AbstractA method to derive the continuous nonpoint symmetries of ordinary difference equations (OΔE) of order two and higher is presented. A partial classification of second and fourth order difference equations that admit nonpoint symmetries both rational and polynomial forms which are quadratic in each variable is reported. Also, exploiting the obtained symmetries, it is shown how to construct integrals of motion or invariant for each of the considered equations. The question of integrability of the fourth order difference equations possessing the above type of nonpoint symmetries has also been briefly discussed
We discuss the Lie symmetry approach to homogeneous, linear, ordinary differential equations in an a...
The methods of Lie group analysis of differential equations are generalized so as to provide an infi...
An integration technique for difference schemes possessing Lie point symmetries is proposed. The met...
AbstractA method to derive the continuous nonpoint symmetries of ordinary difference equations (OΔE)...
This paper describes symmetries of all integrable difference equations that belong to the famous Adl...
Abstract: A review of earlier publications referenced in an introduction of the paper is p...
Lie group theory was originally created more than 100 years ago as a tool for solving ordinary and p...
We perform Lie analysis for a system of higher order difference equations with variable coefficients...
This paper describes a new symmetry-based approach to solving a given ordinary difference equation. ...
A method is presented for calculating the Lie point. symmetries of difference equations with one, or...
In order to apply Lie's symmetry theory for solving a differential equation it must be possible to i...
AbstractIn Phys. D 78 (1994) 124, we have found that iterations of the nonclassical symmetries metho...
A method proposed by P. E. Hydon for determining discrete symmetries of ordinary differential equa...
We derive the determining equations for the Nth-order generalized symmetries of partial difference e...
This paper describes a method that enables the user to construct systematically the set of all discr...
We discuss the Lie symmetry approach to homogeneous, linear, ordinary differential equations in an a...
The methods of Lie group analysis of differential equations are generalized so as to provide an infi...
An integration technique for difference schemes possessing Lie point symmetries is proposed. The met...
AbstractA method to derive the continuous nonpoint symmetries of ordinary difference equations (OΔE)...
This paper describes symmetries of all integrable difference equations that belong to the famous Adl...
Abstract: A review of earlier publications referenced in an introduction of the paper is p...
Lie group theory was originally created more than 100 years ago as a tool for solving ordinary and p...
We perform Lie analysis for a system of higher order difference equations with variable coefficients...
This paper describes a new symmetry-based approach to solving a given ordinary difference equation. ...
A method is presented for calculating the Lie point. symmetries of difference equations with one, or...
In order to apply Lie's symmetry theory for solving a differential equation it must be possible to i...
AbstractIn Phys. D 78 (1994) 124, we have found that iterations of the nonclassical symmetries metho...
A method proposed by P. E. Hydon for determining discrete symmetries of ordinary differential equa...
We derive the determining equations for the Nth-order generalized symmetries of partial difference e...
This paper describes a method that enables the user to construct systematically the set of all discr...
We discuss the Lie symmetry approach to homogeneous, linear, ordinary differential equations in an a...
The methods of Lie group analysis of differential equations are generalized so as to provide an infi...
An integration technique for difference schemes possessing Lie point symmetries is proposed. The met...