The Lie algebra L(h) of symmetries of a discrete analogue of the non-linear Schrodinger equation (NLS) is studied. A five-dimensional subspace of L(h), generated by both point and generalized symmetries, transforms into the five-dimensional point symme- try algebra L(0) of the NLS equation. We use the lowest symmetries to do symmetry reduction of the equation, thus obtaining explicit solutions and discrete analogues of elliptic functions
A discrete Cole-Hopf transformation is used to derive a discrete Burgers equation that is linearizab...
The discrete heat equation is worked out to illustrate the search of symmetries of difference equati...
Discrete symmetries of differential equations can be calculated systematically, using an indirect me...
The Lie algebra L(h) of symmetries of a discrete analogue of the non-linear Schrodinger equation (NL...
The Lie algebra L(h) of symmetries of a discrete analogue of the non-linear Schrödinger equation (N...
The Lie algebra L(h) of point symmetries of a discrete analogue of the nonlinear Schrodinger equatio...
A method proposed by P. E. Hydon for determining discrete symmetries of ordinary differential equa...
The method of classical Lie symmetries, generalised to differential-difference equations by Quispel,...
In this work we show how to construct symmetries for the differential-difference equations associate...
This paper introduces an algorithm for calculating all discrete point symmetries of a given partial ...
We construct the hierarchy of nonlinear difference-difference equations associated with the discrete...
This paper describes a method that enables the user to construct systematically the set of all discr...
We do a Lie symmetry classification for a system of two nonlinear coupled Schrödinger equations. Our...
We show with an example of the discrete heat equation that for any given discrete derivative we can ...
We derive a class of discrete nonlinear Schrödinger (DNLS) equations for general polynomial nonlinea...
A discrete Cole-Hopf transformation is used to derive a discrete Burgers equation that is linearizab...
The discrete heat equation is worked out to illustrate the search of symmetries of difference equati...
Discrete symmetries of differential equations can be calculated systematically, using an indirect me...
The Lie algebra L(h) of symmetries of a discrete analogue of the non-linear Schrodinger equation (NL...
The Lie algebra L(h) of symmetries of a discrete analogue of the non-linear Schrödinger equation (N...
The Lie algebra L(h) of point symmetries of a discrete analogue of the nonlinear Schrodinger equatio...
A method proposed by P. E. Hydon for determining discrete symmetries of ordinary differential equa...
The method of classical Lie symmetries, generalised to differential-difference equations by Quispel,...
In this work we show how to construct symmetries for the differential-difference equations associate...
This paper introduces an algorithm for calculating all discrete point symmetries of a given partial ...
We construct the hierarchy of nonlinear difference-difference equations associated with the discrete...
This paper describes a method that enables the user to construct systematically the set of all discr...
We do a Lie symmetry classification for a system of two nonlinear coupled Schrödinger equations. Our...
We show with an example of the discrete heat equation that for any given discrete derivative we can ...
We derive a class of discrete nonlinear Schrödinger (DNLS) equations for general polynomial nonlinea...
A discrete Cole-Hopf transformation is used to derive a discrete Burgers equation that is linearizab...
The discrete heat equation is worked out to illustrate the search of symmetries of difference equati...
Discrete symmetries of differential equations can be calculated systematically, using an indirect me...