We present a class of integration schemes for Lagrangian mechanics, referred to as energy-stepping integrators, that are momentum and energy conserving, symplectic and convergent. In order to achieve these properties we replace the original potential energy by a piecewise constant, or terraced approximation at steps of uniform height. By taking steps of diminishing height, an approximating sequence of energies is generated. The trajectories of the resulting approximating Lagrangians can be characterized explicitly and consist of intervals of piecewise rectilinear motion. We show that the energy-stepping trajectories are symplectic, exactly conserve all the momentum maps of the original system and, subject to a transversality condition, conv...
Euler–Lagrange equations and variational integrators are developed for Lagrangian mechanical systems...
Energy conservation of numerical integrators is well understood for symplectic one-step methods. Thi...
This paper presents a method to construct variational integrators for time-dependent lagrangian syst...
We present a class of integration schemes for Lagrangian mechanics, referred to as energy-stepping i...
We formulate an integration scheme for Lagrangian mechanics, referred to as the force-stepping schem...
The purpose of this paper is to develop variational integrators for conservative mechanical systems ...
Many numerical integrators for mechanical system simulation are created by using discrete algorithms...
The description of the symplectic multi-step algorithm for integration of the equations of motion wi...
The so-called structure-preserving methods which reproduce the fundamental properties like symplecti...
Recent observations [5] indicate that energy-momentum methods might be better suited for the numeric...
Abstract In this paper, we present a new variational integrator for problems in Lagrangian mechanics...
A b s t r a c t. This article considers the design and implementation of variable-timestep methods f...
In long-time numerical integration of Hamiltonian systems, and especially in molecular dynamics simu...
Abstract. In this paper, we present a new variational integrator for problems in Lagrangian mechanic...
In this paper, we construct an integrator that conserves volume in phase space. We compare the resul...
Euler–Lagrange equations and variational integrators are developed for Lagrangian mechanical systems...
Energy conservation of numerical integrators is well understood for symplectic one-step methods. Thi...
This paper presents a method to construct variational integrators for time-dependent lagrangian syst...
We present a class of integration schemes for Lagrangian mechanics, referred to as energy-stepping i...
We formulate an integration scheme for Lagrangian mechanics, referred to as the force-stepping schem...
The purpose of this paper is to develop variational integrators for conservative mechanical systems ...
Many numerical integrators for mechanical system simulation are created by using discrete algorithms...
The description of the symplectic multi-step algorithm for integration of the equations of motion wi...
The so-called structure-preserving methods which reproduce the fundamental properties like symplecti...
Recent observations [5] indicate that energy-momentum methods might be better suited for the numeric...
Abstract In this paper, we present a new variational integrator for problems in Lagrangian mechanics...
A b s t r a c t. This article considers the design and implementation of variable-timestep methods f...
In long-time numerical integration of Hamiltonian systems, and especially in molecular dynamics simu...
Abstract. In this paper, we present a new variational integrator for problems in Lagrangian mechanic...
In this paper, we construct an integrator that conserves volume in phase space. We compare the resul...
Euler–Lagrange equations and variational integrators are developed for Lagrangian mechanical systems...
Energy conservation of numerical integrators is well understood for symplectic one-step methods. Thi...
This paper presents a method to construct variational integrators for time-dependent lagrangian syst...