In this paper we consider numerical methods for solving nonlinear equations on matrix Lie groups. Recently Owren and Welfert (Technical Report Numerics, No 3/1996, Norwegian University of Science and Technology, Trondheim, Norway, 1996) have proposed a method where the original nonlinear equation F(Y)=0 is transformed into a nonlinear equation on the Lie algebra of the group, thus Newton-type methods may be applied which require the evaluation of exponentials of matrices. Here the previous transformation will be performed by the Cayley approximant of the exponential map. This approach has the advantage that no exponentials of matrices are needed. The numerical tests reported in the last section seem to show that our approach is less expensi...
AbstractAn algorithm is given to linearize nonlinear first order systems of partial differential equ...
In this paper we present a technique for reducing to a minimum the number of commutators required in...
In recent years several numerical methods have been developed to integrate matrix differential syste...
In this paper we consider numerical methods for solving nonlinear equations on matrix Lie groups. Re...
AbstractIn this paper we consider numerical methods for solving nonlinear equations on matrix Lie gr...
We dene the Newton iteration for solving the equation f(y) = 0, where f is a map from a Lie group to...
We derive an implicit Lie-group algorithm together with the Newton iterative scheme to solve nonlin...
n recent years several numerical methods have been developed to integrate matrix differential system...
We consider the Fer and the Magnus expansions for the numerical solution of the nonlinear matrix Li...
AbstractHere we consider a numerical procedure to interpolate on matrix Lie groups. By using the exp...
For differential equations on a matrix Lie group it is known that most traditional methods do not ke...
In this paper we deal with high oscillatory systems and numerical methods for the approximation of ...
The Wei-Norman formula locally relates the Magnus solution of a system of linear time-varying ODEs w...
In this paper, we are concerned with the further study for system of nonlinear equations. Since syst...
he Wei-Norman formula locally relates the Magnus solution of a system of linear time-varying ODEs wi...
AbstractAn algorithm is given to linearize nonlinear first order systems of partial differential equ...
In this paper we present a technique for reducing to a minimum the number of commutators required in...
In recent years several numerical methods have been developed to integrate matrix differential syste...
In this paper we consider numerical methods for solving nonlinear equations on matrix Lie groups. Re...
AbstractIn this paper we consider numerical methods for solving nonlinear equations on matrix Lie gr...
We dene the Newton iteration for solving the equation f(y) = 0, where f is a map from a Lie group to...
We derive an implicit Lie-group algorithm together with the Newton iterative scheme to solve nonlin...
n recent years several numerical methods have been developed to integrate matrix differential system...
We consider the Fer and the Magnus expansions for the numerical solution of the nonlinear matrix Li...
AbstractHere we consider a numerical procedure to interpolate on matrix Lie groups. By using the exp...
For differential equations on a matrix Lie group it is known that most traditional methods do not ke...
In this paper we deal with high oscillatory systems and numerical methods for the approximation of ...
The Wei-Norman formula locally relates the Magnus solution of a system of linear time-varying ODEs w...
In this paper, we are concerned with the further study for system of nonlinear equations. Since syst...
he Wei-Norman formula locally relates the Magnus solution of a system of linear time-varying ODEs wi...
AbstractAn algorithm is given to linearize nonlinear first order systems of partial differential equ...
In this paper we present a technique for reducing to a minimum the number of commutators required in...
In recent years several numerical methods have been developed to integrate matrix differential syste...