[Astolfi, A. (1996). Asymptotic Stabilization of Nonholonomic Systems with Discontinuous Control, Ph.D. thesis, Swiss Federal Institute of Technology, Zurich.]Search in Google Scholar
[Bhat, S. P. and Bernstein, D. S. (2000). Finite-time stability of continuous autonomous systems, SIAM Journal on Control and Optimization 38(3): 751-766.10.1137/S0363012997321358]Search in Google Scholar
[de Luca, A., Oriolo, G. and Samson, C. (1998). Feedback control of a nonholonomic car-like robot, in J. P. Laumond (Ed.), Robot Motion Planning and Control, Lecture Notes in Control and Information Sciences, Vol. 229, Springer, Berlin/Heidelberg, pp. 171-253.]Search in Google Scholar
[Fleury, S., Soueres, P., Laumond, J. and Chatila, R. (1995). Primitives for smoothing mobile robot trajectories, IEEE Transactions on Robotics and Automation 11(3) 441-448.10.1109/70.388788]Search in Google Scholar
[Kozłowski, K. and Pazderski, D. (2004). Modeling and control of a 4-wheel skid-steering mobile robot, International Journal of Applied Mathematics Computer Science 14(4): 477-496.]Search in Google Scholar
[Lawrence, D. A., Frew, E. W. and Pisano, W. J. (2008). Lyapunov vector fields for autonomous UAV flight control, AIAA Journal of Guidance, Control, and Dynamics 31(5): 1220-1229.10.2514/1.34896]Search in Google Scholar
[Madi, M. (2004). Closed-form expressions for the approximation of arclength parameterization for Bezier curves, International Journal of Applied Mathematics Computer Science 14(1): 33-41.]Search in Google Scholar
[Michałek, M. and Kozłowski, K. (2008). Motion planning and its realization using VFO stabilizer features for a differentially driven robot, in K. Tchoń and C. Zieliński (Eds.), Problemy robotyki, Prace naukowe, Elektronika, Vol. 166, II, Warsaw University of Technology Press, pp. 525-534, (in Polish)]Search in Google Scholar
[Michałek, M. and Kozłowski, K. (2009). Vector-field-orientation feedback control method for a differentially-driven vehicle, IEEE Transactions on Control Systems Technology, DOI: 10.1109/TCST.2008.2010406, (in print).10.1109/TCST.2008.2010406]Search in Google Scholar
[Morin, P. and Samson, C. (2003). Practical stabilization of drifless systems on Lie groups: The transverse function approach, IEEE Transactions on Automatic Control 48(9): 1496-1508.10.1109/TAC.2003.816963]Search in Google Scholar
[Reeds, J. A. and Shepp, L. A. (1990). Optimal paths for a car that goes both forwards and backwards, Pacific Journal of Mathematics 145(2): 367-393.10.2140/pjm.1990.145.367]Search in Google Scholar
[Samson, C. (1992). Path following and time-varying feedback stabilization of a wheeled mobile robot, Proceedings of the International Conference ICARCV'92, Singapore, pp. 13.1.1-13.1.5.]Search in Google Scholar
[Sasiadek, J. and Duleba, I. (1995). Local trajectory planner, Proceedings of the AIAA Guidance, Navigation and Control Conference, Baltimore, MD, USA, pp. 1474-1483.]Search in Google Scholar
[Scheuer, A. and Fraichard, T. (1997). Continuous-curvature path planning for car-like vehicles, Proceedings of the International Conference of Intelligent Robots and Systems, Grenoble, France, pp. 997-1003.]Search in Google Scholar
[Siegwart, R. and Nourbakhsh, I. R. (2004). Introduction to Autonomous Robots, The MIT Press, Cambridge, MA.]Search in Google Scholar
[Sordalen, O. J. and de Wit, C. C. (1993). Exponential control law for a mobile robot: extension to path following, IEEE Transactions on Robotics and Automation 9(6): 837-842.10.1109/70.265927]Search in Google Scholar
