The so-called structure-preserving methods which reproduce the fundamental properties like symplecticness, time reversibility, volume and energy preservation of the original model of the underlying physical problem became very important in recent years. It has been shown theoretically and experimentally, that these methods are superior to the standard integrators, especially in long term computation. In the paper the adaptivity issues are discussed for symplectic and reversible methods designed for integration of Hamiltonian systems. Molecular dynamics models and N-body problems, as Hamiltonian systems, are challenging mathematical models in many aspects; the wide range of time scales, very large number of differential equations, chaotic na...
In long-time numerical integration of Hamiltonian systems, and especially in molecular dynamics simu...
Many force–gradient explicit symplectic integration algorithms have been designed for the Hamiltonia...
Symplectic methods for Hamiltonian systems are known to have favourable pro-per-ties concerning long...
The overall Hamiltonian structure of the Quantum-Classical Molecular Dynamics model makes -- analogo...
The overall Hamiltonian structure of the Quantum-Classical Molecular Dynamics model makes – analogou...
Based on a known observation that symplecticity is preserved under certain Sundman time transformati...
We review recently developed decomposition algorithms for molecular dynamics and spin dynamics simul...
Mechanical systems in the very large scale like in celestial mechanics or in the very small scale li...
A b s t r a c t. This article considers the design and implementation of variable-timestep methods f...
We present explicit, adaptive symplectic (EASY) integrators for the numerical integration of Hamilto...
The method of molecular dynamics (MD) is a powerful tool for the prediction and investigation of var...
Abstract We consider Sundman and Poincaré transformations for the long-time numerical integration of...
Symplectic integration algorithms are well-suited for long-term integrations of Hamiltonian systems ...
While great advances have been made in the field of intermolecular potentials for molecular modeling...
: Recent work reported in the literature suggests that for the long-time integration of Hamiltonian ...
In long-time numerical integration of Hamiltonian systems, and especially in molecular dynamics simu...
Many force–gradient explicit symplectic integration algorithms have been designed for the Hamiltonia...
Symplectic methods for Hamiltonian systems are known to have favourable pro-per-ties concerning long...
The overall Hamiltonian structure of the Quantum-Classical Molecular Dynamics model makes -- analogo...
The overall Hamiltonian structure of the Quantum-Classical Molecular Dynamics model makes – analogou...
Based on a known observation that symplecticity is preserved under certain Sundman time transformati...
We review recently developed decomposition algorithms for molecular dynamics and spin dynamics simul...
Mechanical systems in the very large scale like in celestial mechanics or in the very small scale li...
A b s t r a c t. This article considers the design and implementation of variable-timestep methods f...
We present explicit, adaptive symplectic (EASY) integrators for the numerical integration of Hamilto...
The method of molecular dynamics (MD) is a powerful tool for the prediction and investigation of var...
Abstract We consider Sundman and Poincaré transformations for the long-time numerical integration of...
Symplectic integration algorithms are well-suited for long-term integrations of Hamiltonian systems ...
While great advances have been made in the field of intermolecular potentials for molecular modeling...
: Recent work reported in the literature suggests that for the long-time integration of Hamiltonian ...
In long-time numerical integration of Hamiltonian systems, and especially in molecular dynamics simu...
Many force–gradient explicit symplectic integration algorithms have been designed for the Hamiltonia...
Symplectic methods for Hamiltonian systems are known to have favourable pro-per-ties concerning long...