[1]
Orlandea, N. . Dynamic Continuous Path Synthesis of Industrial Robots Using ADAMS Computer Program, Transactions of ASME, Journal of Mechanical Design, Series B, Vol. 103, (1981).
DOI: 10.1115/1.3254960
Google Scholar
[2]
Goselin C. On the design of efficient parallel mechanisms. In computational methods in Mechanical Systems: Mechanism Analysis, Synthesis and Optimization (Eds J. Angeles and E. Zachariev NATO ASI Series), 1998 pp.68-96.
DOI: 10.1007/978-3-662-03729-4_4
Google Scholar
[3]
Uicker J. J and all. Theory of Machines and Mechanisms, Third Edition, Oxford University Press, New-York, (2003).
Google Scholar
[4]
Brand, L. Vector Analysis, John Wiley & Sons, Inc., (1961).
Google Scholar
[5]
Orlandea, N., and Calahan, D. A. A Sparsity-Oriented Approach to the Design of Mechanical Systems, Problems Analysis in Science and Engineering, Academic Press (1972).
DOI: 10.1016/b978-0-12-125550-3.50015-6
Google Scholar
[6]
Calahan, D. A. Computer-aided network design, 1973 (McGraw-Hill, New York.
Google Scholar
[7]
Gear, C. W. Differential-algebraic equation index transformation. SIAM J. Sci. Stat Comp., 1988, 9, 39-47.
Google Scholar
[8]
Hartog, Den. Mechanical Vibrations, Fourth Edition, McGraw-Hill, New York, (1956).
Google Scholar
[9]
Orlandea, N. V. A study of effects of the lower index methods on ADAMS sparse tableau formulation for the computational dynamics of multi-body mechanical systems. Proc. Instn Mech. Engrs, Part K: J. Multi-body Dynamics, 1999, 213, 1-910.
DOI: 10.1243/1464419991544009
Google Scholar
[10]
Orlandea, N. V. An index zero formulation of the general dynamic differential equations using the transmission functions. Proc. IMechE, Part K: J. Multi-body Dynamics, 2005, 219, 159-171.
DOI: 10.1243/146441905x10113
Google Scholar
[11]
Maros D. and Orlandea N. Contributions to the determination of the equations of motion for multi degrees of freedom systems. Journal of Engineering for Industry, Trans. ASME, Vol. 93 Series B February 1971, New-York.
DOI: 10.1115/1.3427874
Google Scholar
