. 11, No. 2, pp. 130-134, 2017.
[16] R. Satoh, T. Hashimoto and T. Ohtsuka, Receding Horizon Control for
Mass Transport Phenomena in Thermal Fluid Systems, Proceedings of
Australian Control Conference, pp. 273-278, 2014.
[17] T. Hashimoto, Receding Horizon Control for a Class of Discrete-time
Nonlinear Implicit Systems, Proceedings of IEEE Conference on
Decision and Control, pp. 5089-5094, 2014.
[18] T. Hashimoto, Optimal Feedback Control Method Using Magnetic Force
for Crystal Growth Dynamics, International Journal of Science and
Engineering Investigations, Vol. 4, Issue 45, pp. 1-6, 2015.
[19] T. Hashimoto, R. Satoh and T. Ohtsuka, Receding Horizon Control
for Spatiotemporal Dynamic Systems, Mechanical Engineering Journal,
Vol. 3, No. 2, 15-00345, 2016.
[20] T. Hashimoto, T. Amemiya and H. A. Fujii, Stabilization of Linear
Uncertain Delay Systems with Antisymmetric Stepwise Configurations,
Journal of Dynamical and Control Systems, Vol. 14, No. 1, pp. 1-31,
2008.
[21] T. Hashimoto, T. Amemiya and H. A. Fujii, Output Feedback
Stabilization of Linear Time-varying Uncertain Delay Systems,
Mathematical Problems in Engineering, Vol. 2009, Article ID. 457468,
2009.
[22] T. Hashimoto and T. Amemiya, Stabilization of Linear Time-varying
Uncertain Delay Systems with Double Triangular Configuration, WSEAS
Transactions on Systems and Control, Vol. 4, No.9, pp.465-475, 2009.
[23] T. Hashimoto, Stabilization of Abstract Delay Systems on Banach
Lattices using Nonnegative Semigroups, Proceedings of the 50th IEEE
Conference on Decision and Control, pp. 1872-1877, 2011.
[24] T. Hashimoto, A Variable Transformation Method for Stabilizing
Abstract Delay Systems on Banach Lattices, Journal of Mathematics
Research, Vol. 4, No. 2, pp.2-9, 2012.
[25] T. Hashimoto, An Optimization Algorithm for Designing a Stabilizing
Controller for Linear Time-varying Uncertain Systems with State
Delays, Computational Mathematics and Modeling, Vol.24, No.1,
pp.90-102, 2013.
[1] R. Morita, S. Azuma, T. Sugie, Performance Analysis of Random Dither
Quantizers in Feedback Control Systems, SICE Journal of Control,
Measurement, and System Integration, Vol. 6, No. 1, pp. 21-27, 2013.
[2] T. Hashimoto, I. Yoshimoto, T. Ohtsuka, Probabilistic Constrained
Model Predictive Control for Schr¨odinger Equation with Finite
Approximation, Proceedings of SICE Annual Conference, pp.
1613-1618, 2012.
[3] T. Hashimoto, Probabilistic Constrained Model Predictive Control for
Linear Discrete-time Systems with Additive Stochastic Disturbances,
Proceedings of IEEE Conference on Decision and Control, pp.
6434-6439, 2013.
[4] T. Hashimoto, Computational Simulations on Stability of Model
Predictive Control for Linear Discrete-time Stochastic Systems,
International Journal of Computer, Electrical, Automation, Control and
Information Engineering, Vol. 9, No. 8, pp. 1385-1390, 2015.
[5] T. Hashimoto, Y. Yoshioka, T. Ohtsuka, Receding Horizon Control with
Numerical Solution for Thermal Fluid Systems, Proceedings of SICE
Annual Conference, pp. 1298-1303, 2012.
[6] T. Hashimoto, Y. Yoshioka, T. Ohtsuka, Receding Horizon Control with
Numerical Solution for Spatiotemporal Dynamic Systems, Proceedings
of IEEE Conference on Decision and Control, pp. 2920-2925, 2012.
[7] T. Hashimoto, Y. Takiguchi and T. Ohtsuka, Output Feedback Receding
Horizon Control for Spatiotemporal Dynamic Systems, Proceedings of
Asian Control Conference, 2013.
[8] T. Hashimoto, Y. Yoshioka and T. Ohtsuka, Receding Horizon Control
for Hot Strip Mill Cooling Systems, IEEE/ASME Transactions on
Mechatronics, Vol. 18, No. 3, pp. 998-1005, 2013.
[9] T. Hashimoto, Y. Yoshioka and T. Ohtsuka, Receding Horizon Control
With Numerical Solution for Nonlinear Parabolic Partial Differential
Equations, IEEE Transactions on Automatic Control, Vol. 58, No. 3,
pp. 725-730, 2013.
[10] T. Hashimoto, Y. Takiguchi and T. Ohtsuka, Receding Horizon Control
for High-Dimensional Burgersf Equations with Boundary Control
Inputs, Transactions of the Japan Society for Aeronautical and Space
Sciences, Vol. 56, No.3, pp. 137-144, 2013.
[11] T. Hashimoto, Conservativeness of Probabilistic Constrained Optimal
Control Method for Unknown Probability Distribution, International
Journal of Mathematical, Computational, Physical, Electrical and
Computer Engineering, Vol. 9, No. 9, pp. 11-15, 2015.
[12] T. Hashimoto, A Method for Solving Optimal Control Problems
subject to Probabilistic Affine State Constraints for Linear Discrete-time
Uncertain Systems, International Journal of Mechanical and Production
Engineering, Vol. 3, Issue 12, pp. 6-10, 2015.
[13] T. Hashimoto, Solutions to Probabilistic Constrained Optimal Control
Problems Using Concentration Inequalities, International Journal of
Mathematical, Computational, Physical, Electrical and Computer
Engineering, Vol. 10, No. 10, pp. 441-446, 2016.
[14] T. Hashimoto, Stability of Stochastic Model Predictive Control for
Schr¨odinger Equation with Finite Approximation, International Journal
of Mathematical, Computational, Physical, Electrical and Computer
Engineering, Vol. 11, No. 1, pp. 12-17, 2017.
[15] T. Hashimoto, Stochastic Model Predictive Control for Linear
Discrete-time Systems with Random Dither Quantization, International
Journal of Mathematical, Computational, Physical, Electrical and
Computer Engineering, Vol. 11, No. 2, pp. 130-134, 2017.
[16] R. Satoh, T. Hashimoto and T. Ohtsuka, Receding Horizon Control for
Mass Transport Phenomena in Thermal Fluid Systems, Proceedings of
Australian Control Conference, pp. 273-278, 2014.
[17] T. Hashimoto, Receding Horizon Control for a Class of Discrete-time
Nonlinear Implicit Systems, Proceedings of IEEE Conference on
Decision and Control, pp. 5089-5094, 2014.
[18] T. Hashimoto, Optimal Feedback Control Method Using Magnetic Force
for Crystal Growth Dynamics, International Journal of Science and
Engineering Investigations, Vol. 4, Issue 45, pp. 1-6, 2015.
[19] T. Hashimoto, R. Satoh and T. Ohtsuka, Receding Horizon Control
for Spatiotemporal Dynamic Systems, Mechanical Engineering Journal,
Vol. 3, No. 2, 15-00345, 2016.
[20] T. Hashimoto, T. Amemiya and H. A. Fujii, Stabilization of Linear
Uncertain Delay Systems with Antisymmetric Stepwise Configurations,
Journal of Dynamical and Control Systems, Vol. 14, No. 1, pp. 1-31,
2008.
[21] T. Hashimoto, T. Amemiya and H. A. Fujii, Output Feedback
Stabilization of Linear Time-varying Uncertain Delay Systems,
Mathematical Problems in Engineering, Vol. 2009, Article ID. 457468,
2009.
[22] T. Hashimoto and T. Amemiya, Stabilization of Linear Time-varying
Uncertain Delay Systems with Double Triangular Configuration, WSEAS
Transactions on Systems and Control, Vol. 4, No.9, pp.465-475, 2009.
[23] T. Hashimoto, Stabilization of Abstract Delay Systems on Banach
Lattices using Nonnegative Semigroups, Proceedings of the 50th IEEE
Conference on Decision and Control, pp. 1872-1877, 2011.
[24] T. Hashimoto, A Variable Transformation Method for Stabilizing
Abstract Delay Systems on Banach Lattices, Journal of Mathematics
Research, Vol. 4, No. 2, pp.2-9, 2012.
[25] T. Hashimoto, An Optimization Algorithm for Designing a Stabilizing
Controller for Linear Time-varying Uncertain Systems with State
Delays, Computational Mathematics and Modeling, Vol.24, No.1,
pp.90-102, 2013.
@article{"International Journal of Information, Control and Computer Sciences:76225", author = "Attitude Stabilization of Satellites Using Random Dither Quantization", title = "Attitude Stabilization of Satellites Using Random Dither Quantization", abstract = "Recently, the effectiveness of random dither
quantization method for linear feedback control systems has
been shown in several papers. However, the random dither
quantization method has not yet been applied to nonlinear feedback
control systems. The objective of this paper is to verify the
effectiveness of random dither quantization method for nonlinear
feedback control systems. For this purpose, we consider the attitude
stabilization problem of satellites using discrete-level actuators.
Namely, this paper provides a control method based on the random
dither quantization method for stabilizing the attitude of satellites
using discrete-level actuators.", keywords = "Quantized control, nonlinear systems, random dither
quantization.", volume = "11", number = "8", pages = "955-5", }
