In this paper, we present efficient algorithms for computation of the residual of the constrained discrete Euler–Lagrange (DEL) equations of motion for tree structured, rigid multibody systems. In particular, we present new recursive formulas for computing partial derivatives of the kinetic energy. This enables us to solve the inverse dynamics problem of the discrete system with linear computational complexity. The resulting algorithms are easy to implement and can naturally be applied to a very broad class of multibody systems by imposing constraints on the coordinates by means of Lagrange multipliers. A comparison is made with an existing software package, which shows a drastic improvement in computational efficiency. Our interest in inve...
We consider the optimal control of mechanical systems on Lie groups and develop numerical methods th...
Abstract. Control (or servo) constraints can be used to partially prescribe the motion of discrete m...
This paper deals with the Lagrange multipliers corresponding to the intrinsic constraint equations o...
In this thesis we present practical tools and techniques to numerically solve optimal control proble...
We propose an efficient way of solving optimal control problems for rigid-body systems on the basis ...
The equations of motion of a controlled mechanical system subject to holonomic constraints may be fo...
We propose a procedure for the solution of inverse multibody dynamic problems, here intended as opti...
The primary objective of this work is the development of robust, accurate and efficient simulation m...
This paper draws attention to the advantages that may arise in the dynamic analysis or constrained m...
Practical multibody numerical models are typically composed by a set of bodies (rigid or deformable)...
The inverse dynamics analysis of underactuated multibody systems aims at determining the control inp...
In this paper we present a framework for digital human modelling using discrete mechanics and optima...
This work deals with the problem of computing the inverse dynamics of complex constrained mechanical...
Summary: "In this paper the method of design of kinematical and dynamical equations of mechanical sy...
In this investigation, a new algorithm for the nonlinear control of mechanical systems is developed....
We consider the optimal control of mechanical systems on Lie groups and develop numerical methods th...
Abstract. Control (or servo) constraints can be used to partially prescribe the motion of discrete m...
This paper deals with the Lagrange multipliers corresponding to the intrinsic constraint equations o...
In this thesis we present practical tools and techniques to numerically solve optimal control proble...
We propose an efficient way of solving optimal control problems for rigid-body systems on the basis ...
The equations of motion of a controlled mechanical system subject to holonomic constraints may be fo...
We propose a procedure for the solution of inverse multibody dynamic problems, here intended as opti...
The primary objective of this work is the development of robust, accurate and efficient simulation m...
This paper draws attention to the advantages that may arise in the dynamic analysis or constrained m...
Practical multibody numerical models are typically composed by a set of bodies (rigid or deformable)...
The inverse dynamics analysis of underactuated multibody systems aims at determining the control inp...
In this paper we present a framework for digital human modelling using discrete mechanics and optima...
This work deals with the problem of computing the inverse dynamics of complex constrained mechanical...
Summary: "In this paper the method of design of kinematical and dynamical equations of mechanical sy...
In this investigation, a new algorithm for the nonlinear control of mechanical systems is developed....
We consider the optimal control of mechanical systems on Lie groups and develop numerical methods th...
Abstract. Control (or servo) constraints can be used to partially prescribe the motion of discrete m...
This paper deals with the Lagrange multipliers corresponding to the intrinsic constraint equations o...