Add to ORKGThe problem of motion planning for nonholonomic dynamic systems is studied. A model for nonholonomic dynamic systems is first presented in terms of differential-algebraic equations defined on a phase space. A nonlinear control system in a normal form is introduced to completely describe the dynamics. The assumptions guarantee that the resulting normal form equations necessarily contain a nontrival drift vector field. --From the book\u27s introduction
Included in volume 3 of the second edition of The Control Handbook, this chapter focuses on motion p...
The dissertation contributes new results in three related areas: motion planning for noncatastatic n...
In this paper, a Lie-algebraic nonholonomic motion planning technique, originally designed to work i...
The problem of motion planning for nonholonomic dynamic systems is studied. A model for nonholonomic...
A theoretical framework is established for the control of nonholonomic dynamic systems, i.e. dynamic...
Nonholonomic systems are control systems which depend linearly on the control. Their underlying geom...
Nonholonomic systems are control systems which depend linearly on the control. Their underlying geom...
We deal with motion planning problems for nonholonomic systems. Our approach is based on optimal con...
We propose a general strategy for solving the motion planning problem for real analytic, controllabl...
(Working paper) A multibody car system is a non-nilpotent, non-regular, triangularizable and well-co...
In this paper various control representations selected from a family of harmonic controls were exami...
A theoretical framework is established for the control of nonholonomic dynamic systems, i.e., dynami...
International audienceConsider a control-affine nonholonomic system (Sigma). We present in this pape...
In the development of nonholonomic mechanics one can observe recurring confusion over the very equat...
A common approach to motion planning of robots and vehicles involves finding suitable trajectories f...
Included in volume 3 of the second edition of The Control Handbook, this chapter focuses on motion p...
The dissertation contributes new results in three related areas: motion planning for noncatastatic n...
In this paper, a Lie-algebraic nonholonomic motion planning technique, originally designed to work i...
The problem of motion planning for nonholonomic dynamic systems is studied. A model for nonholonomic...
A theoretical framework is established for the control of nonholonomic dynamic systems, i.e. dynamic...
Nonholonomic systems are control systems which depend linearly on the control. Their underlying geom...
Nonholonomic systems are control systems which depend linearly on the control. Their underlying geom...
We deal with motion planning problems for nonholonomic systems. Our approach is based on optimal con...
We propose a general strategy for solving the motion planning problem for real analytic, controllabl...
(Working paper) A multibody car system is a non-nilpotent, non-regular, triangularizable and well-co...
In this paper various control representations selected from a family of harmonic controls were exami...
A theoretical framework is established for the control of nonholonomic dynamic systems, i.e., dynami...
International audienceConsider a control-affine nonholonomic system (Sigma). We present in this pape...
In the development of nonholonomic mechanics one can observe recurring confusion over the very equat...
A common approach to motion planning of robots and vehicles involves finding suitable trajectories f...
Included in volume 3 of the second edition of The Control Handbook, this chapter focuses on motion p...
The dissertation contributes new results in three related areas: motion planning for noncatastatic n...
In this paper, a Lie-algebraic nonholonomic motion planning technique, originally designed to work i...