Control of uncertain nonlinear multibody mechanical systems
Descriptions of real-life complex multibody mechanical systems are usually uncertain. Two sources of uncertainty are considered in this paper: uncertainties in the knowledge of the physical system and uncertainties in the "given" forces applied to the system. Both types of uncertainty are...
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th-mahidol.338222018-11-09T10:13:57Z Control of uncertain nonlinear multibody mechanical systems Firdaus E. Udwadia Thanapat Wanichanon University of Southern California Mahidol University Engineering Physics and Astronomy Descriptions of real-life complex multibody mechanical systems are usually uncertain. Two sources of uncertainty are considered in this paper: uncertainties in the knowledge of the physical system and uncertainties in the "given" forces applied to the system. Both types of uncertainty are assumed to be time varying and unknown, yet bounded. In the face of such uncertainties, what is available in hand is therefore just the so-called "nominal system," which is our best assessment and description of the actual real-life situation. A closed-form equation of motion for a general dynamical system that contains a control force is developed. When applied to a real-life uncertain multibody system, it causes the system to track a desired reference trajectory that is prespecified for the nominal system to follow. Thus, the real-life system's motion is required to coincide within prespecified error bounds and mimic the motion desired of the nominal system. Uncertainty is handled by a controller based on a generalization of the concept of a sliding surface, which permits the use of a large class of control laws that can be adapted to specific real-life practical limitations on the control force. A set of closed-form equations of motion is obtained for nonlinear, nonautonomous, uncertain, multibody systems that can track a desired reference trajectory that the nominal system is required to follow within prespecified error bounds and thereby satisfy the constraints placed on the nominal system. An example of a simple mechanical system demonstrates the efficacy and ease of implementation of the control methodology. © 2014 by ASME. 2018-11-09T02:13:50Z 2018-11-09T02:13:50Z 2014-04-01 Article Journal of Applied Mechanics, Transactions ASME. Vol.81, No.4 (2014) 10.1115/1.4025399 15289036 00218936 2-s2.0-84890625067 https://repository.li.mahidol.ac.th/handle/123456789/33822 Mahidol University SCOPUS https://www.scopus.com/inward/record.uri?partnerID=HzOxMe3b&scp=84890625067&origin=inward |
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Engineering Physics and Astronomy Firdaus E. Udwadia Thanapat Wanichanon Control of uncertain nonlinear multibody mechanical systems |
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Descriptions of real-life complex multibody mechanical systems are usually uncertain. Two sources of uncertainty are considered in this paper: uncertainties in the knowledge of the physical system and uncertainties in the "given" forces applied to the system. Both types of uncertainty are assumed to be time varying and unknown, yet bounded. In the face of such uncertainties, what is available in hand is therefore just the so-called "nominal system," which is our best assessment and description of the actual real-life situation. A closed-form equation of motion for a general dynamical system that contains a control force is developed. When applied to a real-life uncertain multibody system, it causes the system to track a desired reference trajectory that is prespecified for the nominal system to follow. Thus, the real-life system's motion is required to coincide within prespecified error bounds and mimic the motion desired of the nominal system. Uncertainty is handled by a controller based on a generalization of the concept of a sliding surface, which permits the use of a large class of control laws that can be adapted to specific real-life practical limitations on the control force. A set of closed-form equations of motion is obtained for nonlinear, nonautonomous, uncertain, multibody systems that can track a desired reference trajectory that the nominal system is required to follow within prespecified error bounds and thereby satisfy the constraints placed on the nominal system. An example of a simple mechanical system demonstrates the efficacy and ease of implementation of the control methodology. © 2014 by ASME. |
| author2 |
University of Southern California |
| author_facet |
University of Southern California Firdaus E. Udwadia Thanapat Wanichanon |
| format |
Article |
| author |
Firdaus E. Udwadia Thanapat Wanichanon |
| author_sort |
Firdaus E. Udwadia |
| title |
Control of uncertain nonlinear multibody mechanical systems |
| title_short |
Control of uncertain nonlinear multibody mechanical systems |
| title_full |
Control of uncertain nonlinear multibody mechanical systems |
| title_fullStr |
Control of uncertain nonlinear multibody mechanical systems |
| title_full_unstemmed |
Control of uncertain nonlinear multibody mechanical systems |
| title_sort |
control of uncertain nonlinear multibody mechanical systems |
| publishDate |
2018 |
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https://repository.li.mahidol.ac.th/handle/123456789/33822 |
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1763493425795039232 |