This paper proposes a family of Lie group time integrators for the simulation of flexible multibody systems. The method provides an elegant solution to the rotation parameterization problem. As an extension of the classical generalized-alpha method for dynamic systems, it can deal with constrained equations of motion. Second-order accuracy is demonstrated in the unconstrained case. The performance is illustrated on several critical benchmarks of rigid body systems with high rotation speeds and second order accuracy is evidenced in all of them, even for constrained cases. The remarkable simplicity of the new algorithms opens some interesting perspectives for real-time applications, model-based control and optimization of multibody systems.F...
Gradient-based optimization methods require efficient algorithms to compute the sensitivities of the...
The Euler–Poinaré principle is a reduced Hamilton’s principle under Lie group framework. In this art...
Multibody systems are dynamical systems characterized by intrinsic symmetries and invariants. Geomet...
peer reviewedThis paper proposes a family of Lie group time integrators for the simulation of flexib...
This paper studies a family of Lie group time integrators for the simulation of flexible multibody s...
This paper studies a Lie group extension of the generalized-α time integration method for the simula...
This paper studies a Lie group extension of the generalized-alpha time integration method for the si...
Lie group integrators preserve by construction the Lie group structure of a nonlinear configuration ...
International audienceThe book explores the use of Lie groups in the kinematics and dynamics of rigi...
Generalized-α methods are very popular in structural dynamics. They are methods of Newmark type and ...
Screw and Lie group theory allows for user-friendly modeling of multibody systems (MBS), and at the ...
The primary object of this work is the development of a robust, accurate and efficient time integrat...
In rigid body dynamic simulations, often the algorithm is required to deal with general situations w...
Since they were introduced in the 1990s, Lie group integrators have become a method of choice in man...
Recently there has been an increasing interest in time integrators for ordinary dierential equation...
Gradient-based optimization methods require efficient algorithms to compute the sensitivities of the...
The Euler–Poinaré principle is a reduced Hamilton’s principle under Lie group framework. In this art...
Multibody systems are dynamical systems characterized by intrinsic symmetries and invariants. Geomet...
peer reviewedThis paper proposes a family of Lie group time integrators for the simulation of flexib...
This paper studies a family of Lie group time integrators for the simulation of flexible multibody s...
This paper studies a Lie group extension of the generalized-α time integration method for the simula...
This paper studies a Lie group extension of the generalized-alpha time integration method for the si...
Lie group integrators preserve by construction the Lie group structure of a nonlinear configuration ...
International audienceThe book explores the use of Lie groups in the kinematics and dynamics of rigi...
Generalized-α methods are very popular in structural dynamics. They are methods of Newmark type and ...
Screw and Lie group theory allows for user-friendly modeling of multibody systems (MBS), and at the ...
The primary object of this work is the development of a robust, accurate and efficient time integrat...
In rigid body dynamic simulations, often the algorithm is required to deal with general situations w...
Since they were introduced in the 1990s, Lie group integrators have become a method of choice in man...
Recently there has been an increasing interest in time integrators for ordinary dierential equation...
Gradient-based optimization methods require efficient algorithms to compute the sensitivities of the...
The Euler–Poinaré principle is a reduced Hamilton’s principle under Lie group framework. In this art...
Multibody systems are dynamical systems characterized by intrinsic symmetries and invariants. Geomet...