On a direct algorithm for constructing recursion operators and Lax pairs for integrable models

Abstract

We suggested an algorithm for searching the recursion operators for nonlinear integrable equations. It was observed that the recursion operator R can be represented as a ratio of the form R=L1-1L2 where the linear differential operators L1 and L2 are chosen in such a way that the ordinary differential equation (L2-λ L1)U=0 is consistent with the linearization of the given nonlinear integrable equation for any value of the parameter λ∈ C. For constructing the operator L1 we use the concept of the invariant manifold which is a generalization of the symmetry. Then for searching L2 we take an auxiliary linear equation connected with the linearized equation by the Darboux transformation. Connection of the invariant manifold with the Lax pairs and the Dubrovin-Weierstrass equations is discussed.