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14. Haug, E.J., Computer Aided Kinematics and Dynamics of Mechanical Systems, Allyn and Bacon,
Needham, MA, 1989.
15. Kane, T.R. and Levinson, D.A., Dynamics: Theory and Applications, McGraw-Hill Publishing Co.,
New York, 1985.
16. Karnopp, D., “An approach to derivative causality in bond graph models of mechanical systems,”
Journal of the Franklin Institute, Vol. 329, No. 1, pp. 65–75, 1992.
17. Karnopp, D.C., Margolis, D., and Rosenberg, R.C., System Dynamics: Modeling and Simulation of
Mechatronic Systems, Wiley, New York, 2000, 3rd edition, or System Dynamics: A Uniﬁed Approach,
1990, 2nd edition.
18. Karnopp, D. and Rosenberg, R.C., Analysis and Simulation of Multiport Systems. The Bond Graph
Approach to Physical System Dynamics, MIT Press, Cambridge, MA, 1968.
19. Kuipers, J.B., Quaternions and Rotation Sequences, Princeton University Press, Princeton, NJ, 1998.
20. Lanczos, C., The Variational Principles of Mechanics, 4th edition, University of Toronto Press, Toronto,
1970. Also published by Dover, New York, 1986.
21. Lyshevski, S.E., Electromechanical Systems, Electric Machines, and Applied Mechatronics, CRC Press,
Boca Raton, FL, 2000.
22. Matschinsky, W., Road Vehicle Suspensions, Professional Engineering Publishing Ltd., Suffolk, UK,
1999.
23. Meriam, J.L. and Kraige, L.G., Engineering Mechanics. Dynamics, 4th edition, John Wiley and Sons,
New York, 1997.
24. Mortensen, R.E., “A globally stable linear regulator,” International Journal of Control, Vol. 8, No. 3,
pp. 297–302, 1968.
25. Nikravesh, P.E. and Chung, I.S., “Application of Euler parameters to the dynamic analysis of three-
dimensional constrained mechanical systems,” Journal of Mechanical Design (ASME), Vol. 104,
pp. 785–791, 1982.
26. Nikravesh, P.E., Wehage, R.A., and Kwon, O.K., “Euler parameters in computational kinematics and
dynamics, Parts 1 and 2,” Journal of Mechanisms, Transmissions, and Automation in Design (ASME),
Vol. 107, pp. 358–369, 1985.
27. Nososelov, V.S., “An example of a nonholonomic, nonlinear system not of the Chetaev type,” Vestnik
Leningradskogo Universiteta, No. 19, 1957.
28. Paynter, H., Analysis and Design of Engineering Systems, MIT Press, Cambridge, MA, 1961.
29. Roark, R.J. and Young, W.C., Formulas for Stress and Strain, McGraw-Hill, New York, 1975.
30. Roberson, R.E. and Schwertassek, Dynamics of Multibody Systems, Springer-Verlag, Berlin, 1988.
31. Rosenberg, R.M., Analytical Dynamics of Discrete Systems, Plenum Press, New York, 1977.
32. Rosenberg, R. and Karnopp, D., Introduction to Physical System Dynamics, McGraw-Hill, New York,
1983.
33. Rowell, D. and Wormley, D.N., System Dynamics, Prentice-Hall, Upper Saddle River, NJ, 1997.
34. Siciliano, B. and Villani, L., Robot Force Control, Kluwer Academic Publishers, Norwell, MA, 1999.
35. Tiernego, M.J.L. and Bos, A.M., “Modelling the dynamics and kinematics of mechanical systems
with multibond graphs,” Journal of the Franklin Institute, Vol. 319, No. 1–2, pp. 37–50, 1985.
36. Vance, J.M., Rotordynamics of Turbomachinery, John Wiley and Sons, New York, 1988.
37. Wehage, R.A., “Quaternions and Euler parameters—a brief exposition,” in Proceedings of the NATO
Advanced Study Institute on Computer Aided Analysis and Optimization of Mechanical System Dynam-
ics, E.J. Haug (ed.), Iowa City, IA, August 1–12, 1983, pp. 147–182.
38. Wie, B. and Barba, P.M., “Quaternion feedback for spacecraft large angle maneuvers,” Journal of
Guidance, Control, and Dynamics, Vol. 8, pp. 360–365, May–June 1985.
39. Wittenburg, J., Dynamics of Systems of Rigid Bodies, B.G. Teubner, Studttgart, 1977.

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