The Liouville equation is well known to be linearizable by a point transformation. It has an infinite dimensional Lie point symmetry algebra isomorphic to a direct sum of two Virasoro algebras. We show that it is not possible to discretize the equation keeping the entire symmetry algebra as point symmetries. We do however construct a difference system approximating the Liouville equation that is invariant under the maximal finite subgroup SLx(2, double-struck R) ⊗ SLy(2, double-struck R). The invariant scheme is an explicit one and provides a much better approximation of exact solutions than a comparable standard (noninvariant) scheme and also than a scheme invariant under an infinite dimensional group of generalized symmetries
A method proposed by P. E. Hydon for determining discrete symmetries of ordinary differential equa...
We present an algorithm for determining the Lie point symmetries of differential equations on fixed ...
Lie group theory was originally created more than 100 years ago as a tool for solving ordinary and p...
The Liouville equation is well known to be linearizable by a point transformation. It has an infinit...
The main purpose of this article is to show how symmetry structures in par- tial differential equati...
The main purpose of this article is to show how symmetry structures in partial differential equation...
The symmetry algebra of the real elliptic Liouville equation is an infinite-dimensional loop algebra...
This paper describes a method that enables the user to construct systematically the set of all discr...
"We show that one can devise through the symmetry approach a procedure to check the linearizability ...
Discrete symmetries of differential equations can be calculated systematically, using an indirect me...
The Lie algebra L(h) of point symmetries of a discrete analogue of the nonlinear Schrodinger equatio...
In this work we show how to construct symmetries for the differential-difference equations associate...
The methods of Lie group analysis of differential equations are generalized so as to provide an infi...
The Lie algebra L(h) of symmetries of a discrete analogue of the non-linear Schrödinger equation (N...
A method is presented for finding the Lie point symmetry transformations acting simultaneously on di...
A method proposed by P. E. Hydon for determining discrete symmetries of ordinary differential equa...
We present an algorithm for determining the Lie point symmetries of differential equations on fixed ...
Lie group theory was originally created more than 100 years ago as a tool for solving ordinary and p...
The Liouville equation is well known to be linearizable by a point transformation. It has an infinit...
The main purpose of this article is to show how symmetry structures in par- tial differential equati...
The main purpose of this article is to show how symmetry structures in partial differential equation...
The symmetry algebra of the real elliptic Liouville equation is an infinite-dimensional loop algebra...
This paper describes a method that enables the user to construct systematically the set of all discr...
"We show that one can devise through the symmetry approach a procedure to check the linearizability ...
Discrete symmetries of differential equations can be calculated systematically, using an indirect me...
The Lie algebra L(h) of point symmetries of a discrete analogue of the nonlinear Schrodinger equatio...
In this work we show how to construct symmetries for the differential-difference equations associate...
The methods of Lie group analysis of differential equations are generalized so as to provide an infi...
The Lie algebra L(h) of symmetries of a discrete analogue of the non-linear Schrödinger equation (N...
A method is presented for finding the Lie point symmetry transformations acting simultaneously on di...
A method proposed by P. E. Hydon for determining discrete symmetries of ordinary differential equa...
We present an algorithm for determining the Lie point symmetries of differential equations on fixed ...
Lie group theory was originally created more than 100 years ago as a tool for solving ordinary and p...