In this paper we propose a geometric integrator to numerically approximate the flow of Lie systems. The highlight of this paper is to present a novel procedure that integrates the system on a Lie group intrinsically associated to the Lie system, and then generating the discrete solution of this Lie system through a given action of the Lie group on the manifold where the system evolves. One major result from the integration on the Lie group is that one is able to solve all automorphic Lie systems at the same time, and that they can be written as first-order systems of linear homogeneous ODEs in normal form. This brings a lot of advantages, since solving a linear ODE involves less numerical cost. Specifically, we use two families of numeric...
Numerical methods that preserve properties of Hamiltonian systems, reversible systems, differential ...
Since they were introduced in the 1990s, Lie group integrators have become a method of choice in man...
Explicit numerical integration algorithms up to order four based on the Magnus expansion for nonline...
The thesis belongs to the field of “geometric numerical integration” (GNI), whose aim it is to const...
Given an ordinary dierential equation on a homogeneous manifold, one can construct a \geometric inte...
AbstractCommencing with a brief survey of Lie-group theory and differential equations evolving on Li...
In this paper we apply geometric integrators of the RKMK type to the problem of integrating Lie-- Po...
The objective of this thesis is to study numerical integrators and their application to solving ordi...
The main idea of a geometric integrator is to adopt a geometric viewpoint of the problem and to cons...
We consider the construction of geometric integrators in the class of RKMK methods. Any di#erential ...
International audienceSome of the most important geometric integrators for both ordinary and partial...
Abstract We present an extrapolation algorithm for the integration of differential equations in Lie ...
In this paper, we report further progress on our work on the use of Lie methods for integrating ordi...
Motivated by numerical integration on manifolds, we relate the algebraic properties of invariant con...
In many applications, one encounters signals that lie on manifolds rather than a Euclidean space. In...
Numerical methods that preserve properties of Hamiltonian systems, reversible systems, differential ...
Since they were introduced in the 1990s, Lie group integrators have become a method of choice in man...
Explicit numerical integration algorithms up to order four based on the Magnus expansion for nonline...
The thesis belongs to the field of “geometric numerical integration” (GNI), whose aim it is to const...
Given an ordinary dierential equation on a homogeneous manifold, one can construct a \geometric inte...
AbstractCommencing with a brief survey of Lie-group theory and differential equations evolving on Li...
In this paper we apply geometric integrators of the RKMK type to the problem of integrating Lie-- Po...
The objective of this thesis is to study numerical integrators and their application to solving ordi...
The main idea of a geometric integrator is to adopt a geometric viewpoint of the problem and to cons...
We consider the construction of geometric integrators in the class of RKMK methods. Any di#erential ...
International audienceSome of the most important geometric integrators for both ordinary and partial...
Abstract We present an extrapolation algorithm for the integration of differential equations in Lie ...
In this paper, we report further progress on our work on the use of Lie methods for integrating ordi...
Motivated by numerical integration on manifolds, we relate the algebraic properties of invariant con...
In many applications, one encounters signals that lie on manifolds rather than a Euclidean space. In...
Numerical methods that preserve properties of Hamiltonian systems, reversible systems, differential ...
Since they were introduced in the 1990s, Lie group integrators have become a method of choice in man...
Explicit numerical integration algorithms up to order four based on the Magnus expansion for nonline...