论文信息 - Lie symmetries and the integration of difference equations

Lie symmetries and the integration of difference equations

Abstract The Lie method is generalised to ordinary difference equations. We prove that the order of ordinary difference equations can be reduced by one, provided the equation under consideration possesses an evolutionary Lie point symmetry. This is illustrated by solving a first-order difference equation. We also give a sufficient condition for reduction of the order by two. This is illustrated by solving a second-order difference equation.

G. R. W. Quispel | R. Sahadevan | G. Quispel | R. Sahadevan

[1] M. Kuczma,et al. Iterative Functional Equations , 1990 .

[2] James M. Hill,et al. Solution of Differential Equations by Means of One-parameter Groups , 1982 .

[3] T. L. Saaty. Modern nonlinear equations , 1981 .

[4] H. Capel,et al. Complete integrability of Lagrangian mappings and lattices of KdV type , 1991 .

[5] C. Thompson,et al. Integrable mappings and soliton equations II , 1989 .

[6] S. Orszag,et al. Advanced Mathematical Methods For Scientists And Engineers , 1979 .

[7] C. Thompson,et al. Integrable mappings and soliton equations , 1988 .

[8] P. Olver. Applications of lie groups to differential equations , 1986 .

[9] G. Quispel,et al. Continuous symmetries of differential-difference equations: the Kac-van Moerbeke equation and Painlevé reduction , 1992 .

[10] V. Dorodnitsyn. Transformation groups in net spaces , 1991 .