Applying some reduced Lie algebras of Lie symmetry operators of a Lie transformation group, we obtain an invariant of a second-order differential equation which can be generated by a Euler-Lagrange formulism. A corresponding discrete equation approximating it is given as well. Finally, we make use of the Lie algebras to generate some new integrable systems including (1+1) and (2+1) dimensions
We associate with each simple Lie algebra a system of second-order differential equations invariant ...
An equivalence problem is solved completely for a linear system of two second-order ordinary differe...
Abstract. A method for solving the inverse variational problem for di®er-ential equations admitting ...
We discuss the Lie symmetry approach to homogeneous, linear, ordinary differential equations in an a...
We give a method for using explicitly known Lie symmetries of a system of differential equations to ...
Lie group techniques for solving differential equations are extended to differential-difference equa...
We introduce the general structures of Lie-admissible algebras in the spaces of Gâteaux differentiab...
The methods of Lie group analysis of differential equations are generalized so as to provide an infi...
AbstractLie symmetries of systems of second-order linear ordinary differential equations with consta...
AbstractThe invariance of non-linear partial differential equations under a certain infinite-dimensi...
AbstractA method for solving the inverse variational problem for differential equations admitting a ...
AbstractAn explicit characterisation of all second order differential operators on the line which ca...
This project is about dynamical systems with symmetries. A dynamical system defines a vector field o...
Discrete symmetries of differential equations can be calculated systematically, using an indirect me...
AbstractRather general results are obtained for determining the nature of infinitesimal generators w...
We associate with each simple Lie algebra a system of second-order differential equations invariant ...
An equivalence problem is solved completely for a linear system of two second-order ordinary differe...
Abstract. A method for solving the inverse variational problem for di®er-ential equations admitting ...
We discuss the Lie symmetry approach to homogeneous, linear, ordinary differential equations in an a...
We give a method for using explicitly known Lie symmetries of a system of differential equations to ...
Lie group techniques for solving differential equations are extended to differential-difference equa...
We introduce the general structures of Lie-admissible algebras in the spaces of Gâteaux differentiab...
The methods of Lie group analysis of differential equations are generalized so as to provide an infi...
AbstractLie symmetries of systems of second-order linear ordinary differential equations with consta...
AbstractThe invariance of non-linear partial differential equations under a certain infinite-dimensi...
AbstractA method for solving the inverse variational problem for differential equations admitting a ...
AbstractAn explicit characterisation of all second order differential operators on the line which ca...
This project is about dynamical systems with symmetries. A dynamical system defines a vector field o...
Discrete symmetries of differential equations can be calculated systematically, using an indirect me...
AbstractRather general results are obtained for determining the nature of infinitesimal generators w...
We associate with each simple Lie algebra a system of second-order differential equations invariant ...
An equivalence problem is solved completely for a linear system of two second-order ordinary differe...
Abstract. A method for solving the inverse variational problem for di®er-ential equations admitting ...