We derive an implicit Lie-group algorithm together with the Newton iterative scheme to solve nonlinear differential algebraic equations. Four numerical examples are given to evaluate the efficiency and accuracy of the new method when comparing the computational results with the closed-form solutions
The use of implicit methods for ODEs, e.g. implicit Runge-Kutta schemes, requires the solution of no...
AbstractIn this paper we consider numerical methods for solving nonlinear equations on matrix Lie gr...
AbstractLie series are used to calculate both closed form and approximate solutions for elementary n...
In this paper we consider numerical methods for solving nonlinear equations on matrix Lie groups. Re...
AbstractA method for solving the inverse variational problem for differential equations admitting a ...
Despite the fact that Sophus Lie's theory was virtually the only systematic method for solving nonli...
We dene the Newton iteration for solving the equation f(y) = 0, where f is a map from a Lie group to...
AbstractA new algorithm is proposed for obtaining explicit solutions of the Cauchy problem defined b...
When solving large systems of nonlinear differential-algebraic equations by implicit schemes, each i...
AbstractA new class of implicit methods for solving nonlinear equations is proposed in this paper. C...
For differential equations on a matrix Lie group it is known that most traditional methods do not ke...
Abstract. A method for solving the inverse variational problem for di®er-ential equations admitting ...
Solving nonlinear ordinary differential equations is one of the fundamental and practically importan...
To combine a feedforward neural network (FNN) and Lie group (symmetry) theory of differential equati...
Today engineering and science researchers routinely confront problems in mathematical modeling invol...
The use of implicit methods for ODEs, e.g. implicit Runge-Kutta schemes, requires the solution of no...
AbstractIn this paper we consider numerical methods for solving nonlinear equations on matrix Lie gr...
AbstractLie series are used to calculate both closed form and approximate solutions for elementary n...
In this paper we consider numerical methods for solving nonlinear equations on matrix Lie groups. Re...
AbstractA method for solving the inverse variational problem for differential equations admitting a ...
Despite the fact that Sophus Lie's theory was virtually the only systematic method for solving nonli...
We dene the Newton iteration for solving the equation f(y) = 0, where f is a map from a Lie group to...
AbstractA new algorithm is proposed for obtaining explicit solutions of the Cauchy problem defined b...
When solving large systems of nonlinear differential-algebraic equations by implicit schemes, each i...
AbstractA new class of implicit methods for solving nonlinear equations is proposed in this paper. C...
For differential equations on a matrix Lie group it is known that most traditional methods do not ke...
Abstract. A method for solving the inverse variational problem for di®er-ential equations admitting ...
Solving nonlinear ordinary differential equations is one of the fundamental and practically importan...
To combine a feedforward neural network (FNN) and Lie group (symmetry) theory of differential equati...
Today engineering and science researchers routinely confront problems in mathematical modeling invol...
The use of implicit methods for ODEs, e.g. implicit Runge-Kutta schemes, requires the solution of no...
AbstractIn this paper we consider numerical methods for solving nonlinear equations on matrix Lie gr...
AbstractLie series are used to calculate both closed form and approximate solutions for elementary n...