Dynamic contact problem with moderate displacement and time‐dependent normal
In the publications on existence of solutions to the dynamic contact problems, small displacement was basically assumed. To extend the qualitative study for more general applications with moderate displacement and general shape of surfaces, the normal of contact surface is treated as time‐dependent...
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Published in | Zeitschrift für angewandte Mathematik und Mechanik Vol. 102; no. 12 |
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Language | English |
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01.12.2022
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Abstract | In the publications on existence of solutions to the dynamic contact problems, small displacement was basically assumed. To extend the qualitative study for more general applications with moderate displacement and general shape of surfaces, the normal of contact surface is treated as time‐dependent variable in the contact mechanics model. The frictional dynamic contact problem with unilateral constraint is formulated in a variational inequality. The penalized variational equation is derived with two penalty terms, verifying contact condition and applying constraint on the normal velocity, respectively. For given penalty parameter the penalized variational equation is proved to have solution, which converges to the solution of the variational inequality. The true contact boundary, varying in time, is determined in the process and the constraint condition is satisfied. The regularity of the solution is similar to the results by others under the assumption of small displacement.
In the publications on existence of solutions to the dynamic contact problems, small displacement was basically assumed. To extend the qualitative study for more general applications with moderate displacement and general shape of surfaces, the normal of contact surface is treated as time‐dependent variable in the contact mechanics model. The frictional dynamic contact problem with unilateral constraint is formulated in a variational inequality.… |
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AbstractList | Abstract
In the publications on existence of solutions to the dynamic contact problems, small displacement was basically assumed. To extend the qualitative study for more general applications with moderate displacement and general shape of surfaces, the normal of contact surface is treated as time‐dependent variable in the contact mechanics model. The frictional dynamic contact problem with unilateral constraint is formulated in a variational inequality. The penalized variational equation is derived with two penalty terms, verifying contact condition and applying constraint on the normal velocity, respectively. For given penalty parameter the penalized variational equation is proved to have solution, which converges to the solution of the variational inequality. The true contact boundary, varying in time, is determined in the process and the constraint condition is satisfied. The regularity of the solution is similar to the results by others under the assumption of small displacement. In the publications on existence of solutions to the dynamic contact problems, small displacement was basically assumed. To extend the qualitative study for more general applications with moderate displacement and general shape of surfaces, the normal of contact surface is treated as time‐dependent variable in the contact mechanics model. The frictional dynamic contact problem with unilateral constraint is formulated in a variational inequality. The penalized variational equation is derived with two penalty terms, verifying contact condition and applying constraint on the normal velocity, respectively. For given penalty parameter the penalized variational equation is proved to have solution, which converges to the solution of the variational inequality. The true contact boundary, varying in time, is determined in the process and the constraint condition is satisfied. The regularity of the solution is similar to the results by others under the assumption of small displacement. In the publications on existence of solutions to the dynamic contact problems, small displacement was basically assumed. To extend the qualitative study for more general applications with moderate displacement and general shape of surfaces, the normal of contact surface is treated as time‐dependent variable in the contact mechanics model. The frictional dynamic contact problem with unilateral constraint is formulated in a variational inequality. The penalized variational equation is derived with two penalty terms, verifying contact condition and applying constraint on the normal velocity, respectively. For given penalty parameter the penalized variational equation is proved to have solution, which converges to the solution of the variational inequality. The true contact boundary, varying in time, is determined in the process and the constraint condition is satisfied. The regularity of the solution is similar to the results by others under the assumption of small displacement. In the publications on existence of solutions to the dynamic contact problems, small displacement was basically assumed. To extend the qualitative study for more general applications with moderate displacement and general shape of surfaces, the normal of contact surface is treated as time‐dependent variable in the contact mechanics model. The frictional dynamic contact problem with unilateral constraint is formulated in a variational inequality.… |
Author | Wu, Shen R. |
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Cites_doi | 10.1016/0362-546X(82)90076-1 10.1016/S0362-546X(99)00345-4 10.1007/978-3-642-65161-8 10.1016/j.jmaa.2008.10.054 10.14232/ejqtde.2014.1.49 10.1016/S0022-247X(02)00156-7 10.1017/S0956792510000045 10.1016/S0045-7825(99)00342-4 10.1137/140963248 10.1002/9781118382011 10.1016/0045-7825(90)90098-7 10.1016/j.nonrwa.2014.09.010 10.1007/978-3-642-51677-1 10.1002/nme.1620361211 10.1090/amsip/030 10.1007/s10659-015-9563-0 10.1002/zamm.201800263 10.1007/978-3-642-66165-5 10.1007/s00033-009-0027-x 10.1007/s00033-005-0013-x 10.1016/0045-7825(85)90009-X 10.1016/0362-546X(87)90055-1 10.1115/1.3167019 10.1002/(SICI)1099-1476(19990925)22:14<1221::AID-MMA78>3.0.CO;2-M 10.1016/S0895-7177(03)90043-4 10.1090/gsm/019 10.1002/zamm.201200152 10.1016/j.cma.2008.12.013 10.1090/qam/613950 10.1201/9781420027365 10.4208/nmtma.OA-2019-0130 10.1016/0020-7225(94)E0042-H 10.1016/j.nonrwa.2016.12.007 10.1002/cpa.3160200302 10.1155/2016/1562509 |
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