Add to ORKGWe survey briefly recent developments in geometric integration and numerical methods on manifolds. The underlying philosophy is that numerical methods should, whenever practicable, recover correctly known qualitative behaviour of the underlying differential system. Classical numerical methods retain invariants very poorly indeed, and this justifies the recent introduction of a new breed of discretization schemes
This paper presents a family of generalized multistep methods that evolves the numerical solution of...
SIGLEAvailable from British Library Document Supply Centre-DSC:9106.1605(1998/10) / BLDSC - British ...
In many engineering and scientific applications, the need arises to perform differential calculation...
During the last few years, different approaches for integrating ordinary differential equations on m...
Numerical methods that preserve properties of Hamiltonian systems, reversible systems, differential ...
This volume resulted from presentations given at the international “Brainstorming Workshop on New De...
Geometric numerical integration is synonymous with structure-pre-ser-ving integration of ordinary di...
. We present an overview of intrinsic integration schemes for differential equations evolving on man...
The thesis belongs to the field of “geometric numerical integration” (GNI), whose aim it is to const...
The dynamics of a differential algebraic equation takes place on a lower dimensional manifold in pha...
Differential geometry is deceptively simple. It is surprisingly easy to get the right answer with un...
The subject of geometric numerical integration deals with numerical integrators that preserve geomet...
At the example of Hamiltonian differential equations, geometric properties of the flow are discussed...
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...
This paper presents a family of generalized multistep methods that evolves the numerical solution of...
SIGLEAvailable from British Library Document Supply Centre-DSC:9106.1605(1998/10) / BLDSC - British ...
In many engineering and scientific applications, the need arises to perform differential calculation...
During the last few years, different approaches for integrating ordinary differential equations on m...
Numerical methods that preserve properties of Hamiltonian systems, reversible systems, differential ...
This volume resulted from presentations given at the international “Brainstorming Workshop on New De...
Geometric numerical integration is synonymous with structure-pre-ser-ving integration of ordinary di...
. We present an overview of intrinsic integration schemes for differential equations evolving on man...
The thesis belongs to the field of “geometric numerical integration” (GNI), whose aim it is to const...
The dynamics of a differential algebraic equation takes place on a lower dimensional manifold in pha...
Differential geometry is deceptively simple. It is surprisingly easy to get the right answer with un...
The subject of geometric numerical integration deals with numerical integrators that preserve geomet...
At the example of Hamiltonian differential equations, geometric properties of the flow are discussed...
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...
This paper presents a family of generalized multistep methods that evolves the numerical solution of...
SIGLEAvailable from British Library Document Supply Centre-DSC:9106.1605(1998/10) / BLDSC - British ...
In many engineering and scientific applications, the need arises to perform differential calculation...