The long-time near-conservation of the total and oscillatory energies of numerical integrators for Hamiltonian systems with highly oscillatory solutions is studied in this paper. The numerical methods considered are symmetric trigonometric integrators and the St\uf6rmer-Verlet method. Previously obtained results for systems with a single high frequency are extended to the multi-frequency case, and new insight into the long-time behaviour of numerical solutions is gained for resonant frequencies. The results are obtained using modulated multi-frequency Fourier expansions and the Hamiltonian-like structure of the modulation system. A brief discussion of conservation properties in the continuous problem is also included
Current research made contribution to the numerical analysis of highly oscillatory ordinary differen...
We discuss the effectiveness of multi-value numerical methods in the numerical treatment of Hamilton...
Recent results on the local and global properties of multisymplectic discretizations of Hamiltonian ...
The long-time near-conservation of the total and oscillatory energies of numerical integrators for H...
The long-time near-conservation of the total and oscillatory energies of numerical integrators for H...
Modulated Fourier expansion is used to show long-time near-conservation of the total and oscillatory...
We consider second-order differential systems where high-frequency oscillations are generated by a l...
Numerical methods for oscillatory, multi-scale Hamiltonian systems are reviewed. The construction pr...
Modulated Fourier expansions are developed as a tool for gaining insight into the long-time behaviou...
Abstract. Modulated Fourier expansions are developed as a tool for gaining in-sight into the long-ti...
This article discusses the energy conservation of a wide class of numerical integrators applied to H...
Numerical methods for oscillatory, multi-scale Hamiltonian systems are reviewed. The construction pr...
It is the purpose of this talk to analyze the nearly conservative behaviour of multi-value methods f...
The main theme of this book is recent progress in structure-preserving algorithms for solving initia...
Ce mémoire traite de la résolution (numérique et exacte) d'équations différentielles à grandes oscil...
Current research made contribution to the numerical analysis of highly oscillatory ordinary differen...
We discuss the effectiveness of multi-value numerical methods in the numerical treatment of Hamilton...
Recent results on the local and global properties of multisymplectic discretizations of Hamiltonian ...
The long-time near-conservation of the total and oscillatory energies of numerical integrators for H...
The long-time near-conservation of the total and oscillatory energies of numerical integrators for H...
Modulated Fourier expansion is used to show long-time near-conservation of the total and oscillatory...
We consider second-order differential systems where high-frequency oscillations are generated by a l...
Numerical methods for oscillatory, multi-scale Hamiltonian systems are reviewed. The construction pr...
Modulated Fourier expansions are developed as a tool for gaining insight into the long-time behaviou...
Abstract. Modulated Fourier expansions are developed as a tool for gaining in-sight into the long-ti...
This article discusses the energy conservation of a wide class of numerical integrators applied to H...
Numerical methods for oscillatory, multi-scale Hamiltonian systems are reviewed. The construction pr...
It is the purpose of this talk to analyze the nearly conservative behaviour of multi-value methods f...
The main theme of this book is recent progress in structure-preserving algorithms for solving initia...
Ce mémoire traite de la résolution (numérique et exacte) d'équations différentielles à grandes oscil...
Current research made contribution to the numerical analysis of highly oscillatory ordinary differen...
We discuss the effectiveness of multi-value numerical methods in the numerical treatment of Hamilton...
Recent results on the local and global properties of multisymplectic discretizations of Hamiltonian ...