At the example of Hamiltonian differential equations, geometric properties of the flow are discussed that are only preserved by special numerical integrators (such as symplectic and/or symmetric methods). In the ‘non-stiff' situation the long-time behaviour of these methods is well-understood and can be explained with the help of a backward error analysis. In the highly oscillatory (‘stiff') case this theory breaks down. Using a modulated Fourier expansion, much insight can be gained for methods applied to problems where the high oscillations stem from a linear part of the vector field and where only one (or a few) high frequencies are present. This paper terminates with numerical experiments at space discretizations of the sine-Gordon equa...
It is the purpose of this talk to analyze the nearly conservative behaviour of multi-value methods f...
Modified Hamiltonians are used in the field of geometric numerical integration to show that symplect...
Explicit and semi-explicit geometric integration schemes for dissipative perturbations of Hamiltonia...
At the example of Hamiltonian differential equations, geometric properties of the flow are discussed...
Modulated Fourier expansion is used to show long-time near-conservation of the total and oscillatory...
Numerical methods that preserve properties of Hamiltonian systems, reversible systems, differential ...
This thesis concerns the study of geometric numerical integrators and how they preserve phase space...
The aim of the work described in this thesis is the construction and the study of structure-preservi...
Numerical methods for oscillatory, multi-scale Hamiltonian systems are reviewed. The construction pr...
Geometric numerical integration is a relatively new area of numerical analysis. The aim is to preser...
Thèse de Doctorat en cotutelle internationaleThe aim of the work described in this thesis is the con...
Geometric numerical integration is synonymous with structure-pre-ser-ving integration of ordinary di...
The subject of geometric numerical integration deals with numerical integrators that preserve geomet...
The purpose of this paper is the derivation of multivalue numerical methods for Hamiltonian problems...
International audienceSome of the most important geometric integrators for both ordinary and partial...
It is the purpose of this talk to analyze the nearly conservative behaviour of multi-value methods f...
Modified Hamiltonians are used in the field of geometric numerical integration to show that symplect...
Explicit and semi-explicit geometric integration schemes for dissipative perturbations of Hamiltonia...
At the example of Hamiltonian differential equations, geometric properties of the flow are discussed...
Modulated Fourier expansion is used to show long-time near-conservation of the total and oscillatory...
Numerical methods that preserve properties of Hamiltonian systems, reversible systems, differential ...
This thesis concerns the study of geometric numerical integrators and how they preserve phase space...
The aim of the work described in this thesis is the construction and the study of structure-preservi...
Numerical methods for oscillatory, multi-scale Hamiltonian systems are reviewed. The construction pr...
Geometric numerical integration is a relatively new area of numerical analysis. The aim is to preser...
Thèse de Doctorat en cotutelle internationaleThe aim of the work described in this thesis is the con...
Geometric numerical integration is synonymous with structure-pre-ser-ving integration of ordinary di...
The subject of geometric numerical integration deals with numerical integrators that preserve geomet...
The purpose of this paper is the derivation of multivalue numerical methods for Hamiltonian problems...
International audienceSome of the most important geometric integrators for both ordinary and partial...
It is the purpose of this talk to analyze the nearly conservative behaviour of multi-value methods f...
Modified Hamiltonians are used in the field of geometric numerical integration to show that symplect...
Explicit and semi-explicit geometric integration schemes for dissipative perturbations of Hamiltonia...