Continuous second order sliding mode based robust finite time tracking of a fully actuated biped robot
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[1] Franck Plestan,et al. Estimation of Absolute Orientation for a Bipedal Robot: Experimental Results , 2011, IEEE Transactions on Robotics.
[2] B. Paden,et al. Lyapunov stability theory of nonsmooth systems , 1993, Proceedings of 32nd IEEE Conference on Decision and Control.
[3] Sarah K. Spurgeon,et al. Settling Time Estimate for a Second Order Sliding Mode Controller: A Homogeneity Approach , 2011 .
[4] L. Rosier. Homogeneous Lyapunov function for homogeneous continuous vector field , 1992 .
[5] Aleksej F. Filippov,et al. Differential Equations with Discontinuous Righthand Sides , 1988, Mathematics and Its Applications.
[6] A. Levant. Sliding order and sliding accuracy in sliding mode control , 1993 .
[7] Raul Santiesteban,et al. Time convergence estimation of a perturbed double integrator: Family of continuous sliding mode based output feedback synthesis , 2013, 2013 European Control Conference (ECC).
[8] Yannick Aoustin,et al. Finite Time Stabilization of a Perturbed Double Integrator—Part I: Continuous Sliding Mode-Based Output Feedback Synthesis , 2011, IEEE Transactions on Automatic Control.
[9] Bernard Brogliato,et al. Modeling, stability and control of biped robots - a general framework , 2004, Autom..
[10] Arie Levant,et al. Homogeneity approach to high-order sliding mode design , 2005, Autom..
[11] S. Bhat,et al. Continuous finite-time stabilization of the translational and rotational double integrators , 1998, IEEE Trans. Autom. Control..
[12] Kazuhito Yokoi,et al. Planning walking patterns for a biped robot , 2001, IEEE Trans. Robotics Autom..
[13] Y. ORLOV,et al. Finite Time Stability and Robust Control Synthesis of Uncertain Switched Systems , 2004, SIAM J. Control. Optim..
[14] Yannick Aoustin,et al. Effects of knee locking and passive joint stiffness on energy consumption of a seven-link planar biped , 2012, 2012 IEEE International Conference on Robotics and Automation.
[15] Franck Plestan,et al. Asymptotically stable walking for biped robots: analysis via systems with impulse effects , 2001, IEEE Trans. Autom. Control..
[16] M. Kawski. Stabilization of nonlinear systems in the plane , 1989 .
[17] V. Haimo. Finite time controllers , 1986 .
[18] S. Bhat,et al. Finite-time stability of homogeneous systems , 1997, Proceedings of the 1997 American Control Conference (Cat. No.97CH36041).
[19] Miomir Vukobratovic,et al. Contribution to the Study of Anthropomorphism of Humanoid Robots , 2005, Int. J. Humanoid Robotics.
[20] Dennis S. Bernstein,et al. Geometric homogeneity with applications to finite-time stability , 2005, Math. Control. Signals Syst..
[21] J. Alvarez,et al. An Invariance Principle for Discontinuous Dynamic Systems With Application to a Coulomb Friction Oscillator , 2000 .
[22] Christine Chevallereau,et al. RABBIT: a testbed for advanced control theory , 2003 .
[23] Yannick Aoustin,et al. Finite time stabilization of a perturbed double integrator - Part II: applications to bipedal locomotion , 2010, 49th IEEE Conference on Decision and Control (CDC).
[24] Dennis S. Bernstein,et al. Finite-Time Stability of Continuous Autonomous Systems , 2000, SIAM J. Control. Optim..
[25] Franck Plestan,et al. Contact forces computation in a 3D bipedal robot using constrained-based and penalty-based approaches , 2011 .
[26] Sarah K. Spurgeon,et al. Continuous Uniform Finite Time Stabilization of Planar Controllable Systems , 2015, SIAM J. Control. Optim..