In long-time numerical integration of Hamiltonian systems, and especially in molecular dynamics simulation, it is important that the energy is well conserved. For symplectic integrators applied with sufficiently small step size, this is guaranteed by the existence of a modified Hamiltonian that is exactly conserved up to exponentially small terms. This article is concerned with the simplified Takahashi--Imada method, which is a modification of the St"ormer--Verlet method that is as easy to implement but has improved accuracy. This integrator is symmetric and volume-preserving, but no longer symplectic. We study its long-time energy conservation and give theoretical arguments, supported by numerical experiments, which show the possibility of...
The purpose of this paper is to develop variational integrators for conservative mechanical systems ...
In molecular dynamics Hamiltonian systems of dierential equations are numerically integrated using t...
In the context of Hamiltonian ODEs, a necessary condition for an integrator to be symplectic or conj...
In long-time numerical integration of Hamiltonian systems, and especially in molecular dynamics simu...
This article discusses the energy conservation of a wide class of numerical integrators applied to H...
The so-called structure-preserving methods which reproduce the fundamental properties like symplecti...
Symplectic methods, like the Verlet method, are a standard tool for the long term integration of Ham...
This paper is a survey on Symplectic Integrator Algorithms (SIA): numerical integrators designed for...
Mechanical systems in the very large scale like in celestial mechanics or in the very small scale li...
This paper is a survey on Symplectic Integrator Algorithms (SIA): numerical integrators designed for...
When numerically integrating canonical Hamiltonian systems, the long-term conservation of some of it...
Energy conservation of numerical integrators is well understood for symplectic one-step methods. Thi...
In this paper, we construct an integrator that conserves volume in phase space. We compare the resul...
The method of molecular dynamics (MD) is a powerful tool for the prediction and investigation of var...
For Hamiltonian systems, simulation algorithms that exactly conserve numerical energy or pseudo-ener...
The purpose of this paper is to develop variational integrators for conservative mechanical systems ...
In molecular dynamics Hamiltonian systems of dierential equations are numerically integrated using t...
In the context of Hamiltonian ODEs, a necessary condition for an integrator to be symplectic or conj...
In long-time numerical integration of Hamiltonian systems, and especially in molecular dynamics simu...
This article discusses the energy conservation of a wide class of numerical integrators applied to H...
The so-called structure-preserving methods which reproduce the fundamental properties like symplecti...
Symplectic methods, like the Verlet method, are a standard tool for the long term integration of Ham...
This paper is a survey on Symplectic Integrator Algorithms (SIA): numerical integrators designed for...
Mechanical systems in the very large scale like in celestial mechanics or in the very small scale li...
This paper is a survey on Symplectic Integrator Algorithms (SIA): numerical integrators designed for...
When numerically integrating canonical Hamiltonian systems, the long-term conservation of some of it...
Energy conservation of numerical integrators is well understood for symplectic one-step methods. Thi...
In this paper, we construct an integrator that conserves volume in phase space. We compare the resul...
The method of molecular dynamics (MD) is a powerful tool for the prediction and investigation of var...
For Hamiltonian systems, simulation algorithms that exactly conserve numerical energy or pseudo-ener...
The purpose of this paper is to develop variational integrators for conservative mechanical systems ...
In molecular dynamics Hamiltonian systems of dierential equations are numerically integrated using t...
In the context of Hamiltonian ODEs, a necessary condition for an integrator to be symplectic or conj...