Numerical methods for oscillatory, multi-scale Hamiltonian systems are reviewed. The construction principles are described, and the algorithmic and analytical distinction between problems with nearly constant high frequencies and with time- or state-dependent frequencies is emphasized. Trigonometric integrators for the first case and adiabatic integrators for the second case are discussed in more detail
Abstract. Numerical integrators for second order differential equations with time-dependent high fre...
Abstract. This paper deals with the numerical integration of Hamiltonian systems in which a stiff an...
The disability of classical general-purpose integrators, such as the Runge-Kutta integrators, to exp...
Numerical methods for oscillatory, multi-scale Hamiltonian systems are reviewed. The construction pr...
International audienceWe derive symplectic integrators for a class of highly oscillatory Hamiltonian...
Modulated Fourier expansion is used to show long-time near-conservation of the total and oscillatory...
The long-time near-conservation of the total and oscillatory energies of numerical integrators for H...
Die Integration hochoszillatorischer Differentialgleichungen stellt seit langem eine numerische Hera...
34 pages, 12 figuresInternational audienceWe follow up on our previous works which presented a possi...
The numerical integration of highly oscillatory Hamiltonian systems, such as those arising in molecu...
In this paper we look at the performance of trigonometric integrators applied to highly oscillatory ...
International audienceIn this paper, we are concerned with the numerical solution of highly-oscillat...
International audienceWe introduce here a class of symplectic schemes for the numerical integration ...
In this paper, we are concerned with the numerical solution of highly-oscillatory Hamiltonian system...
Abstract. Numerical integrators for second order differential equations with time-dependent high fre...
Abstract. This paper deals with the numerical integration of Hamiltonian systems in which a stiff an...
The disability of classical general-purpose integrators, such as the Runge-Kutta integrators, to exp...
Numerical methods for oscillatory, multi-scale Hamiltonian systems are reviewed. The construction pr...
International audienceWe derive symplectic integrators for a class of highly oscillatory Hamiltonian...
Modulated Fourier expansion is used to show long-time near-conservation of the total and oscillatory...
The long-time near-conservation of the total and oscillatory energies of numerical integrators for H...
Die Integration hochoszillatorischer Differentialgleichungen stellt seit langem eine numerische Hera...
34 pages, 12 figuresInternational audienceWe follow up on our previous works which presented a possi...
The numerical integration of highly oscillatory Hamiltonian systems, such as those arising in molecu...
In this paper we look at the performance of trigonometric integrators applied to highly oscillatory ...
International audienceIn this paper, we are concerned with the numerical solution of highly-oscillat...
International audienceWe introduce here a class of symplectic schemes for the numerical integration ...
In this paper, we are concerned with the numerical solution of highly-oscillatory Hamiltonian system...
Abstract. Numerical integrators for second order differential equations with time-dependent high fre...
Abstract. This paper deals with the numerical integration of Hamiltonian systems in which a stiff an...
The disability of classical general-purpose integrators, such as the Runge-Kutta integrators, to exp...