34 pages, 12 figuresInternational audienceWe follow up on our previous works which presented a possible approach for deriving symplectic schemes for a certain class of highly oscillatory Hamiltonian systems. The approach considers the Hamilton-Jacobi form of the equations of motion, formally homogenizes it and infers an appropriate symplectic integrator for the original system. In our previous work, the case of a system exhibiting a single constant fast frequency was considered. The present work successfully extends the approach to systems that have either one varying fast frequency or several constant frequencies. Some related issues are also examined
The paper studies Hamiltonian systems with a strong potential forcing the solutions to oscillate on ...
In this paper we study homogenization for a class of monotone systems of first-order time-dependent ...
Modulated Fourier expansion is used to show long-time near-conservation of the total and oscillatory...
34 pages, 12 figuresInternational audienceWe follow up on our previous works which presented a possi...
International audienceWe derive symplectic integrators for a class of highly oscillatory Hamiltonian...
International audienceWe introduce here a class of symplectic schemes for the numerical integration ...
Numerical methods for oscillatory, multi-scale Hamiltonian systems are reviewed. The construction pr...
In this paper, we are concerned with the numerical solution of highly-oscillatory Hamiltonian system...
International audienceIn this paper, we are concerned with the numerical solution of highly-oscillat...
Symplectic transformations with a kind of homogeneity are introduced, which enable us to give a unif...
Numerical methods for oscillatory, multi-scale Hamiltonian systems are reviewed. The construction pr...
We present a multiscale integrator for Hamiltonian systems with slowly varying quadratic stiff poten...
AbstractSymplectic transformations with a kind of homogeneity are introduced, which enable us to giv...
Abstract: Symplectic integration methods based on operator splitting are well established in many br...
The symplectic structure implicit in systems of Hamilton's equations is of great theoretical, and in...
The paper studies Hamiltonian systems with a strong potential forcing the solutions to oscillate on ...
In this paper we study homogenization for a class of monotone systems of first-order time-dependent ...
Modulated Fourier expansion is used to show long-time near-conservation of the total and oscillatory...
34 pages, 12 figuresInternational audienceWe follow up on our previous works which presented a possi...
International audienceWe derive symplectic integrators for a class of highly oscillatory Hamiltonian...
International audienceWe introduce here a class of symplectic schemes for the numerical integration ...
Numerical methods for oscillatory, multi-scale Hamiltonian systems are reviewed. The construction pr...
In this paper, we are concerned with the numerical solution of highly-oscillatory Hamiltonian system...
International audienceIn this paper, we are concerned with the numerical solution of highly-oscillat...
Symplectic transformations with a kind of homogeneity are introduced, which enable us to give a unif...
Numerical methods for oscillatory, multi-scale Hamiltonian systems are reviewed. The construction pr...
We present a multiscale integrator for Hamiltonian systems with slowly varying quadratic stiff poten...
AbstractSymplectic transformations with a kind of homogeneity are introduced, which enable us to giv...
Abstract: Symplectic integration methods based on operator splitting are well established in many br...
The symplectic structure implicit in systems of Hamilton's equations is of great theoretical, and in...
The paper studies Hamiltonian systems with a strong potential forcing the solutions to oscillate on ...
In this paper we study homogenization for a class of monotone systems of first-order time-dependent ...
Modulated Fourier expansion is used to show long-time near-conservation of the total and oscillatory...