References
- Blumentals, A., B. Brogliato, and F. Bertails-Descoubes. 2016. The contact problem in Lagrangian systems subject to bilateral and unilateral constraints, with or without sliding Coulomb’s friction: A tutorial. Multibody System Dynamics 38:43–76. doi:10.1007/s11044-016-9527-6.
- Brown, P., and J. McPhee. 2016. A continuous velocity-based friction model for dynamics and control with physically meaningful parameters. Journal of Computational and Nonlinear Dynamics 11:054502. doi:10.1115/1.4033658.
- Goldstein, H. 1980. Classical mechanics, 2nd ed. Reading, MA: Addison-Wesley.
- Haug, E. J. 1989. Computer-aided kinematics and dynamics of mechanical systems. Boston: Allyn and Bacon.
- Haug, E. J. 2016. An index 0 differential-algebraic equation formulation for multibody dynamics-holonomic constraints. Mechanics Based Design of Structures and Machines 45:479–506. doi:10.1080/15397734.2016.1246370.
- Haug, E. J. 2017. Simulation of friction and stiction in multibody dynamics model problems. Mechanics Based Design of Structures and Machines 1–22. doi:10.1080/15397734.2017.1341840.
- Lanczos, C. 1962. The variational principles of mechanics, 2nd ed. Toronto: University of Toronto Press.
- Marques, F., P. Flores, J. C. Pimenta Claro, and H. M. Lankarani. 2016. A survey and comparison of several friction force models for dynamic analysis of multibody mechanical systems. Nonlinear Dynamics 86 (3):1407–43. doi:10.1007/s11071-016-2999-3.
- Pars, L. A. 1979. A treatise on analytical dynamics. Woodbridge, CT: Ox Bow Press.
- Pennestri, E., V. Rossi, P. Salvini, and P. P. Valentini. 2016. Review and comparison of dry friction force models. Nonlinear Dynamics 83:1785–801. doi:10.1007/s11071-015-1485-3.
- Serban, R., and E. J. Haug. 1998. Kinematic and kinetic derivatives in multibody system analysis. Mechanics of Structures and Machines 26 (2):145–73. doi:10.1080/08905459808945425.