Novel methods to escape Painlevé paradox for sliding multi-body systems
Considering rough sliding of multi-body systems, a range of uncertainty or non-uniqueness of solution could be found, which is termed: Painlevé paradox. If occurs, it leads to undesired detachments between the end effector of a robotic manipulator and the sliding surface. In this research work, the...
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Elsevier
2021-02-01
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| Series: | Alexandria Engineering Journal |
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| Online Access: | http://www.sciencedirect.com/science/article/pii/S1110016820305986 |
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doaj-b5ed07d09d944c65bd00ababbde761e72021-06-02T14:25:45ZengElsevierAlexandria Engineering Journal1110-01682021-02-0160116391645Novel methods to escape Painlevé paradox for sliding multi-body systemsKhaled Mohamed0Hesham Elkaranshawy1Ahmed Ashour2Hassan Alkomy3Mechanical Engineering Department, Faculty of Engineering, Alexandria University, Alexandria 21544, Egypt; Corresponding author.Department of Engineering Mathematics and Physics, Faculty of Engineering, Alexandria University, Alexandria 21544, EgyptDepartment of Engineering Mathematics and Physics, Faculty of Engineering, Alexandria University, Alexandria 21544, EgyptDepartment of Engineering Mathematics and Physics, Faculty of Engineering, Alexandria University, Alexandria 21544, EgyptConsidering rough sliding of multi-body systems, a range of uncertainty or non-uniqueness of solution could be found, which is termed: Painlevé paradox. If occurs, it leads to undesired detachments between the end effector of a robotic manipulator and the sliding surface. In this research work, the condition leading to Painlevé paradox is specified. To examine the factors affecting the paradox, parametric studies are performed for two sliding manipulators; Prismatic-Revolute manipulator (P-R), and Revolute-Prismatic (R-P) manipulator. These parametric studies investigate the effect of the coefficient of friction and links' lengths and inertia. Recommendations to escape the paradox zone are proposed including a novel conjecture through rearranging the joints of the robot.http://www.sciencedirect.com/science/article/pii/S1110016820305986Painlevé paradoxMulti-body systemsRobotic dynamicsFriction |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Khaled Mohamed Hesham Elkaranshawy Ahmed Ashour Hassan Alkomy |
| spellingShingle |
Khaled Mohamed Hesham Elkaranshawy Ahmed Ashour Hassan Alkomy Novel methods to escape Painlevé paradox for sliding multi-body systems Alexandria Engineering Journal Painlevé paradox Multi-body systems Robotic dynamics Friction |
| author_facet |
Khaled Mohamed Hesham Elkaranshawy Ahmed Ashour Hassan Alkomy |
| author_sort |
Khaled Mohamed |
| title |
Novel methods to escape Painlevé paradox for sliding multi-body systems |
| title_short |
Novel methods to escape Painlevé paradox for sliding multi-body systems |
| title_full |
Novel methods to escape Painlevé paradox for sliding multi-body systems |
| title_fullStr |
Novel methods to escape Painlevé paradox for sliding multi-body systems |
| title_full_unstemmed |
Novel methods to escape Painlevé paradox for sliding multi-body systems |
| title_sort |
novel methods to escape painlevé paradox for sliding multi-body systems |
| publisher |
Elsevier |
| series |
Alexandria Engineering Journal |
| issn |
1110-0168 |
| publishDate |
2021-02-01 |
| description |
Considering rough sliding of multi-body systems, a range of uncertainty or non-uniqueness of solution could be found, which is termed: Painlevé paradox. If occurs, it leads to undesired detachments between the end effector of a robotic manipulator and the sliding surface. In this research work, the condition leading to Painlevé paradox is specified. To examine the factors affecting the paradox, parametric studies are performed for two sliding manipulators; Prismatic-Revolute manipulator (P-R), and Revolute-Prismatic (R-P) manipulator. These parametric studies investigate the effect of the coefficient of friction and links' lengths and inertia. Recommendations to escape the paradox zone are proposed including a novel conjecture through rearranging the joints of the robot. |
| topic |
Painlevé paradox Multi-body systems Robotic dynamics Friction |
| url |
http://www.sciencedirect.com/science/article/pii/S1110016820305986 |
| work_keys_str_mv |
AT khaledmohamed novelmethodstoescapepainleveparadoxforslidingmultibodysystems AT heshamelkaranshawy novelmethodstoescapepainleveparadoxforslidingmultibodysystems AT ahmedashour novelmethodstoescapepainleveparadoxforslidingmultibodysystems AT hassanalkomy novelmethodstoescapepainleveparadoxforslidingmultibodysystems |
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