Symplectic methods for Hamiltonian systems are known to have favourable pro-per-ties concerning long-time integrations (no secular terms in the error of the energy integral, linear error growth in the angle variables instead of quadratic growth, correct qualitative behaviour) if they are applied with constant step sizes, while all of these properties are lost in a standard variable step size implementation. In this article we present a ``meta-algorithm'' which allows us to combine the use of variable steps with symplectic integrators, without destroying the above mentioned favourable properties. We theoretically justify the algorithm by a backward error analysis, and illustrate its performance by numerical experiments
Symplectic integration algorithms are well-suited for long-term integrations of Hamiltonian systems ...
For the numerical treatment of Hamiltonian differential equations, symplectic integra-tors are the m...
Hamiltonian systems possess dynamics (e.g., preservation of volume in phase space and symplectic str...
Symplectic methods for Hamiltonian systems are known to have favourable pro-per-ties concerning long...
We present explicit, adaptive symplectic (EASY) integrators for the numerical integration of Hamilto...
Abstract We consider Sundman and Poincaré transformations for the long-time numerical integration of...
AbstractIn this paper the numerical integration of integrable Hamiltonian systems is considered. Sym...
For the numerical treatment of Hamiltonian differential equations, symplectic integrators are the mo...
The so-called structure-preserving methods which reproduce the fundamental properties like symplecti...
Abstract. We consider adaptive geometric integrators for the numerical integration of Hamil-tonian s...
This paper focuses on the solution of separable Hamiltonian systems using explicit symplectic integr...
Based on a known observation that symplecticity is preserved under certain Sundman time transformati...
The description of the symplectic multi-step algorithm for integration of the equations of motion wi...
We present a multiscale integrator for Hamiltonian systems with slowly varying quadratic stiff poten...
Symplectic integration algorithms have become popular in recent years in long-term orbital integrati...
Symplectic integration algorithms are well-suited for long-term integrations of Hamiltonian systems ...
For the numerical treatment of Hamiltonian differential equations, symplectic integra-tors are the m...
Hamiltonian systems possess dynamics (e.g., preservation of volume in phase space and symplectic str...
Symplectic methods for Hamiltonian systems are known to have favourable pro-per-ties concerning long...
We present explicit, adaptive symplectic (EASY) integrators for the numerical integration of Hamilto...
Abstract We consider Sundman and Poincaré transformations for the long-time numerical integration of...
AbstractIn this paper the numerical integration of integrable Hamiltonian systems is considered. Sym...
For the numerical treatment of Hamiltonian differential equations, symplectic integrators are the mo...
The so-called structure-preserving methods which reproduce the fundamental properties like symplecti...
Abstract. We consider adaptive geometric integrators for the numerical integration of Hamil-tonian s...
This paper focuses on the solution of separable Hamiltonian systems using explicit symplectic integr...
Based on a known observation that symplecticity is preserved under certain Sundman time transformati...
The description of the symplectic multi-step algorithm for integration of the equations of motion wi...
We present a multiscale integrator for Hamiltonian systems with slowly varying quadratic stiff poten...
Symplectic integration algorithms have become popular in recent years in long-term orbital integrati...
Symplectic integration algorithms are well-suited for long-term integrations of Hamiltonian systems ...
For the numerical treatment of Hamiltonian differential equations, symplectic integra-tors are the m...
Hamiltonian systems possess dynamics (e.g., preservation of volume in phase space and symplectic str...