This paper deals with a geometric technique to construct numerical schemes for differential equations that inherit Lie symmetries. The moving frame method enables one to adjust existing numerical schemes in a geometric manner and systematically construct proper invariant versions of them. Invariantization works as an adaptive transformation on numerical solutions, improving their accuracy greatly. Error reduction in the Runge-Kutta method by invariantization is studied through several applications including a harmonic oscillator and a Hamiltonian system.close111
. This paper surveys the new, algorithmic theory of moving frames developed by the author and M. Fel...
This paper outlines a new general construction, named \multi-space", that forms the proper geom...
This is the first in a series of papers devoted to the development and applications of a new general...
This paper deals with a geometric technique to construct numerical schemes for dif-ferential equatio...
In this article, a geometric technique to construct numerical schemes for partial differential equat...
Abstract. In this article, a geometric technique to construct numerical schemes for partial differen...
We propose a new approach for moving frame construction that allows to make finite difference scheme...
We outline a general construction of symmetry-preserving numerical schemes for ordinary differential...
Invariant numerical schemes possess properties that may overcome the numerical properties of most of...
Abstract. Finite difference discretization schemes preserving a subgroup of the maximal Lie invarian...
The method of equivariant moving frames on multi-space is used to construct sym-metry preserving fin...
We propose a novel algorithmic method for constructing invariant variational schemes of systems of o...
Numerical methods that preserve properties of Hamiltonian systems, reversible systems, differential ...
In this paper we present a method of construction of invariant numerical schemes for partial differe...
Based on a new, general formulation of the geometric method of moving frames, invariantization of nu...
. This paper surveys the new, algorithmic theory of moving frames developed by the author and M. Fel...
This paper outlines a new general construction, named \multi-space", that forms the proper geom...
This is the first in a series of papers devoted to the development and applications of a new general...
This paper deals with a geometric technique to construct numerical schemes for dif-ferential equatio...
In this article, a geometric technique to construct numerical schemes for partial differential equat...
Abstract. In this article, a geometric technique to construct numerical schemes for partial differen...
We propose a new approach for moving frame construction that allows to make finite difference scheme...
We outline a general construction of symmetry-preserving numerical schemes for ordinary differential...
Invariant numerical schemes possess properties that may overcome the numerical properties of most of...
Abstract. Finite difference discretization schemes preserving a subgroup of the maximal Lie invarian...
The method of equivariant moving frames on multi-space is used to construct sym-metry preserving fin...
We propose a novel algorithmic method for constructing invariant variational schemes of systems of o...
Numerical methods that preserve properties of Hamiltonian systems, reversible systems, differential ...
In this paper we present a method of construction of invariant numerical schemes for partial differe...
Based on a new, general formulation of the geometric method of moving frames, invariantization of nu...
. This paper surveys the new, algorithmic theory of moving frames developed by the author and M. Fel...
This paper outlines a new general construction, named \multi-space", that forms the proper geom...
This is the first in a series of papers devoted to the development and applications of a new general...