Results 211 to 220 of about 881,876 (268)
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A forward-inverse dynamics modeling framework for human musculoskeletal multibody system
Acta Mechanica Sinica, 2022Xinyue Wang, Jianqiao Guo, Q. Tian
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DYNAMICS OF MULTIBODY SYSTEMS WITH UNILATERAL CONSTRAINTS
International Journal of Bifurcation and Chaos, 1999In couplings of machines and mechanisms, backlash and friction phenomena are always occurring. Whether stick–slip phenomena take place depends on the structure of such couplings. These processes can be modeled as multibody systems with a time-varying topology.
Wösle, M., Pfeiffer, F.
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Constrained multibody system dynamics an automated approach
Computers & Structures, 1984The governing equations for constrained multibody systems, developed by modifying dynamical equations obtained from Lagrange's form of d'Alambert's principle, are formulated. This modification of the equations is suitable for their numerical development and solution.
Kamman, James W., Huston, Ronald L.
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An Efficient Dynamic Formulation for Multibody Systems
Multibody System Dynamics, 2001zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Reungwetwattana, A., Toyama, S.
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Investigation on Dynamics Performance of Multibody System with Rough Surface
Applied Mathematical Modelling, 2021Gengxiang Wang, Liangbi Wang, Yuan Yuan
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Principle of Dynamical Balance for Multibody Systems
Multibody System Dynamics, 2005zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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Computational Dynamics in Multibody Systems
1995Preface. Dynamics of Constrained Systems Based on Mass-Orthogonal Projections M. Sofer, D. Bach, H. Brauchli. An Efficient Implementation of the Velocity Transformation Method for Real Time Dynamics with Illustrative Examples J.M. Jimenez, A.N. Avello, J. Garcia de Jalon, A.L. Avello.
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Dynamics of Multibody Systems with Minimal Coordinates
1994Discussed in this contribution is a particular approach for tackling the problem of formulating the equations of motion of minimal order for complex mechanical systems. The obective is to arrive at a system of pure differential equations, which is robust and for which efficient integration techniques exist.
Hiller, Manfred, Kecskeméthy, Andrés
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Theoretical modeling and numerical solution methods for flexible multibody system dynamics
Nonlinear dynamics, 2019B. Rong, X. Rui, L. Tao, Guoping Wang
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