Centralizers of Jacobian derivations

Abstract

Let K be an algebraically closed field of characteristic zero, K[x, y] the polynonial ring in variables x, y and let W2( K) be the Lie algebra of all K-derivations on K[x, y]. A derivation D ∈ W2( K) is called a Jacobian derivation if there exists f ∈ K[x, y] such that D(h) = J(f, h) for any h ∈ K[x, y] (here J(f, h) is the Jacobian matrix for f and h). Such a derivation is denoted by Df. The kernel of Df in K[x, y] is a subalgebra K[p] where p=p(x, y) is a polynomial of smallest degree such that f(x, y) = (p(x, y) for some (t) ∈ K[t]. Let C = CW2( K) (Df) be the centralizer of Df in W2( K). We prove that C is the free K[p]-module of rank 1 or 2 over K[p] and point out a criterion of being a module of rank 2. These results are used to obtain a class of integrable autonomous systems of differential equations.

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