摘要： The strong symmetry of the general KdV equation is factorized to a simple form and then the inverse strong symmetry is obtained explicitly. Acting a strong symmetry of the general KdV equation on the trivial symmetry and the known re symmetry, we obtain four new sets of symmetries of the general KdV equation. All these sets of symmetries constitute an infinite dimensional Lie algebra.

Abstract: The strong symmetry of the general KdV equation is factorized to a simple form and then the inverse strong symmetry is obtained explicitly. Acting a strong symmetry of the general KdV equation on the trivial symmetry and the known $\tau_{\rm c}$ symmetry, we obtain four new sets of symmetries of the general KdV equation. All these sets of symmetries constitute an infinite dimensional Lie algebra.

中图分类号:  (Solitons)

• 05.45.Yv

02.30.Jr (Partial differential equations) 02.30.Rz (Integral equations) 02.10.Ud (Linear algebra) 11.30.-j (Symmetry and conservation laws)